tag:blogger.com,1999:blog-47102158569349924472024-03-14T00:50:35.122-07:00Your portal to the worldMr. Lawrence Low (HELP Academy, A-Level Department) (KL) (Cambridge & Edexcel Economics Specialist)Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.comBlogger432125tag:blogger.com,1999:blog-4710215856934992447.post-78367828496646229322019-05-28T00:29:00.002-07:002019-05-28T00:29:38.748-07:00MCQ Walkthrough 9708/32 (India) (Q21 - Q30)<div style="text-align: justify;">
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" width="400" /> </div>
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<span style="font-size: large;">Comparison of GDP would be more meaningful if shadow/ parallel/ hidden/ underground economies could be accurately accounted for. It would be more prevalent in developing countries than developed. As such, comparisons between rich and poor countries are often inaccurate. Very often, least developed countries are thought to be very poor when that is not necessarily the case. Answer is therefore (C)</span></div>
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<span style="font-size: large;"><img alt="" height="123" 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" width="400" /> </span></div>
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<span style="font-size: large;">Initially, an increase in income would be followed by an increase in income inequality. However, over the time, as a country progresses or moving towards more developed, the income inequality will diminish. This is true as seen in many developed nations where direct tax rates are more progressive and benefits are generous. Answer is (A)</span></div>
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<span style="font-size: large;"><img alt="" height="70" 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" width="400" /> </span></div>
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<span style="font-size: large;">k = 1/ mpw = 1/ 0.8 = 1.25. Answer is (A)</span></div>
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<span style="font-size: large;"><img alt="" height="195" 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" width="400" /> </span></div>
<div style="text-align: justify;">
<span style="font-size: large;">National income = C + I + G + (X - M) = 600 = 720 - M. M is therefore 120. Answer is (B)</span></div>
<div style="text-align: justify;">
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<span style="font-size: large;"><img alt="" height="118" 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" width="400" /> </span></div>
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<span style="font-size: large;">This is an expansionary monetary policy. The central bank tries to increase liquidity within the banking system hoping that it could lend out more money than before and this could spur economic activities. The answer is (B)</span></div>
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<span style="font-size: large;"><img alt="" height="157" 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" width="400" /> </span></div>
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<span style="font-size: large;">The answer is (C). The income per capita would increase rapidly, with birth rate falling (due to rising cost of living, better knowledge and availability of contraceptives) and saving ratio increasing. Households will have more income to be set aside. In addition, increase in liquidity would allow banking institutions to generate more lending and this could lead to greater investment. Answer is (C)</span></div>
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<span style="font-size: large;"><img alt="" height="152" 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" width="400" /> </span></div>
<div style="text-align: justify;">
<span style="font-size: large;">The answer is (B). A large increase in indirect taxes would increase the price level. Goods and services would become more expensive. There will be a decline in purchasing power. Eventually people will make fewer purchases and this leads to rising unemployment</span></div>
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<span style="font-size: large;"><img alt="" height="133" 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" width="400" /> </span></div>
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<span style="font-size: large;">The answer is (C). The government would have to pursue an expansionary fiscal policy. A rise in AD would lead to more workers needed to produce those goods and services</span></div>
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" width="400" /> </span></div>
<div style="text-align: justify;">
<span style="font-size: large;">The answer is (D). A curve that illustrates the relationship between unemployment and inflation would be the Philips curve</span></div>
<div style="text-align: justify;">
<br /></div>
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<span style="font-size: large;"><img alt="" height="186" 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XTqXZapl2L7Pdvg7+HzbZfVm9e7vnYmZIzev29sf3x6qcXNeREsrZ9aeDaBw7f+sc5mt8X6A/b5wQOSFY7KfRpYtlrdm/2/637sCkih9dlSJ0FtYVhACltmYB3mvyk7PfEsy50DFLpPVAbVxnGbvNUoJCBtftE0OQk4pwDPEwGp1AxAjZO5ezdVC1CyvlPdrW0vNndazb7ZXlDLi6jnZGwuhHGi8xvTE1RdvLbrsZ6qsz+X32p2Nu69eKr1+yvdnCfbi+TkZnsHbC6ktTvZXJuyR8WUPSQgmcnudr1YAczUi/eO1dd717ZdbpnqF89yMmrPUFW1H8dKs0VRH6aOnbozFxLP9kejVBfzal+WPX4mnJg6rgVT017ctrbbEFt3QPpctK8TJdNfaj0fZQAYnSkrezvutJp/q3QUWxduzxDbzvvRP8QWXJ9eoW1hSEAa0p77jmkTepzeu3yl+UWqkRW4hu+TEyWTH4tl5toss7KnsjMglW26P3wCzxUByVIPREVgsk+8zvCA7264dQ5S467dPRmbgBYacMKHAUK/X97FFmUse1FMYLI/Wpyot+sKCEjmQtF7gfdcRDc3moxeDayXqj5H6UdlWaar3uFHa/u8ddm2j8y/u+HsK03mn50lm4uh+ay50I6VTi+VZT/4h0oOEpAS/fWviTccdc8rcm8mfJ/ddT/6AtKQ+vQuMbAtDDi2gtpz4DHduW/tXuoB+6R1mbk28/PuHqSyN4twhJeNgGSrBSDPkJs5gcZnmq2/NAOU9glIoZOv7ysg+U6y9u/+cC76/rpqO3G7ZRkyeX0bvtyg0zcB2FMv5V1wffgjmXzfO2/FP1E4NCB1vTbCXXbLMGacaHL5k9WbcICA1DqMI9Veb9H6096DKO26H311P6Q+WwS1hfBja++bEVtjCNU3fHam2fof4fuka3J158Rrs5/6h6GB546AVGOFoi/N4TPJnBjfaLr87B0uICDtH5DMfmgPqgPqJV9pfvWdNaG1Zb6Gu3kPFpBMMee6upx45jsVweUgAelEyfmVsr9+pea8rJCA5A77um1ql/14oIC0reSetnDEASl6o+ny7+H7ZOeA1F3XwEtCQKqphtWubz76J5Oa9yJd/9QRoJ7qEFv9Ivw4Q2zWtsRnmv39OvApmpCLkf1E3rCJzub79z/E5mM/rdU3ZNJf9t5J2mYyb+fE6y7tnx2+Hw8xxOZdi6cttLWhavL4ww+x2Qbsk3Ju27nmm/pCu88TBCTAICC51jOlcfGEWMebs7dPqbVcEHYKSGqZ0Gk9Tl7rrdk3IDkTPcvHgT0Tgw82SVvWy+h8vQ9f6f3k34seu9CLtFOmWl1K1QTZ7gvqfgFp+CTt6vUBhfIJImcy90HepG3NS7GG2soQ7LzCIF/d6CIdW/us68I9dD8ecJJ2b1uwglByoUXnxObA9hx0TJuQZ0+oLj5XTL4ub1qC94lv4veASdoACEgN1vyM3r/N5jkp7xWQuh7hLe+e7ysgtT3mb99xPtRj/r5eKuuR76BepyGP+bvb2bRvQLqXx/xr9WIPeXXPD9ntPUjmbcp2L03XNtgTu0MmD4f3HtaGnMperUM95u+0Be9w14lOP37Q+3iX9hxyTKtljpSpg1NNF2atofukbZknStJ37ZO07/0losDTRUBqMCf79m7xriCyX0CSmi+Bc18AeY9zkBb/Wzzav73IpNOZdfdaLnXAC/Z2eFFk6x/EDB1ydMvQ86LI1u101r53QJJ6XwDZ+jlfHYff/e/8t9jMUFstPDbbY8j+t0ozcD8W9VG+wLQeOsPq01srgW3B+VycaHK91KZl3k5Ye+47psuFOS+KbNu+kH1S2Cw1m6ZFXQa8KJKABJQISC/OU/mzIE+lnOjGfgTwNBGQXpynccEyL/FjnsTTxn4E8FQRkF6cYw5I7p+a8D21hOPHfgTw9BGQXpxjDkjW00r2n/jAk8N+BPDUEZAAAAAcBCQAAAAHAQkAAMBBQAIAAHAQkAAAABwEJAAAAAcBCQAAwEFAAgAAcBCQAAAAHAQkAAAABwEJAADAQUACAABwEJAAAAAcBCQAAAAHAQkAAMBBQAIAAHAQkAAAABwEJAAAAAcBCQAAwEFAAgAAcBCQAAAAHAQkAAAABwEJAADAQUDyyrWenSmOIkVRpCg+02ydP3ahKvlC03F8fOWC44s2mz/7P7bv/sz/0OYP870/tZy+URS9Vjr7ffiynpVjq4tjK0+AWttq+chyqnEUazxdaGjr3ee7wKERkLx+1yx9vQ1HUXR8JzQC0vHb/KJp8jrsxL/z/sy1WVwoid9oujRB7AlehA/m2Ori2MrTxde2Wj5JQMIzRUDyWc+UxpEVkCJF46mWx3IEE5CO3sOc+M0Ft/8iBgwT3rYISHiuCEgN1vBa/C/6+PHfiqG2I7oIEZCOHgEJTxsBCSAgufLflJ2eKIoixelM67I36bEO4rWW1+dKih6tOPmgm9tP/oCUrzTPJuVno2is9OJGK0+h89Vc2SSp5lmNUk1nS20klSfH+EzXi//SeXKiKIo1mtwUv7/Tap5pkpwU64k1Sr/VfHXnXc/VNNXI6o2Lk4my+apel5ulZrXPjZVOZ1pu3MKHr7tRluVU4+i10utPujkvtn10rnmxDl+dXLjlVK7NcqZpOq56F2t158xfs8J16/rXv4bvz7JO3GFg08vZMoyzWWp22bYss74ieI8/ar740arjEyWTzKnjvnros9Zy9r2zH6eaLdfWZ6yL9PyTrq19421DDc26qC7Iv2q9rLYxTj7oZnUn6U6rmw/W8Xau67JMdmj4h3Vcnig5/3l7nOWrat9GJ0omP1p13DbEVj/GozjRJPtPTd+/ttpEzzGZrzS/+qh0FFf7I040yebW8R9an21ty1/L/pBzp9X8P+vtw9OO6vsjK8vfun+HtOPGDWRbe2g/J+BlIyA5tgeMPe/IOlk8eI/NZ80nX9VPVFGkaPRWycg5AVjBzv2JTzPd2ueP20yn7hBicQI7zX5TXp6Mv1by9sT53Z1us3dOADAn5HfKbq2L6OZGE/uE7QkNw8o+YN0e2317orfJ19WFoVh+f52E1l1fQPKs/4vnhN5bJwMC0uYXTRP/sqLRN5qZC5a5sPxlpJFnG+19EVpffmstpqf+/RiNdTa7Lb5fbcto9GqHfd4ekEbv31sXWbN9l1rcnNfCfD0cmOWN9T5965T/RKfZf+umcbzawcEXkFqO8XIb3YDkOya7luFff3d97huQcm3mnnr0LKtrf9Tbwg7tODgg+c8JAAGpxhxA9onJvuA97ORKE9Zqd7GbhTJzV1aW0QSHWKM0q+6m8pXmF6lGtYuWOflZd73lhEz3IhspTi60sO6mygvj6ExZeWd9p9X8W6Wj2Dq5VBeTNFtYvQp3Ws2+0cg6oZYnybPr6m43v9XsbFwLUuHr7q7PKD7VdGH1VJRhpF7WfHWji3RsXTiqbbJP3PnqWmej2Hvit++q29fvntCrNlf1bMi6QJg68Q2DuBcB899OT9tmWfYgxOlMa7sczmfL7Wust78eOvdDrYfO6kVxQ4H72bJt9PXqtl0Qo/q+LpcXKYoTnd8U62mt73obrOrH3l/uMdVTHrtNe4/xjmPSHD/2se/dH0Pqc48hNtOOasep/Me0vT/K3m6rF69R9gHtODggeY5JQASkuvICYR1sXf9+UB0nKNMzY04A5dCI78JUBCLzOzNk2HkRaxsK6Dppmou653f5SvOrTFmWKbO6x8u6NGUapZpmmbKruWdYcMd1258ygdPZh53zINYzpbH5nVlPrFH6UVmW6aplmKcrIDXaUOOEbkJs38UpICCVFyvPsIEJhm476r2whNdDe5m/0mT+2fmdCfpuuGvemLTWpXddzQti/XvV9tTbgPn3vvK07a/i3xshx12e75hx90XIE3B3Ws1/2B5n2XfV8GXAMpr1cj9zkPLVXFfZ9ti/LIf0+vaHZ/0Haceh7QgvFQHJUt3NdPwEDOXcD/fk2vE731N3LV31u15YauvtrCPrO/adueenKoN/yCVOJros57QMXLdH98Wxu/7K73i7+U+UTL6vzZ/ZKyAFT8IPCEhF2/Dv75aLUCM8hw7bNeuhqatdu/XWfpHeLyC1BaHQgNQShAYHpAHHeGdAMr2ygcN0QfW5X0Cye9W6jtP2cOXU/S7tmICEPRGQSlb3c+fPQ03WvueAVJsHc8iA5F7ciqBT3EVezVf64i3D9u730p4kXVx0t8ODQ9btt09AqoWGfKX5lXWH7gnPzz4gBdZDEwHpvgNSNUyUaHJZ9NRezbVqzG17oIBU9rifKJl8V/Ro/aD5ah24Pzx1T0DCIyAgGUEhw3OxPJiOoYi2C2pIuQ42xOZoLZM1v6brpGQ/rVKbF7X7I+07DbH1L1Wb5U9FsGvOq3qSQ2yhASmgHtrLPGSI7bkGpPsYYutYhjnWHzggtR9Ppp48k+bLJ2Rbtutehtja1k9Agh8BSVK9F6HtImD3MPlO7gcolW9Scuckbfex4moCc3XR803SlvLVz8Wjw280XX5uv1stylR//Nma0Nw4odkTNZ1XFhQnJfMkiV0ee5Jr+bnQdbfVZ2tAMSfYRJNr6zH1cpK706NhT+Qttms7RNh9IQ4PSC2TtMtHyLt6WO5hknZvQAqvh679ED5J+7kGJLsu7GO82jfhAcl+wCDXxnqFwWMFpNqkcXub+ibN221hl0na9jlu+ku1zOysGIYkICEMAUlS6KP89hylhzmg2ubmvNd79zH/rkdgnSc02h/RNndyXT0GXY9o2yekjkfy3TrseKS9HkZD1+3XfjK0njjyldN6aqi97qL63a3dI1kMOYUHpJ46KddTHx7cPsV3D4/5B/QgBdeD19DH/J9vQBr8mH/HTUv4MkLq09e2/LXcHGLrOp59AaXtMX/nRjS0HbcNm5cv/iUgIQwBSapdzDoPFOtptod7J9Jay9nUeoHakBdF+l6+Zz7qvBSx9lK5viEV92WNkf8lgWUPjBViJt9rtvhbs/yNF0W2lT1w3R59J8NGnXhfVul5QaL3c8071kEBydRfbX96XtjY6FH8o/1FkX0v4hw0xBZaD23q7br3RZHPNiAVdRH6osi2Sdqmp7gM9RNdzj5pHjik561Pb291k3+StunVtbbp8ict5h9r62l/UWS9l7gU/EJZ97x5ruvlZ2d/EpDQjYAEAMdmyLxCAAdBQAKAR2F6qNz5d1XvIz0bwOMhIAHAY+l6evbB3rkGwIeABACPqDn3zffHgQE8NAISAACAg4AEAADgICABAAA4CEgAAAAOAhIAAICDgAQAAOAgIAEAADgISAAAAA4CEgAAgIOABAAA4CAgAQAAOAhIAAAADgISAACAg4AEAADgICABAAA4CEgAAAAOAhIAAICDgAQAAOAgIAEAADgISAAAAA4CEgAAgIOABAAA4CAgAQAAOAhIAAAADgISAACAg4AEAADgICABAAA4CEgAAAAOAhIAAICDgAQAAOAgIJX+rix5pSiKWn5OlEwyzVd3j11QKV9oOo4VxWearfPHLs3LZfbDeKrlveyGP7WcvlEUvVY6+7171cupxlGkOJ1pbZflsdpE/oc2fxx+vY3tfgbyzUZ/lP/xHI/t8HYNHBMCUqkvIBU/8Ttlt48ckp7lSfQJIiBJyrVZXCiJ32i6/PPwa3tWAWmtxfRUsd1+nuWxTUDC00RAKgUGpCjWeLrQo566nuVJ9Am694A0YNVHExTMxY+ANNgjtp+HRUDC00RAKlUB6dVkri/Ob/PVtc5G8TYkJZlWj1JGUxgC0lEgIImAtAcCEnDUCEil0ID00D1Iay2vz5XE2x6sOPmgm9tP/oCUrzTPJuVno2is9OJGK09h89Vc2SRRbHrGRqmms6U2ksoTWnym68V/6Tw5URTFGk1uit/7v38xXzXrJV9pfvVRqQmXUaQoTjTJ5k651lrOptbnYo3SqWZL9zJ4p9U80yQ5sT73beDcsFyb5UzTdFyVpbbd1rZ7Tuatw1rjqX4kWcIAABe9SURBVJbrhTKzXO/27bHuzVLXZV2fKDn/WbeLwCG20DaxWWo2TTWKrM9NZ1puulr675qlr+s9rPbFfrPU7NJZd+8y62Xq3W5J27bzvdMm3LZjB7l/WMfUdrmrfFtXN+fW+iY/Nst6X/W5nimNrXoz55Uh+7G3Lp1tzs6K8niOmWK9cfqDFjcfivV8pcn888B9mWuz/LHaF3Gi85v/1cJp161Bd8/tDzkvbdf9Wun1p2p/j8413+Q7Hgd4rghIpcAhNnMgPYjPmk++8pThrZKRcxLJf1N2euItc3ya6dY+19xmOo1923ei0+w35WVA+lrJ2xPndyHf7yl/Y6jyTrfZu+qk1jrnK/RzfmHl3iEgjd4pTdy6jzU6uy4vnDuve3OjiR0uzbKTtxr1BaTQNjGg7dR1BKTNL5o26sS032806wu0odtt5vF429hYZ7Nbp27Hep++dT5/otPsv3XTaKvOzdB91ueQgLTz/unaZmc/mID0NtFbUy5zTAXvy1yb+bkVLszPSEky0s4BKXD7Q89L23Wf6G3ydVkn8Wmm2y+71jOeKwJSKSAgxYkm1/Yd/2GVJ5HkXNfmbnhj91SYk4gJDrFGaVbd7eQrzS9SjWonCHNRs+6cy4m25gJnTqyR4uRCCzsQliersdJsYfUo3egiHdeCyrb8Tplk9caZi2kZNOyT7Z1Ws280si5S5QlwdKas7B2402r+rdJRHHyxqC6anrLsEpCcO/J89XPR62aGnXZdt/lvuzcj12aZlT1t7QEpvE2U+8kKdMpvNTsbq3/ozDfEZv7N6amweoS6h8jCt9vsk3pPgdXrWtZH1abt9mMPncfJB92s7tQ8HnSY+vQNsTX2Y6717GxbZ2X5ZIWWrv1jbXOc6PymqJ+yp8zqFS7b8omS6S+eXs2AfVmW3T5Prq2eq10CUuD2Dz4vRYriU00X1dr3Ow7wHBGQSqGTtN0TyKF0zO0wd9fmJNI5l6EIROZ35s61c95DX0hoGWZcz5TGvt/daTX/QVmWKcu+s7rfzUnQhLax0umlsuwHz5BZ11wXcxLtOomZz8QapR+VZZmufEOCuwQkz1ywej3tuO7W/VrdqbeWZZc2MUo1zTJlV+7wYBfPfikDr6e31VzIuubPBW+3Wbc1FFQygcYNm+5+NW3PbTvFvx+yPoMCUlv5QnTM/XH3Q+vQVvi+bD83mJ7kXQJS2PYPOS+1rnuv4wDPEQGp1D0Hyd9zc0jOCbrrd43uel/vl30SC72Dd0+s1d1c17qqZZteoO4y1e7Y3R67y5+Ku3XPcE7jp2cSqHeo4ETJ5HtrvsqOc5DcXVTsk/Kzu6zbXUbX8t0Ly4A20TZMFScTXc76ekw9Aamr3CGTuoO3u+sYcS+abesNDEiHqM+QgLTXAxldde38rm09wfvyj+Lc4DsG88bvggNS0PYPOy+1nwP3OQ7wHBGQSj0BSdKX+USvouiBulvvOSAVZX6IgGRO+FVXdqLJZbbtQbqaa/XFf9LLV3Nd1SaC2uP/IQEpYAJ9vtL8yurFKi9upgv+QAFpl3UfOiDV2vG2l+/SnuBahLj6vLK2tkJAGlyfBKQHDUjuecm/TbseB3iOCEilAT1IDxKQOoYPBg2nOA45xOZdhqeuTBk6T3r2k0lvNF1+PsDj5Lk2y5+Kk6F7IW0Ph81J2s3hh/56Clh37/J3HWILYD+1FNRWDjDE1rvduwyx7RiQDlGfjzrE5qz7HofY7Kdd28rRO8x1n0Ns3s8Gvioi+DjAc0RAKoXOQXq4A8U7Kblzkrb7aHI1gbkqs2+Stjux+HPA3AVnwno5WdW92NuTJt1HgOsXn9okTKkaljIn4KI+apPWZU3EDJmwak9WlVR1q5tttSeFmgnqPROjaxN37W10Jmn3rtu9kPgmBg+dpN3fJsxTPXZ7sIc9w3ob73OSdvh2D5+kvWNAOkR97jNJ25po3R4K/BPTq/1gfbe1p2bIJG3fRGn/JO0qCFkTpb3ntsDtDz4vtQek/Y4DPEcEpFJoQPLdrR5K25j4e713H/PvehTXfVqj9XFYc/fX9WK3lvlCZdmqp97a12PK5V58usrUXh+mC7xv8nxneew7ZO9wyolOP37Qe98Fru0xf/u9UUHr9j3m3zJ3KX3X/5h/aJvoeIy6v73XhzfKJwn3fsw/cLsHP+a/a0A6RH3aw8bFEM7Ax9y7XzvS95i/9d2uoawhj/l75xK+Vfp+7JxP/EPm8en/08f3r3fY/gHnpdbhvX2OAzxHBKRSf0CKk4ky79NHh1R/geKwF0W2vWxRzReq1V5u2P/m28b3vS9Us+6urTq8nH3SvLF890WRkedFimaZWX0ej/dz3lI3X9boLbfzOXNX2jbvx/eiyMbrIELW3f6iyOrldfu+KLKlTTRekNfedhraHmDY96V7IdstKewlo/cQkO69Pj29YsH7MeSPZ1vbvPhf6yWYnv3QN9cneF82jx3fiyKbyzQ9c/8IrHf/9oeclzqH2PY5DvDsEJAA4Fl62D8DAzw3BCQAeJYISMA+CEgA8CwRkIB9EJAA4FkiIAH7ICABAAA4CEgAAAAOAhIAAICDgAQAAOAgIAEAADgISAAAAA4CEgAAgIOABAAA4CAgAQAAOAhIAAAADgISAACAg4AEAADgICABAAA4CEgAAAAOAhIAAICDgAQAAOAgIAEAADgISAAAAA4CEgAAgIOABAAA4CAgAQAAOAhIAAAADgISAACAg4AEAADgICABAAA4CEgAAAAOAhIAAICDgAQAAOAgIAEAADgISAAAAA4CEgAAgIOA5LNZanY5URJHiqLiZ5RqejXXKn+4YuTLqcZRpDidaf1wq8VTki80HceKxlMtA9pmvtnoj0OsPz7TbG0KkGuz/FGT5KQ4ft5ouvxT2ix1PUkUR5GiKNZ4utADHk47+lPL6RtF0Wuls98fuzB7+KLN5s/HLgTwpBCQanJtFhf1YOT8xMmFFpuHOa0TkNArOCCttZieKg4MUoPXbwck82/muInPNFv/UQQNcyw9lcDxDALS5hdNk9dPJJACx4OAZMlvM512hKOouPMdTW60eezCAlJ4QBrY07SX9UxpHCk+zXRbrut3zdLXiuJ3ym7vDlwA2LY3Wk+lxw44HgSk0mfNJ19VISj9VvOVOZGvtbw+r3qWasMJwCM65oBU6/k0AYlj56ERkIDdEJCM4qQeRe6dr3Gn2yzV6eQ7Xc1XD3KicYfYqhPd37SoBbZEk8wzPypfaZ7Zc6nGSqczLTf1oZA4/UGLmw/F577SZP65/fsXN555WHdazf9T03Rs9bSdKJlkVsiUtnNTZvXPjVJNZ8tmj1zwulvU5rtEipOJsuup3jcu3FK+miuzPhuNUl04+/he6t4tf0/956u5rqapRrUh3okyu2whwcdq2+YGoLpYhu277fa/Vnr9STfnRV2NzjVf/2oNsbnDaMXNRvK2tg1RFFXl3Sw1q22j00Y7rbWcfW/NdYo1SqeaLe29a4bI3mg6/9RsE73HcnOIrWoLv2ptzbWKkw+6Wd1t67Tcn5Hi5FzXVpnq38+UjuLWdifJMyfSU0fetvRPep++rdq1PR9syLEIvFAEpIIJI8c016AtIP1l9BfnpLe9qJ1mv1kXzt+UnZ44n3ECoDmpvk30trzgF0MgId/frkib+XnzAuheCNU1hLlD2btsbjQZxf7yOHO6Qst073Wvnvrv3AZzkdOeAWnAvltONY5O9Db5ugoYp5luvyx2D0hf9tnPxZwqb9nHOpvdFvujCjij0avmZ3uH/NoD0uj9+8Z8xfj0UosbT5026tL//XrZVcwf8tdRNPpGMxNivW3pn/UfH//VG5CCj0XgBSMgFb7MJ3rlXnwemT8gFXeQZW/EnVazb7Yn5PIknGs9O1Ncu6uVdbIttrGcTHuiZPqLded4p9vsneIo1ijNrB6nleYXqUb2SdQsY3SmzL5zz281Oxtb9WkuNPULQL661tnIvsAPWLeXWY/9/Vwb6069DEhlkBkrzRbl9uerG12k49rFM7zud6i7Rv1XdWWXq1qf1QO0zxBb8L6ztj8+1XSxbi7XHjoLHGIrg8LZddWz5lm3d3NMeWq9LtZQeLmeP6vQZn+2XE/f0FNbQIrq+6dcXqQoTnR+U6zHPeZq3z9Rcv5z1ZZMz8/oXPONXXZnyN/qHa3acltb8g2xhR6LwMtGQCpUAWmkyfw4OpnbAlLjqbbGRaq4GPWFPe8j2uq56BbL9vwuX811lWXKskyX5VCGubCY0BZrlH5UlmX+ocod1x3y/fYhS88Fcj1TGle/C677IeVvq/96pWp+ta3TzBpmaVwY95yD1L3vhrQ9hc9BMj1bo1TTLFMW/BoNc4G3hoNLJqCasrc/hRb2lGh7QKp/r2rf9fZk/j2gLt2ylwHWBCa78EW4d9udpy0123ngsQi8cASkwlMaYmtc0Nsu0n0TYts+1xiS8fzYPQHmztP7Was+vcMFJ0om31fzRgauu8F7cfb9rupl61rX4LofUv6u/WT3SHSUa9+AFLrvDhKQWobJ4mSiy865MN0Tvuv7ypqD5Nws7BeQ2oJQaEDyB/Pa77rasrtdgwKSwo5F4IUjIBm9k7RzrWf/rnH6UdkDTWQ86oDkG6abfLft6ch+0Hy19t+55yvNr76zJtY6c0GGrNvnngOSCRT3GpB6L2rVsFCcTHRZ9OxczVf64l7U72OILWDfHSYgSdtJ4j9YvVYhc2EISHsHJKn/WAReOAJSyQxLmTuprP0x/weap7RzQDroEJuvjL6TvSlDV49crs3yp+LiWCxj38fR72uILXQ7Bw2xtZQ1uP6tuWX3EJCG7LvDBSSH/cRW6zbtMsR2bAHJt96W0HPvQ2w+nmOx9bPAy0BAsoS9KDLwSar7KM/OAallkna+Kh7RdsKI565+e5E5UTL50Xqc+E6r+bfbyc5Oz0ptQnLtEXvnQmVPYJVUDbOYz4Wv269tkrb1OLY7STtONLm2egXLCdXuHKSQuh9Q/r6AVJs8XQ/p9xmQ+vfdYQKSeTKumqis7b4q3mbfFVyGT9I+voBUn4Rvlb3cRztM0g4KSKHHIvCyEZBqQv7UiBU4Dl2anQOS1PWoeXlH2jUU1/V4sf0kU9d63ItsVwC175JD190m+DH/7v1t/1mZQXUfXHd9AbWjHQ4NSE4P6Wn2m/Ih++4QPUid6/f1DtmGPuZ/bAGp7TF/Z7sHPubvPZbtYd9i+Cz4WAReMAKSz5H+sdpBF2lJzZcVOkOHfXOVGt/3vYhP1WPxZQhINLn8SYv5R+cC5Hk5XduLAQPX3WqfF0V6yrR/3XvK3zlJ2/Ri2fvue80Wf9txSM//qoPQfXewIbbGiyKH7Oe1lrNp9aLFvhdFHllAGk8/6bZ8qWPHdoe8TLPzWF5rmZ0V36+eKg0+FoEXioCEF4M/uYBjQDsEngYCEp4Z01PhzK/YLJSlYx3TaxzwMhGQgKeBgIRnpvvx/YeaYA+0ISABTwMBCc/QnVbzrP5+l7Y/Kgs8MAIS8DQQkAAAABwEJAAAAAcBCQAAwEFAAgAAcBCQAAAAHAQkAAAABwEJAADAQUACAABwEJAAAAAcBCQAAAAHAQkAAMBBQAIAAHAQkAAAABwEJAAAAAcBCQAAwEFAAgAAcBCQAAAAHAQkAAAABwEJAADAQUACAABwEJAAAAAcBCQAAAAHAQkAAMBBQAIAAHAQkAAAABwEJAAAAAcBCQAAwEFAAgAAcBCQAAAAHAQkAAAABwEJAADAQUAyvsw1eRUpinw/sUbpR13NV8ofu5w4Cvlmoz8euxAH86eW0zeKotdKZ78/dmH28EWbzZ+PXQgATxQByegMSObnRMn0F20eu6x4RGstpqeKx1Mtn21afgYBafOLpslrjacLbmoA7ISAZAQFpEhR9JUm88+PXVo8lnyh6ThW9KwD0tOXL6caRzEBCcDOCEiGFZBeTeb6Yv9us9T1JFFchKQ4nWn9WOXE4yIgPQkEJAD7IiAZXQFJkvRZ88lX216k+Eyz9eFPu9uT/Gul1590c14EtNG55pvtuvPVXJkV3KJRqgtnnlR1ofhV6+WPmiQn25CXfNDN6k7SnVY3H5TERfhLznW9dOPfWsvZ9+V3t3OypppZn9uu50Sn2W+NC1K5HeVwzZ1W88xZ3rear+4Ca2at5fW5VeYPulndapa+tvZN+zDRtjxu0M21Wf6kS6c+p7NlNaS6nimN63PTqgvwnVbz/9Q0HdeHZCeZs125NstZ/XPuevq2vWdfVNv+RtP5p3q4TybKeufSNetu33ZU/36mdBS3tllJ0map2eWkXF4UjZVOZ1purE8WYTVOf9CiXPc/6X36ttqHUbSth+Wf91D3AF4SApLRG5CkL/OJXtVOuIdlQsfb5OvqAnea6TaX8ttMp7WLdXVRtkOKuTCN3r+3LjZmWZda3Jxr5C6j1jtSzLnxDjeOdTa73a6rtWeluNiWweVOt9k7//Lid8pu+0KSFVTtn9E7pcnJjgEp12Zx0aifMoCcXWuVqyMg5drMPfXoqc/Q/eYXuC+sbR+NXu1Qz+0Badd21PX9etlVzB868dfl6BvNTOA0AeltordmmfE/6z8+/qs3IO1X9wBeGgKSERCQtMqURJGiaKTJ/PD3nOZCHsWnmi6sHoL8N2WnJ9u76mxR3v3mqxtdpOPaBbBchv3Z/Fazs+IuOk50flPcwZcXpioAlt+v3elbPTiN4OOExyJUmDBSXqRGZ8rKHoY7rebfKh3FZQDsrRP7+5uFMtMrsEtAMuEuGiu9uNmGIeXalD0l1jJ8QdD8W22b7Ho2dWLKVA8E+epaZ6P+YbvwfWHW43y2LE/f0FNbQLqHdhSdKDn/uahjq9ep7Bk163Z6Fa1h7uZ+az480Rxi26/uAbw8BCTjiAOSO+epc37FeqY0rn7XNpy0np0pbizD/Lu5MJqLim9iuglEVnhw1l0tzw0Ivh4497M+Hd/f3GgyincKSGXvxuSmMdRiAl3jotxyQc1Xc11lmbIss4brTBmqeh+lH5Vl2YBXRwzZF0OHF9vW1QxIu7WjrvU6ZS/DZjWUXC22uDEw+9h81jPk3TxG9ql7AC8RAckYNMT2mAHJnOhbhnPMsIdz8fdfwPoubL8783p85bOXUXy+DA8t/91Z9q5Hy7vK4/4uNCQ0L+b1DzuBqCUglT0RfdvkHT46UTL53plHNGTb3X3RHiT3C0i7tqPuUF/7ndPj6C9XsV2DApL2qHsALxEByTjaSdq7BSRzAX/YgOT0AjV6lEICUtfwz5EGJHuoZ/KdsixTlv2g+WrtL0O+0vzqO2uidcjcIALS3gFJ2rHuAbxEBCSjKyDlK80v0nIS6kM95r/TEJt3Gbte2AYOsUllKBpN/qbbxpBZ1xBbUI0U5fOUp3GxbAtIVcC8ryG29v1hAmFXr5j99FzXPt1liO3YApJvvS2h596H2HxC6x7AS0RAMo7wRZGtF5XyQpFocm09olwGOXcO0v4Xtv6JwYY1Qdh5kkmyAof7GLiZYN4XnsyTZLVJ2tZ7qsryWEEoudBis/23jfWI+X1N0i4DVppVj6HX3p3lBBd7QnNRn9un07rfXD18kvbxBaT6gwVW2cv63GGSdlBA2q/uAbw8BCTjCP/USPvFrOuxdDsQ7H9hC3+0vFluf89J1/JC6rflNQGjt0pGzsWy8Vh+8Uj3xw96XxvGCXzMX1J9mLB4PLx8qrB/XlX7o+aRv9ckuO58j/kfW0Bqe8zfuekY+Ji/d9jR3vfF8Nl+dQ/gpSEgGUf4x2r7LmaNF0V6Xqa3f0CSti8nnFYv9/O+nNAuWMeFS1LzRZHRwBf2Va8F2AbCc10v/uZZp/NiQNPj5p3nEvoSQX8vVNUDFlXruvxJi/nH5juX3PX4XoLYKmRfHG9AGk8/6bZ8qWNHO9osNZum1ruV2l8U6W9nay2zs+L71VOE+9U9gJeEgITnoTeU4THxpz8APDUEJDwPBKSjRkAC8NQQkPA8EJCOGgEJwFNDQMLzQEA6agQkAE8NAQkAAMBBQAIAAHAQkAAAABwEJAAAAAcBCQAAwEFAAgAAcBCQAAAAHAQkAAAABwEJAADAQUACAABwEJAAAAAcBCQAAAAHAQkAAMDx/wFplF7th8o4CQAAAABJRU5ErkJggg==" width="400" /> </span></div>
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<span style="font-size: large;">The answer is (C). Rise in protectionism would imply that people start buying goods and services domestically since imports have become less price competitive. Ceteris paribus, this would support domestic jobs </span></div>
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Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com0tag:blogger.com,1999:blog-4710215856934992447.post-15416050072783222952019-05-27T23:43:00.000-07:002019-05-27T23:43:03.492-07:00MCQ Walkthrough March 2019 9708/32 (India) (Q11 to Q20)<img alt="" height="134" 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" width="400" /><br />
<div class="" style="clear: both; text-align: justify;">
<span style="font-size: large;">In this case, % of change in input > % of change in output. That means rising unit costs and therefore has to be decreasing returns to scale. The answer is (B)</span><br />
<span style="font-size: large;"><img alt="" height="131" 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4wVBuOiJ9ALFMZLbXYcfbIMNXZcjcM/tV5GCjw3//2b+co4H1+0DF9uh/EW/6lrf7Q9tuks3cday/jnjuNOf9/srUzP+ddlWAwL1no1H+u6AACcq4sLV0n6IC3mWRnzr04+sf1B99HrYmK9+SoFqUSbxY380nDWJ82n38lxvtN0/mnY9oyAWX2Vhst6vi+5j3RVHWZ1HDnOSFfRX53BJAtX3vffG0GvCHKT+D79/Sxc/U3+q1Fl++kcqabjzrdBuAIAnMaFhSvjAZsHKfObg6ed2J6HEm+iKO9hedBq/qMCz63MC8qC00hX0X9pPb+WV+q5UTGXzPV1Pct6fbLgkYWEbDuuvCAqeqCSleY3gTwjEOXBZ3JX9Ggl94onY2MYNatTMwhJyepOE2/30FoRdkfyr39L9/Og1ezNNmx515pvEpnnzvVvtDB6zvJtlHq71lreXW+3YYbmhmHBxAxXEsOCAICDXFa4Mr4pVppz0/bvR5WFhaa5Xlngq/ws60nyXsn3XCN4mL+zo6elMzikvXjZz7Kw5gUKo0jRu3l92NDYrxe8VRRFelcazutWCza5LARmgTerr2oAzv7d7MFr24YIVwCAo7uocFX0knS8qvOajqa6HETTq96TVgzBVcNEW/ioaPqmZK0Osp6e5uE215/q1pxPtfmg0K8OH47kT3+uz/WqKOZc1QNh+Wdtx5fWY8uQbm37hCsAwJFdULhqmnPT9DrVHJs+4apalkSb+XU6ubw6n8liuCr1mD1oNX+v26lfCVmV/Scrzd/9ZEwo7xdWCVcAgG/N5YSrXqEifZ3kodo1LNgs67Vyr/6Xbv9ndTK7jWHBHjZLxbfptwxbt5Fos/w1DWTd5WkfFqzWD8OCAIDzcCHhqs+kdbNnq+lBfYRSZWHJv9adMXyWrGa6Ccbl4JXNt8p6gvJlGIx5V40T2o3J4eNQy6SYGO9PfzGWVCgm0mehYhs6zInmUumbi0Gsdf4tPnOfUjGk2N2TVgzVjhVEi2JZhWwyeh5w2nvmmNAOAHhKLiRc9VtuwZyTdZqJ7V1LCIzkhx/SsGF+UzAbisuGCM1vDHYsxWAGxsY5Utkw3pXCRXrkHUsxmNtrX4rBqUy6r+teisEMuV3Dnn2WYsje2iNclYZsdy8nAQCA6TLClTEk2Gtl7h0hzK7qop9ObQHOYjiw+idbmte6qm7P9aeKqt/gqy0i2rLYaG0R0ab3NSwi2rjYaF0xJ+oP3Wc9bI372DWnbK1lHBaLkLYdT69wlWhjLGh6um+QAgC+BZcRrvBkdU1oBwDgHBGu8KgIVwCAbw3hCo+KcAUA+NYQrvCoCFcAgG8N4QoAAMAiwhUAAIBFhCsAAACLCFcAAAAWEa4AAAAsIlwBAABYRLgCAACwiHAFAABgEeEKAADAIsIVAACARYQrAAAAiwhXAAAAFhGuAAAALCJcAQAAWES4AgAAsIhwBQAAYBHhCgAAwCLCFQAAgEWEKwAAAIsuKFz9W5H/TI7jtLxG8qeR5quHxy7o+UsWCseunHGoZfLYhTGttby7lu+m53z8H4r++VKO81xB/LH0zmSz0edHKiUA4LwRrqov97WiewLWQZ5ouEqWocbGuXaDf2kWVsPVWovwSu4TKzsA4HwQrmovV+NwIZ6rB3iS4SrROp7IdUa6iv5qP79PsuwAgHNykeHq2XSur5WfJqs7TTx3G7D8SKtHKeM34kkGlCxc1YcAy297imUHAJwTwlWqCFen67naDlO5Goe/a2HOBXJ9TaO5VtVCbJaKb6fF+5yxgjDWcmO8MQ0HbvBei9mb9L3faTr/f1qGL+U4LxUu/9uYezSSf/3bdl/JSrNrX24+B+2X8rYlJau53oWBPHN4zZ8qmq+KOusVUL6UyxNN0m268oIfy3PfWo/pU796ycpT6qF8qXD5KS1DGrjWsQKXXkwAwGEuMlx1vrxrzTeneZxm4eqF9yINNOUJ9qXhq80Hhf6opcw/KM7CSBZEXvl6lYe114ru12mQGOv74FVlfyNdRf9Hs+l33UOkm5mmXjWkmGHlS6kM/cJVU3n6HtNDv3ohXAEATohwVZrM7mt6t9TmRCUqJliPFdzM0p6qB63iH7a9OHk4yYJIpVdns9TddNvT5Aax1pIRJEbyww/GsWTbcOR4E0XL9bYMxnCo67/RbPUgKdFmcbPtCaqVYawgWhjbzcprBJFB4Wpb79eztOcr7z1z5U1n2/3sPKYe9dI4LPilHK56lx0AgHaEq6YlGUoP8OPJwlURALIfpA94d6J4nRT/39Srlvyl6GpUf2/2/7mGICFJ+qg4eF7ueTL/vbYdSclK83eRoihSZAzH1QJer3DVMAeq7zENqRfCFQDgRC4yXDXNudJmoSgYpz0pDYHiCIo5V5Whp2qYSIeraiFMUnnu0pce4aolRPUJV8m94sm4NZjuF66q+x1wTEPqhXAFADgRwpXh63yqZ9X5Q0d0XuGqGMZz/aluo23P1bv5Sl+rPXCEKwDABSNcZcyeq6cWrqwOC+4ZrlpDRxZabA4LVn6fYUEAwBm5yHC183WiB2vvcLXPhPZjhStjMnz1z8nsF67KE+yLY2qYIN96TExoBwA8HYSr2stYP+nI+ocrDV6Kwf6w4IPuo9cNS0YcOueqbSkGozeq9ZgG1EvfcJXXR8NyGAAA9EC4MsNBdTHMIxsUrqTtYpmlBTzbFxE9zoT2leY35v5H8qc/K1783jyM2XfO1eK/jMVLhxzTgHrpHa4SbZaRgmx5isb5XAAAtLugcIWnpWtCOwAA54twhUdCuAIAfJsIV3gkhCsAwLeJcIVHQrgCAHybCFcAAAAWEa4AAAAsIlwBAABYRLgCAACwiHAFAABgEeEKAADAIsIVAACARYQrAAAAiwhXAAAAFhGuAAAALCJcAQAAWES4AgAAsIhwBQAAYBHhCgAAwCLCFQAAgEWEKwAAAIsIVwAAABYRrgAAACwiXAEAAFhEuAIAALDoMsPVZqn4dirfdeQ46csLFL6ba5U8duH2k2w2+vzYhbg4X7QMX8pxniuIP5Z+su/5SJahxo6rcbjQmV6KAHDxLixcJdosbsqhqvJy/RstNuf0WFtrEV7JHYdanlOxvwlN4eqw80G4AoDzd1HhKrmPdNURrLYvV950ps1jF7avZKFw7MohXD0NB54PwhUAnL8LClefNJ9+VwSo4EfNVw/pz9Za3l0XPVruRPH6TB5thKunhXAFABfvcsLVOlaQhif3KtJ97cn1oPso0NX0J72br07yYNs+SJ8ruPtDs2tfruPI8a41T4clk9Vc0TT993Re2I1ZNuOYstA4DhdKsgd8LSTWh7Fay7D+Mw0JbzVf/KKpP0r3MZI/jYxg2nmE2ix/1W3lGMJ4WeoZLALF71qUQq6vadR3HtyDVvPIKKcrLwgVL9eV9/xLYTA26qx+PEV5/tR6GSnw3Ob6r9Zn2/nYa9+EKwA4VxcTrrYPLadx8vFj2ZZppFf+3/LwkQW/9iHMka6iv7YPXmvhqqEMX9NtvPDkNZSjOaCWjq5jfpsrb3KXh6YsULzwXhQhrOl4Wz3oPnrd8LuOHPe1ovuHbXnm1/LahoONnqasPN733zeUf6xJfJ+Wp2+4Gr5vwhUAnK+LCVdf51M9cxw5zkuFyy+PXRxJRuBzrxQujB6W5C9FVyM5zlhBtMh7eZLVTDfB2AgMah6GGhyumsqQbqMyhJqs7jTx3N31mP/+WMHNLA1SiTbLrBesoQyl9z5oFf+wDSS7htiyUOP6up5lPUvpxPJq4PQmiszerORe8WRcOp6iPCP5178V5Zm92YatvHexYUJ71/novW/CFQCcswsMV56m86cxXT17iLtBrHXt31sesOtYgWv8zFK4qpZhyDbaj635ywFZr1y2z+FlKL1J63hShKjWEhm/sZrrXRQpiiJjyLJHneQ9ZNl7e4arwfsmXAHAObuYcPV0hwWrD/EsLHR/qzH/nWOHq1pI6BOusmNoeU9l262Bole46hf2JLPXralO+wWc8s/6hysb+wYAnIeLCVe7J7QnWsf/Q+PgraLKhOtjOSRc5Q9vwlW/cJUPU47kT39SFEWKovear9YtdWIxXFnaNwDgPFxOuNJHxcHzlm9pVZZiONG8rL2GBWsbGRKusjo4drjaZ1hw33DVb1iwvU4H1El+7Nn10S9cDd834QoAztkFhau+i4j2+SacpfK0Bpt0Qrvra3pn9KIlK81vAnnOjjlX+UN7JD/8kP7+Wstokn5j7fjhaviE9n3DlVomtBsT0MehFos07AWRltkK/Jul7jrmXJW/UGAE8LxOhoWr/vsmXAHAObuocNXvz9+80azXGk4WStPaQ9JdzvKf6Cn3yG2XLWgZWnT/rrdv/1EarjtauNpjKYa9w1XXUgzOd5rOPxnfwGw79/WA07wUQ7q91rpoOB977JtwBQDn68LCVeqJ/OHm9nCV/ry6iKgzVhDGRe/H9l3aGAtdFttaaxmHxb/717pbfqrNhTpeuMrKFpcXzuxcRHTfcCXVFxF15PpTRcain/lSFnnY9DW9/VWL+dtSHRTl+UP3We9X46KkTXXRfD6G75twBQDn6jLDFdCBgAMAOAThCqggXAEADkG4AioIVwCAQxCugArCFQDgEIQrAAAAiwhXAAAAFhGuAAAALCJcAQAAWES4AgAAsIhwBQAAYBHhCgAAwCLCFQAAgEWEKwAAAIsIVwAAABYRrgAAACwiXAEAAFhEuAIAALCIcAUAAGAR4QoAAMAiwhUAAIBFhCsAAACLCFcAAAAWEa4AAAAsIlwBAABYdDnh6utc02eOHKfp5coL3urdfKXkscvZJvmszefjlC7ZbPT5KFs+U0esawDAt49wVXqN5IcftHnsspYk2ixu5LsvFS6/WN72WovwSu441JIsoePWNQDgUhCuaq/vNJ1/euzSGr5oGb6U4xzhgZ8sFI5dOYSr1BHrGgBwMS4yXD2bzvXV/NlmqbupLzcNWG4Qa/1Y5awhXJ0O4QoAcDjCVe6T5tPvtr1X7kTx+hRpI9FmGSsMxkXPmRcojJfp0ORHxcHzcs+aEYSS1VzvwkCe8XPXnyoy546lAcoN3msxeyPfTXvn7v63Arc872wcLjrmnGXB47mC+GP5KJahxmYoNUPbeqEoP76xgpuZVj2rNlnNFRmht1w3mbWW8c+a+iNj/lyoeFmNx2st41CB57a8r6OuN0vFpXoeKwhjLTckUgBAHeGq9JapnjnOyXoukvtIV27T0ORIV9FfSjof+DNN86BQfRnlz8LVK1+vsn25rxX9+f744cp7rSAPPcaXByZ3OwPW7rqR8jljjXUw1iS+T9/3oPvodfP73NeK7h/UGq6+/qXoqnoMaZC9inRPvgIAVBCuTKtIvuPIcTxN58ee1p6FFTMESMnqThPPHKprGqoqfjeIFkZPzoNW8Q/yzKCUBZ2myfqDhgX3CFeOI9d/o9nqIT2233Ttj3rMa8uCzkj+9W9pEMsmmxcBM9uv4wW6yXvr1lreXW/fl/VA5mHvB8VpWRrrqqGut/uoBMLkXvFkzPAhAKAR4cp00nCVaB1P5KbLQERR1LIUxI55QMlK83eRoihSdDtNh/0agk7TUOexw1XDPrMeqc55bet426vWWa6sPE1BLeupysqahbWxgvBWUfRe8zxkNW3TqOusLF6gMIoUvZv3HtYEAFwmwlXpLdmw4CnClaTNB4W1YbOR/OnPxlyglnCV9540f+txv3CVBb6mbe0556oaRHoEutr2GqWBqWV+XNbjtO2VMnq9SkOCvqa3vxpzp5rqunno0fWnuq3N/wIAgHBleIwJ7Up7nn4yJmRX5wJ1DQumD/koynu+vg7oRbqccJVV9VzvjN69+typtl7CB63m73VrTq6vzf8CAGCLcCVtA85N8W2wx1uKIdFm+Wv6EM+CQcMDvzWgFOHodMOCw/bZFHpqrA8LNu7E+JZhVrc9l2LYLBVnIY1lLAAAFRcZrp7GIqLpg9z1dT0z51plw1BZMOgIV1ikzBIAAAFWSURBVN5EUT58aEzkPkq4MkKUf6PFJtE2DEb58gb1Ce2uvCBKh90SbZa/VMJMm6YJ7eaE+O3vD53Qbk6ul1QMy+Z10zahvVwOc3L901oTDQDwFBCuqvOdTvjnb9qXG3DkeNeap6HEHKrbDmF1LC0wZM5VafmBHkNcWY9SdWjs7Rt97w5YimE621nH7XVj/r6FpRhK22uo646lGJ7eav4AgKeAcJU9YB/lDzc3LCLatEDlxliIM++NKQ9l5hPhF7+Xw1RnuGrpeepbXtfX9G6pTRq6muZcLe6z3ianZRHQjr1VFxF1fU2j6rf1di0O2va+lvI01XVtEdG2fQAAcEnhCqfDn9UBAFwwwhXsI1wBAC4Y4Qr2Ea4AABeMcAX7CFcAgAtGuAIAALCIcAUAAGAR4QoAAMAiwhUAAIBFhCsAAACLCFcAAAAWEa4AAAAsIlwBAABY9P8BqRC9P+4oGIMAAAAASUVORK5CYII=" width="400" /> </span><br />
<span style="font-size: large;">Transfer earning is the minimum amount of profit that an enterprise/ entrepreneur must get. Otherwise, he/ she would be better-off by moving his/ her resources to another business venture. This would be equivalent to normal profit. The revenue generated must not only cover total cost (fixed cost and variable cost) but also opportunity cost of the next best business venture. (B) is the answer</span><br />
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<span style="font-size: large;"><img alt="" height="400" 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" width="393" /> </span><br />
<span style="font-size: large;">Answer is (D). For the same level of income, one is being taxed more than before. That means, the income tax rates have become more progressive. This will reduce the incentive to work as one gets to keep lesser disposable income than before. However, income inequality would be narrowed as the gap between the high and low income is being reduced. Do take note that the lower income group of people are being given more benefits now (negative income tax = benefit/ subsidy)</span><br />
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qnajxxmWwozadJ78mn97ONwM42Fflkv55jAnv9rV8FL+6a/f1P4DBb5zEjW1+90xDdpt9s+z7EfTvnXBRXwWciggMdnfp3273OhS/vmUxcLX9p35sJIvq87XdYam+9+L6g32YfW5FhJLd/ldKdytHr0jPYtTl3mN2U536lsSyFhRLYreyfeo2yfo+RJ7znDQNa+m0mhS/s6fXYKeA2F1GWHOpT9u2xf0SxbTU7e/9n7UaG/t1CpCCN5GL9wVJtST6GOf6jDm47mHppiv39e8wxSL0g0K+WCYcWYwB4/AmMrSvve0skP38s8hCT1ooeOF5bLddGkxJYnX2Au/nyFTIB2MCMT2ONHNW3vxfGTA+rPc75PpnHC6U019j4kXTAtw/5yPLuRSfJ7kP9FD/N97fFtyv+ih84T2KfwGSzqMC2Hix7mfSG09KU9Cwoj8f2Rz2chkwIen3axNccLMebzXS4kjEiO+zjrRQ9nLozk/7pT9lWuGpvPfi+oN2U4S5xJXhfvm8rQmZu6cPh7Du+rQ28sZFsKCiPS5Jnl5JCQ9l46/K3sQTJ1Wwv5vhVy0cPM72E+r6Gwuuy8xLDTb4zMFzo9nHxxRaf7Ze1HhBHkZ5phBACcFTKeGwC8g+FLQCEIIwCmIb7aUsr8isTRMo6IAfCo+JnXpLkVtrNZeZ7FByodYQTANGRfmpK15QF4V7blcnPM8QGQQBgBME0OY5DzGH8PAMZLmyeUOs8TQC6EEQAAAACuIIwAAAAAcAVhBAAAAIArCCMAAAAAXEEYAQAAAOAKwggAAAAAVxBGAAAAALiCMAIAAADAFYQRAAAAAK4gjAAAAABwBWEEAAAAgCsIIwAAAABcQRgBAAAA4ArCCAAAAABXEEYAAAAAuIIwAgAAAMAVhBEAAAAAriCMAAAAAHAFYQQAAACAKwgjAAAAAFxBGAEAAADgCsIIAAAAAFcQRgAAAAC4gjACAAAAwBWEEQAAAACuIIwAAAAAcAVhBAAAAIArCCMAcrvzJ3V8b7M2rH9BG9a/pH/sGlTU7W0CgIozpN6mrbFa7HR7UTt2N+uds19ozO1NBfJEGAGQQ1S3zx7UMp9fVvz2tR/rgzvEEQAorcvqWL9gshZnulU9pp2/+IxAAiMQRgDk8Ged2fNESrNbqf3BEbc3DAAqjD2MLNBT2/dof1PTxG1Pg/5m1SOqjtfpOdvUEb7j9gYDORFGAGQVHe7Szi+lHnmz9OCrp3Td7Y0DgIpiDyNPaH9wNPmfo/+trh1fyfzvQBkijADIYkxDnds11+eX5ZunlW/8WPuW3hM76rZdJ4YYBAAApZMjjOiael9dGvv3OjV/EHFlK4FCEEYAZBa9qOPrYo2v6kUdvzSscwdWJYYIPN92kYnsAFAy9jDykDY0vaWOQCB2a1frD7+t5VUTZ68XbmrTReb2wQCEEQAZjYeOaGVsaFb1ujZdiib/PyayA0Ap5TmB/cuvqufaXbc3FsgLYQRABqO2syAPaVvnf02cBbGfLWEiOwCUUJ5hxGdp4cYWnR8lkKD8EUYAOLtxWo0PWbHGtkjPNeyNrdqyRztWLRAT2QGg1LLNGbmlqxd61bZrZWxFLeozzEAYAeBgXCM9r+jenEffmMgOAKWTawK7FL3cpnXx+nx/k4KUZ5Q5wgiAdNH/0oktD+UxFICJ7ABQOrnCSFRjoaOqI4zAIIQRAGmil9r0fFWsmT20V2dupEaNqCLB1/UoE9kBoISyraYVUKD1dW17fD7DaGEUwgiAFDcVOrIm1szu0bIDA7rtdLfbAzr46D1MZAeAksl3Artf1gPbdPwi1xlB+SOMAEiWFDJW6eDZTFfwtYcWSw/uelfXODkCAEWUTxip0ZNb3tCJCyMMn4URCCMAAAAAXEEYAQAAAOAKwggAAAAAVxBGAAAAALiCMAIAAADAFYQRAAAAAK4gjAAAAABwBWEEAAAAgCsIIwAAAABcQRgBAAAA4ArCCAAAAABXEEYAAAAAuIIwAgAAAMAVhBEAAAAAriCMAAAAAHAFYQQAAACAKwgjAAAAAFxBGAEAAADgCsIIAAAAAFcQRgAAAAC4gjACAAAAwBWEEQAAAACuIIzAWMPDw25vAgAgBbUZQCEIIzBWd3e3QqGQ25sBALDp7u7WwMCA25sBwBCEERirob5eHYGA25sBALDZ29ioYy0tbm8GAEMQRmAsy+fXS5s3u70ZAACbJbW11GYAeSOMwEihUEiWzy/L51ckEnF7cwAAojYDKBxhBEY61tKSaHiMTQaA8tARCCRqc19fn9ubA8AAhBEY6aXNmxMN781Db7q9OQAAUZsBFI4wAuNEIpFEs7N8fq2uq3N7kwCg4lGbAUwFYQTGGRgYSGp4ls/PuvYA4DKn2jw4OOj2ZgEoc4QRGOfNQ2+mNTzGJgOAu+xz+eK37u5utzcLQJkjjMA4q+vq0hre3sZGtzcLACoatRnAVBBGYJTh4eG0Zmf5/FpSW+v2pgFAxaI2A5gqwgiM0t3d7djwGJsMAO7p6+vLWJtDoZDbmwegjBFGYJS9jY0ZGx5jkwHAHU5z+eK3jkDA7c0DUMYIIzDKktrajA2vob7e7c0DgIpEbQYwVYQRGGNwcDBjs4vfAAClRW0GMB2EERiLJgcA5YfaDKAQhBEYi4YHAOWH2gygEIQRGIuGBwDlh9oMoBCEERiLhgcA5YfaDKAQhBEYi4YHAOWH2gygEIQRGIuGBwDlh9qMijIW1pnWRm1dXjO5glxVrZ5rOKR3zn6hMbe3zwCEERiLhgcA5YfajIpx52Md3/SV2Ge+RsvXrNeG9c/rqYfnxULJ1/Xau4MEkhwIIzAWDQ8Ayg+1GZXhjsKBbZrrs/Tglrd0YfSu7d9u6cp7P9Rzc/yy5mxTR/iOa1tpAsIIjEXDA4DyQ21GZbim3leXyvItU+PpkSz/vlBbO8Ml3zqTEEaQwV2NXj6vYDCo90NXM59ijI7q8rn3s98n7TnP63LSEYSpoeEBqDzUZqA8jOjMnmWyfAu1qe0Th+9ZVDc/e1+/6x9Q6OotF7bPHIQRr7k9oIOP3iPrS6+oZ2Q88b/HQ0e00ufP+P/vbejRiCSNhXW6eZuWVPknJ2L5/LLuf1Z7e2zjHqN/0Qdt9Vpuu1/14/Vqbd6hBb4F2hC4bNuoWwqfOqRNtfNszzlfy3e0Kjg09S8oDQ+AMajNgMdEFTl7SCuqJuaLPPmtPTra2atzl0cVdXvTDEMY8ZzrCjZ9TZZvqXb3Xov9vzGFA1tV7fPL8n1N+4PXY///lj5t/YYs3yPa1XNV0ojOHlitat88Ldm4T62BX6rrVz/T8R/tmGhsVevVevGWpIgutm3TQp+lmlUNan775zrx8xY1rl0Ua0L2hndX107/QE9W+VVd+6KaWn+pU6d+qdYfvKglVX5VP/3POjvFI3E0PADmoDYD3nNL4VNvaN0DVspBghXauruZ1bTyRBjxnKhunN6rRb57tOzAgG5Lkq6qp+GR2JdknlYe+UjjkhS9qOPrFkwekRvp0a4v+WUtfV3BiD3Xj+rcgVWTjez6Ke3+siWr9vvqvTbZrKKj7+vQ0/clN7z40cA5W3T885u254zok9ZNmuu7T8+0fqxxFY6GB8Ac1GbAs8a+0Lmut9S8+9uqezj5TOOTu3+t8BjnSrIhjHhRvHGtOKLQuKQbvdo93697N23R5vl+VW8MKByVokOd2jbHr7lbOjUU/55ERzX42f8kJfno6Gf6TdMzsUb2mUZ6XtG9PktfaepX8on8+NG8yYZ394NmPebza+72Ll1TsujlNq3z+WXVterTKXxPaXgAjEJtBirAXY1e/oN6frondsZk6sG+UhBGPCl+tO0bar14S7fPHtQy3yLt6BpQ1/ZFsaNtY7rW9R3N9T2kbZ3/NTm+MXpdn/a+rebd27Vh1SOx4QPx2wJtCFzUlcCWlNP9k8aCTapJ/Nt4rDmmjHFOvd3fpOAUzmPS8ACYhdoMeEV06LR+sr9Jr7ed1ajzPRQJvq5HfbYDEHBEGPGkMQ11bo81s08UOrIm1vyux46OLdXu3gsTTbFqqzrCsW4T/W+deu3rsSY3T7WrXtCOV9/Q0UC3TiSOvmVreFHdOt1omyR5N9ZU/Zq7art+0NSk/U63N3t0eQpfUhoeALNQmwHPGOrU1iq/rIf26syNDKcQrwS0weeX9dVm/X8ftenljW8kDaHEBMKIR0XDAW2q8uve+h/pXzbWJFL5xAot9+ixvW/oHx+yVL2uTZeikhSNHaVzmrgY0QfNdbEm97lu9L6m+3x+3fdqr24k/VWHoQBnD+gR+4owdmNXFZrGUpI0PACmoTYDHhH9XB2bFsry1WjdwdMaSp0XEv2Lzv94veb67tGjTf26HmxSjW+LOq4wpT0VYcSr4hMg/2qBaqpsY4hv9Wv/oviqDwv0fNvF2DCAsdhRNb8W7DmdPN745jk12yc/3jitxocsWQ9sV8elyYmP0evvae/Se5KPzEX6tX+p0yTJMQ117dKDvpRx0QWg4QEwDrUZ8Iio7lxs04uxlbSqH16rhsYfqTXwUx09sEcNa2pV7fOrenmjTg2NxYZKEkacEEY862ZsCIDftjyklLx6yzdiy0FOGL/Yqmeq/LIe2KSDv3pPwWC/zrz7lm1ZyPla3fonRTWmoVONerLKL+v+p7Wj6Z/V/MO/14bEWvX2YQK3FO6s14M+v6prt+rgL04pGDytntbdqrvfkjXnBR294DzaMpd4wxscHJzergKAkqmc2gx4xbGWFu1tbHT4l6jGwr/VoS0rVJM272qhnmpo0ZkrE99lwkhmhBEPS1xMa852nRiKf/gnxwqnT6i6pfC7359oZPYLYG0/qr6eg1qZdKTslq6c/hftWF5j+9Id1vGmteljlqPXdbFrf9o63NW1f6uj/VNfgzv+PEtqa9XX1zfFZwGA0qqU2gyYLhKJqKG+PvFbY3h4OPOdx64qFAwqGAwq6DDMkTCSGWEE6RJfqAxjhseu6uOPrzo0qvi45EXa0fVF+uOio7p87n0Fg0G9H3J6fGFSV3451tIyzWcEgDJmWG0GTDY4OKiXNm+W5fPrpc2bsweRPBBGMiOMoHDxFSRS16C/84GO1t1nuxpwcdmHaS2prZXl86uhvl6RSKTofxsAyk6Z1WbAVAMDA4nfFW8eenNGflcQRjIjjKBw0bC6di6V5ZunJet3q7n1bR0/8gPtWLVQlm++nmz8na6V4GKj9oY3PDycdASDeSQAKk4Z1mbANB2BQOIz3N3dPWPPSxjJjDCCKYmOfqQTTS9qiW0Mc/XD67T73/rTl7crktSGF4lE9OahNxNjOwcGBkqyHQBQLsqxNgMmiEQi2tvYmPgNEQqFZvT5J8JI6iR354uUVhrCCIyVqeF1d3cn/q0jEHBhywCgchFGYBpGV7iLMAJjZWt4oVAoMd5zb2Mj80gAoEQIIzAJvxfcRxiBsXI1vJleCQMAkBthBKZgJEV5IIzAWPk0vGKPAQUAJCOMwAT2OaZcq8xdhBEYq5CGV6zVMQAAyQgjKGeRSCQxamJ1XR3zQ8oAYQTGKrTh9fX1Ja0bDgCYeYQRlCuuS1aeCCMw1lQa3uDgoFbX1SXmkVCIAGBmEUZQjvr6+hKfTQ5IlhfCCIw11YYXiUTUUF+fGCvKKVoAmDmEEZSbYy0tic8l80PKD2EExppuw4tPXqM4AcDMIYygXHDw0QyEERhrJhqe/bTtsZaWGdoyAKhchBGUA4Zlm4MwAmPNVMNjQhsAzBzCCNzGgjVmIYzAWDPZ8FjqDwBmBmEEbmIpf/MQRmCsYjQ8LoIEANNDGIEbuMixuQgjMFaxGl53d3fiuTsCgRl/fgDwMsIISm1wcDAxuuGlzZs1PDzs9iahAIQRGKuYDS8UCiXGm+5tbGQeCQDkiTCCUqJfm48wAmMVu+ENDw8nHWlhHgkA5EYYQakwksEbCCMwVikaHmNQAaAwhBEUWyQSSZrjOTAw4PYmYRoIIzBWKRseq3MAQH4IIygmVr/0Hsn/H3gAACAASURBVMIIjFXqhjcwMJC0bjnjUgEgHWEExcJ1wbyJMAJjudHwuKIrAGRHGEEx9PX1JT5bx1pa3N4czCDCCIzlVsOLRCJqqK9PjFXlFDEATCKMYKZxDTBvI4zAWG43vGMtLYltoDgCwAS3azO8wz4/hIN/3kUYgbHKoeH19fUlzSMBgEpXDrUZ5mNYdOUgjMBY5dLw7BPqKJgAKl251GaYiwN9lYUwAmOVU8NjqUEAmFBOtRnmYQh05SGMwFjl2PCYZAeg0pVjbUb54yLDlYswAmOVa8Nj+UEAlaxcazPK1+DgYGJ0wUubN2t4eNjtTUIJEUZgrHJueKFQKDHedW9jI/NIAFSMcq7NKD9cUBiEERir3Bve8PBw0pEe5pEAqATlXptRPrq7uxOfl45AwO3NgUsIIzCWCQ0vEokkzSMZGBhwe5MAoKhMqM1wF70RdoQRGMukhtcRCCS2t7u72+3NAYCiMak2o/QYNYBUhBEYy7SGx7hYAJXAtNqM0mE+JZwQRmAsExseK4YA8DoTazOKj5UmkQlhBMYyteGxljoALzO1NqN4uAYXsiGMwFimNzyuMgvAi0yvzZg5kUgkMRpgdV0d80PgiDACY3mh4fX19SXNIwEA03mhNmP6BgcHE/3tpc2bmR+CjAgjMJZXGt7g4KBW19VRsAF4gldqM6aOA20oBGEExvJSw7Ofyl5SW8upbADG8lJtRuEYgoxCEUZgLC82PCb5ATCdF2szcotEImqor+egGgpGGIGxvNrwWP4QgMm8WpuRGcvWYzoIIzCWlxuefeJfQ30980gAGMPLtRnpuKAvposwAmN5veENDw8nHWnilDcAE3i9NmNSRyCQeL+7u7vd3hwYijACY1VCw4tEIknzSAYGBtzeJADIqhJqc6Xj4r2YSYQRGKuSGl53d3fi9XYEAm5vDgBkVEm1uRJx1h4zjTACY1VawwuFQolxuXsbGxmXC6AsVVptriT0IRQDYQTGqsSGx4olAMpdJdbmSsAZehQLYQTGqtSGx1hdAOWsUmuzl3ENLBQTYQTGqvSGxyomAMpRpddmL4lEIomz8avr6pgfgqIgjMBYNLyJCyTa13cHALdRm72B612hVAgjMBYNb8Lg4KBW19Ul5pHQMAC4idpsvr6+vsT7yIEuFBthBMai4U2KRCJqqK9PjOnlVDoAt1CbzXaspSXxHjI/BKVAGIGxaHjp4pMMaSIA3EJtNhMHteAWwgiMRcNzZj+9fqylxe3NAVBhqM3mYbgv3EQYgbFoeJkx8RCAW6jNZmEhFLiNMAJj0fCyY0lGAG6gNpuDJeJRDggjMBYNLz9crApAKVGbyx8Xz0U5IYzAWDS8/HV3dyf2V0cg4PbmAPAwanN5GxwcTJw1f2nzZg0PD7u9SahwhBEYi4ZXmFAolBgXvLexkXkkAIqC2ly+6AMoR4QRGIuGV7jh4eGkI2LMIwEw06jN5Ykz5ChXhBEYi4Y3NYwVBlBM1ObyEolEkuYODgwMuL1JQBLCCKYu+rlO7NqkDevr1frB/0n75/FLnfr7jS9ow/odag5eS3/4UI/2bnxBG/4uoE/HY//zSkAbfAu0IXA555+n4U0Pq6gAHkVtRgyrKhbTTYXadmnD+szfpbjEd2r9Rr3cFtLdtMc73TZqa0OT/rU7pNGo0990uH3rFR1s69Wno3eL//JnEGEE0xDRB811snzztbr1T4om/dttXWp7UdU+vyyfpUV7TutG0r+Pa6TnFd3r8+u+V3v1f679Qe+83atP//s32j1/qXaf+kyf9gbUfuaLlOedRMObvoGBgaT15Rk/DHgBtRlcb6r4RhVseiLxeb+3oUcjjvcb01Dnds2N3a+mKagxh8dnvs3Xk6/9RkPR/B9Tvfz76gnfKt2umCbCCKYhqhun92qRz6+527uUfEzgC3VtXyRrziLVLrpH1qMHde62vXXFm+Ui7egKJ5pf2hdqY0DhDB2PhjczuPKuQcbCOtPaqK3Laya/J1W1eq7hkN45+0WswQHU5krX19eXeB+OtbS4vTkelRIMvvSKekbG0+8Wvajj6xYk7pceRjKdcbylof7D2vSAJcu3UvuDIzkeE9XY0Pv69x2PyfJZenDXu7qW6YhBmSGMYHpGerTrS35Zf9WoM7eiaf9/7vZW/XzPE7J8a3Q0dHPy36N/UmvdfFlVW9URnvhaRkc/1olXvz5xxK52l94+P5T1xxUNb+ZEIhE11NcnxhRzKr8M3flYxzd9Jfa5r9HyNeu1Yf3zeurhebFQ8nW99u4ggQQTqM0Vi2tLlcpkMFj++COyfI9oV8/VtHtFL7Xp+ap5Wvb4o7q3oDAiSdcVbPqaLN89eqz5vO7m8ZjoxVat9vllzX9NvTfMSCOEEUxP9JI6NtakNLT4UbkFer7tE/2l5xXdmzpc4FqXdszxy1pxRKFxSbqra6d/oCerlmrHj97Q1gfu05O7f63wWOYvEg1v5h1raUnsV5pYObmjcGCb5vosPbjlLV1IGg98S1fe+6Gem+OXNWebOsJ3XNtKlBFqc8Wxzw/hoFIpxIPBE9p3pEkrHYdqxYdFrlHzkd2qKTiM3NC5AysLCiMT87v8sqpe1okhM+aOEEYwTTcVOrJGlm+htnaGY/9vVOcOrEo0wehQp7bNsZ/Wj+pG72u6L/HlkqRbunL6sHZ+72e6NHZTlwKvatvB3+kKDa/k+vr6kuaRoBxcU++rS2X5lqnxtNOo5Pi/27+HqGzU5krCcFs3TIaR/b//vY6umJc+VCs+RGvFEX3w+6YCw8hdjX7Srh1fzneY1sRjrp/+Jz3q88v6arM+MCOLEEYwfXc/aNZjscmONyRp/KOJL2V8LHL8yzjnO+q6dleTY5KfUOPpP0/579Lwisc+8ZHGVg5GdGbPMlm+hdrU9onDEJmobn72vn7XP6DQVXMmLaK4qM2VgQNIbrGFkeDVWPhPHqoVH6K18shHuh3MFEYs1Tz+bMrKWOv13OPxuYELVbf/vdj8j/hj5uuppl8qGAxO3np/pbeP7NZzD1iyfI/o252XMy4yUW4II5i+G73aPX8yhU+MV7Sv0hI/QrdUu3uvTY5JzjTZK0+5V6Dgxs3MW7qoImcPaUWVX5avRk9+a4+Odvbq3OVRY5oNXOBybe4IBLgV+fb/vPxyYn/vbWx0fXu8fEsfumwPI6Ox4GEfqhX7flW9qOOXbmssYxjJ1AsW6qkdP9Tb/WHbAah8VtNapHX7/3fWoZTlhjCCGRBbnaVqqzrCN2NL2NmPDkR1++xBLYuf+o9PoNzSGVuqbmrc/sHIjVuxbs5uKXzqDa17wEq+//0rtHV3M6tpwQG1mRu3mbo11NenfNKTw0jiTGM8zMfORFava9OlqLKEkeQhV9HRP6mr6Rta6LO0cGOLzifNEYw/Zp6WNxxOC0zvdL1n5NlxwghmwJjCga2q9i3V7t4L6ml4RNac7ToxZPtpFD9CV3dMH/Xv11d8C/R828VpHdWNFwgUn70gs0yky8a+0Lmut9S8+9uqi6+k5fPL8s3PObEYlcbd2hwKhbgV4Xbq1Ck9t+b/Tuzn//zP/3R9myrhlr4gQEoYSUxWnwj846EjWmn7PuUbRia+up/rxI6lsnyWFm4J6FKirucz6d08hBHMiIkv3T167PU3tXeRJauuVZ8mdbOrE43wS9/W/r2rlbac5BQQRkon/sMiPi55b2Mj80jKwl2NXv6Den66J3bG5D490/qxpj7ABl5DbfaW1AvVsp/dlBpGZBuq1an/PLImaYXDgsKIpOjQr/R3X7Zk+Wr0fGtId/J4jKkII5gZt/q1f5Gl6vsXaIFvYrJW8g+i+BG6+aq53+lCW4Wj4ZVOfD8PDw8nlo58afNmlo4skejQaf1kf5NebzurUed7KBJ8fWIFlcSSrICozR7S3d2d2LcdgYAksZ9dlR5GJodqParlj85LGvJYaBiRxjTUtUsP+vyyHtiujks383hMuruhNr288Q31XivfpbUII5gh8aVF/bJ8q3TwbPpPpsSFeHy21V2mgYbnjkgkknRRrYGBAbc3yfuGOrW1yi/rob06k+kiVvG15WOTlU1oQCgFarPpqLnlyiGMJIZq+WX5HtK2zv9KDHksPIxIiobVtTM2XGvrLxSOFh5GJv7uFnVcKd9ZhYQRzJC7utb1Hc31+TNf9TO+rGSGq5QWiobnro5AIPEedHd3u7053hb9XB2bFsry1WjdwdMaSp0XEv2Lzv94veb67tGjTf2KyIwGhFKgNpuMs9HlzCmMTA7VSp2fNaUwoqjGLgW07QFLlm+pdnae12nCCFA+aHilk2k/p45fZh5JsUR152KbXoytpFX98Fo1NP5IrYGf6uiBPWpYU6tqn1/Vyxt1Ktb8TGhA8CZq88zIZ54e+xm5mNALCCMwFg2vdLLt58HBwaQjd8PDwyXcskoS1Vj4tzq0ZYVq0padXKinGlp05srkko4mNCB4E7V5+vr6+vJawZD9jFxM6AWEERiLhlc6ufZzJBLR3sbGxJjmUChUoi2rUGNXFUpcefe8Lo+mzwsxoQHBm6jN02OfH5J+ob1k7GfkYkIvIIzAWDS80sl3Px9raUm8L7maKIrLhAYEb6I2T00kEkmcZV5dV5fX/BD2M3IxoRcQRmAsGl7pFLKf+/r6kuaRwB0mNCB4E7W5cIODg4m6+dLmzXnPv2M/IxcTegFhBMai4ZVOoft5cHBQq+vqCm6smDkmNCB4E7W5MNM5gMN+Ri7xVbyS5xmW10UTCSMwFg2vdKayn+1DDpbU1rIkZYmZ0IDgTdTm/E13aCv7GV5AGIGxaHhmKGQyJgDzUZtzi0Qiaqiv52ANIMIIDEbDM0e+y1QCMB+1OTuWQweSEUZgLBpe6czEfrZP0Gyor2ceCeBR1ObMZvpCsexneAFhBMai4ZXOTO3n4eHhpCOCDE0AvIfa7KwjEEjsm+7u7hl5TvYzvIAwAmPR8EpnJvdzJBJJmkcyMDAwY88NwH3U5mTFvCgs+xleQBiBsWh4pVOM/dzd3Z14DzsCgRl/fgDuoDZPKvbZYPYzvIAwAmPR8EqnWPs5FAolxk/vbWxkHgngAdTmCaWob+xneAFhBMai4ZVOMfczK8sA3kJtLt2Z30rfz/AGwgiMRcMrnWLv52KOqQZQWpVem0t5baVK3s/wDsIIjFXpDc+LirHaDIDSqtTaHIlEEmd5V9fVsVogkCfCCIxVqQ3P6/r6+pLW4QdglkqszVxHCZg6wgiMVYkNzy2l3s+Dg4NaXVeXmEdCYwfMUWm1ua+vL/GaS30ApZL2M7yLMAJjVVrDc5Mb+zkSiaihvj4x9pohD4AZKqk2H2tpSbzeYs8PcVIp+xneRhiBsSqp4bnNzf0cnwzqVrMHUJhKqM3lcrDE6/sZlYEwAmNVQsMrF27vZ/swiGMtLa5uC4DsvF6by2kYqZf3MyoHYQTG8nrDKyflsJ+ZIAqYwcu1udwW2PDqfkZlIYzAWF5ueOWmXPYzS2cC5c+rtbkclx734n5G5SGMwFhebXjlqNz2cykvKgagMF6rzeV8UVYv7WdULsIIjOW1hofCdHd3Jz4DHYGA25sDIMZLtXlwcDBxNvalzZs1PDzs9iYBnkMYgbG81PAwNaFQKDF+e29jI/NIgDLgldpMfQFKgzACY3ml4WF6hoeHk45cMo8EcJcXajNnXoHSIYzAWF5oeKYo9/1czmO6gUpjcm2ORCJJc9IGBgbc3qSsTN3PgB1hBMYyueGZxpT9XI6r3QCVxtTabOJqfSbuZyAVYQTGMrXhmcik/TwwMJB0HQDGeQOlZWJtNvU6RqbtZ8AJYQTGMrHhmcq0/VxOV0gGKo1ptbmvry+xzcdaWtzenIKYtJ+BTAgjMJZpDc9kJu7nSCSihvr6xNhvE4ZcAF5gUm02/ZpFpuxnIBvCCIxlUsMzncn7+VhLS+KzYuKPDcA0JtRm+/wQkw9WlPt+BvJBGIGxTGh4KA99fX1J80gAFE+512aGcQLlhTACY5V7w0N5sU9Q5QcIUDzlXJs5MAGUH8IIjFXODQ/lycSlOwHTlGttZsgmUJ4IIzBWuTY8L/LafjZ90ipQzsqtNnv5oqjltJ+BqSKMwFjl1vC8zIv72eTlPIFyVk61eXBwMHE29KXNmzU8POz2Js2octnPwHQQRmCscmp4XufV/RwKhRLjx/c2NjKPBJgB5VKbK+ECqOWwn4HpIozAWOXS8CqBl/fz8PBw0pFT5pEA01MOtbm7uzuxHR2BgKvbUkxu72dgJhBGYKxyaHiVwuv7ORKJJM0jGRgYcHuTAGO5WZsr7bvs9dqMykAYgbEII6VTKfu5IxBIfK66u7vd3hzASG7V5ko8y1kptRneRhiBsQgjKIZKGGcOFJMbtZn5X4C5CCMwFmEExeL1FXiAYip1bWZlPMBshBEYizCCYvLytQmAYiplbeaaQYD5CCMwFmGkdCp5P3PVZqAwpajNkUgkcfZydV1dRcwPcVLJtRneQRiBsQgjpVPp+7mvry9pHgmAzIpdmwcHBxPfx5c2b67o+SGVXpvhDYQRGIswUjrs54kfQKvr6vgBBORQzNrMgYFk1GZ4AWEExiKMlA77eYJ9aMiS2tqKHRoCZFOs2syQyXTUZngBYQTGIoyUDvs5GZNmgcxmujZHIhE11NdzEMABtRleQBiBsQgjpcN+TsdyooCzmazNLLOdHbUZXkAYgbEII3CbfSJtQ30980gAzVxt5gKkQGUgjMBYhBGUg+Hh4aQjtwwhQaWbidrcEQgknqe7u3uGtgxAOSKMwFiEEZSLSCSSNI9kYGDA7U0CXDOd2szFRoHKQxiBsQgjpcN+zk93d3fic9kRCLi9OYArplqbOctYOGozvIAwAmMRRkqH/Zy/UCiUGOe+t7GRce6oOFOpzXxvpobaDC8gjMBYhJHSYT8XhhWAUMkKrc2cUZw6ajO8gDACYxFGSof9XDjGvqNSFVKbuWbP9FCb4QWEERiLMFI67OepY1UgVJp8anMkEkmcPVxdV8f8kCmiNsMLCCMwFmGkdNjP09PX15d0vQTAy3LVZq7PM3OozfACwgiMRRiBSQYHB7W6ri4xjyT/H2A3FWrbpQ3rX9CG9TvUHLyW8Z7RoR7t3fiCNqzfqJfbQrqb9nin20ZtbWjSv3aHNBp1+psOt2+9ooNtvfp09O609gm8KVtt7uvrS/w7wRyARBiBwQgjME0kElFDfX1ijHx+Q1NGFWx6IvF5v7ehRyOO9xvTUOd2zY3dr6YpqDGHx2e+zdeTr/1GQ9H8H1O9/PvqCd+asf0Db8hUm4+1tCT+jfkhAOIIIzAWYQSmik/aze9HWUow+NIr6hkZT79b9KKOr1uQuF96GFmgDYHLDs9/S0P9h7XpAUuWb6X2B0dyPCaqsaH39e87HpPls/Tgrnd1LerwtKhYqbV5aiEcQKUgjMBYhJHSYT/PPPtwlWMtLVnuORkMlj/+iCzfI9rVczXtXtFLbXq+ap6WPf6o7i0ojEjSdQWbvibLd48eaz6vu3k8JnqxVat9flnzX1PvDdIIJtlr89SHJyIf1GZ4AWEExiKMlA77uTjym8gbDwZPaN+RJq10HKp1W5faXlS1b42aj+xWTcFh5IbOHVhZUBjRlYA2+Pyyql7WiSHmjmCS/awfCzcUF7UZXkAYgbEII6XDfi6e3EucToaR/b//vY6umJc+VCs+RGvFEX3w+6YCw8hdjX7Srh1fzneY1sRjrp/+Jz3q88v6arM+IIvAJnVuEUtaFw+1GV5AGIGxCCOlw34uPvvF35Kv2G4LI8GrCh1ZkzZUKz5Ea+WRj3Q7mCmMWKp5/NmUlbHW67nHa2LfpYWq2/9ebP5H/DHz9VTTLxUMBidvvb/S20d267kHLFm+R/TtzstikBbs4rWZi30WH7UZXkAYgbEII6XDfi6N7u5udQQCKf/XHkZGY8HDPlTr5kRAqXpRxy/d1ljGMJJpVayFemrHD/V2fzh2/3we45flW6R1+/+3wmNEESSLf0aSQzWKgdoMLyCMwFiEkdJhP7spOYwkhmTFh2qNf6SjK+apel2bLkWVJYwkD7mKjv5JXU3f0EKfpYUbW3Q+6Zoh8cfM0/KGw+oIBJJu73S9p9BVlvSFM2pz6bCf4QWEERiLhofKkBJGEpPVJ4ZqjYeOaKVvgZ5vu6io8g8jkqSxz3Vix1JZPksLtwR0KXGWI59J74AzajOAQhBGYCwaHipDahiRbahWp/7zyBpZc7apI3xHUoFhRFJ06Ff6uy9bsnw1er41pDt5PMbJ3VCbXt74hnqvMZu90lGbARSCMAJj0fBQGdLDyORQrUe1/NF5mrulM3bl9MLDiDSmoa5detDnl/XAdnVcupnHYxyeJdikGt8WdVwZy31neBq1GUAhCCMwFg2vdNjPbnIII4mhWn5Zvoe0rfO/EitaFR5GJEXD6toZG6619RcKRwkjmDpqc+mwn+EFhBEYi4ZXOuxnNzmFkcmhWtac7ToxNBkAphRGFNXYpYC2PWDJ8i3Vzs7zOk0YwRRRm0uH/QwvIIzAWDS80mE/IxfCCOKozaXDfoYXEEZgLBpe6bCfkQthBHHU5tJhP8MLCCMwFg2vdNjPyIUwgjhqc+mwn+EFhBEYi4ZXOuxn5EIYQRy1uXTYz/ACwgiMRcMrHfYzcolPnLeSblw0sRJRm0uH/QwvIIzAWDQ8ACg/1GYAhSCMwFg0PHjZm4fe1JuH3lRfX58ikYjbmwPkjdoML6M2zzzCCIxFwysd9nPpNdTXJw15emnzZh1raVEoFHJ704CsqM2lw34uvUy1eWBgwO1NMxZhBMai4ZUO+7n0Uhte6q2hvl7d3d0aHBx0e1OBJNTm0mE/lx61eeYRRmCsbMWAG7dKui2prdXexkb19fVpeHjY7a8mKpzb3wdu3MrlRm3OD2EExnK7yHDjVm63eONjKBfc5Pb3gBu3crtRm7MjjABAGco1FCB+a6ivV0cgQJMDgBLItza/tHkztTlPhBEAKEOZGp59siQruQBAaWWqzavr6qjNU0QYAYAyFG94S2prE8tIMuYYANxFbZ55hBG4KzqiUPdh7V6/3Hb15ho9+a1Gtf7mE41G3d5AwB0DAwOsxgL3UJsBR9TmmUcYgWuio39U65Zlqvb5ZfnmqXbV89qw/gW9sOqRxP9bsuXfdH70rtubCgAVg9oMoJQII3DH2EV1bHlEls/SwvUH1XPxuiYPtN3V6MV3dXD9V2T5LD24o1PhMQ7DAUDRUZsBlBhhBC64q2s9r+pBn19z1/2bPrnj3Myi13+v1782X5bvUX2v5wvR8gCgmKjNAEqPMILSi17U8XULZPke0a6eq1nuOKahzu2a6/Nr7pZODdHximRIvU1btWH9Lh0P3czvIVcC2uBboA2By8XdNAClQ20uM9RmVAbCCEpvpEe7vuSXNec76rqWfcxx9HKb1vn8sua/pt4bdLziuKyO9Qtk+Z7Q/uBo1ntGr/1B77zdq0//+zfaPX+pdp/6TJ/2BtR+hqOjgPGozWWG2ozKQBhB6V0JaIPPL+v+JgXHctx3LKj99/tl+bao40quO2Nq8m144xrpeUX3OqyvXr0xoDAdDzAbtbnMUJtRGQgjKD0aXpnJ/+ibJEVHP9aJV78+sapO7S69fX5IvDOAB1Cbywy1GZWBMILSG+rU1qo8T+8XMGwAU1VIw7ura6d/oCerlmrHj97Q1gfu05O7f82KOoAXUJvLDLUZlYEwgtIb/0hHV8yT5Vulg2ezFdiobpzeq0U+v6wVRxQaL9kWVphCGt4tXTl9WDu/9zNdGrupS4FXte3g73SFhgeYj9pcZqjNqAyEEbjgli62rle1z9KDO3+VeSWWaFhdO5fK8i3Q820XmYRXNIUNBTDC3ZCO/+1GbfjbNoUKPWgbf+zGN9TLEV9UFGpzefFgbZamXp+pzZ5FGIErJtep/4o2HT2n0dRuNvaFgj/erIU+v6q/9oaC1yk8xePBhhcfz57P2PdMj2UsPCoQtbmceLA2S1Ovz9RmzyKMwCVR3bz4c31v+XxZPks1y7eo8chP1REI6PiRPdq6vGZiJZDHGxQIeagIlyUPNjzCCDBF1Oby4cHaLBFGkIYwAhdFNTb0B7295xuqrUpZkrDqUW1qekdnh265vZEVwIMNL2ezu6vRy+cVDAb1fuhq8oozqQ1v7KpCwfd17vJojuEot3Q1NKBg8Lwuj87U0eKJ7cz9t4GZRG0uDx6szVKO+kxtrkSEEZSH6Kgun3tfwWBQwXOX04cGoIg82PAyNbuxsE43b9OS1B9Y9z+rvT2DE40v0fBWadcPtmt54r6Wap7+J/WEU36ERa/rYtcPtal2nu0552nJxkM6Zb9vxgY8piuBLbLiV02O3++vtqixcY1qYs/32IE/iJ9/KDlqs4s8WJsl51pIba5ohBGg4nmw4Tk2lxGdPbBa1b55WrJxn1oDv1TXr36m4z/aMdHUqtar9eItW8OLHQX+wU/V03tSgR9unWiUtd+3TZ68pXBnvR70+VVd+6Kajr2jE50Bte55fmJM/fIf6HT8voU2PJ9flq9Gy9es1wurVul7PVdLtvsAlAMP1mbJoRZSmysdYQSoePGGN0+1q57XhvUvpN9MW73EqbnEr4uw9HUFI/bDu6M6d2CVQ8Op0fOtId1J3O+GQkeeV7VvnlYe+UjjknT9lHZ/2ZI1Z4uOf37T9pwRfdK6SXN99+jRpn5FMm3TxMZmaHgLtK41xEXLgIrlwdospddCanPFI4wAFS/e8PxZboZNGMzUXKKjGvzsf5T8vz7Tb5qeSW84VVvVEU5+zdHLbVrn88uqa9Wn0ahu9L6m+3x+3fdqr26kbEJ0qFPb5vhlfbVZH9zNsk0ZG94aHQ3dFIBK5cHaLDnXQmpzRSOMAPCejGHkuj7tfVvNu7drw6pHVJ3U1FMajtPkyqR/izeq+7Su7bP0SYzxNLlhSwAAIABJREFU+37pFfWMjE+h4Rn4IwMAcnEMI9TmSkYYAeA9js3uv3Xqta/Hmtw81a56QTtefUNHA9064XT0Le+GF3tcpm2Y8x11Xbtrm/zYqDO37O3xlj5t/QYND0BlSK2x1OaKRxgB4D1pTSuq22cPapnPr+qn/1lnk5Z3jOiD5rr0hhM/amYzpaEA/9cBnbMPBUhrZKMKNj1BwwNQGZLqM7UZhBEAXpQWRuJHyvxasOd08jKMN8+p+en7HBrOUv1dV9h2ij8+SfI+PdP6scYlRa+9q+992ZL15V3qGrI3p/gkSUuL9pyeaIbRz3R87X2yfM+o+QNbe7z5Bx1cPo+GB6AyOJ7FoDZXMsIIAO9xOJ0/frFVz1T5ZT2wSQd/9Z6CwX6defctNa5dFBuXPF+rW/+kqH35xvuf0e7WX+tM/yn94sDE8pHVX3tDwevxo3cRXWzbNrFU5OM71Nx5SkHbfa0v1+tEYj37W7rYul7VPks1qxrU3BZQR9v/q91r4n+fhgegAqTUZ2ozCCMAvMdxbPEthd/9vp5MuqjWfC3fflR9PQe10ufX3C2dGoo/dv4m7dn7DS3MdrEsSYr+RR+8/fd66n4r5cJaP1TXxetJkyejo+f19q662MWy/LJ8lhaufUM9gddUQ8MDUAnS6jO1udIRRgBUlrGrCgWDCgbP6/JorvX5oxq7+rHeD76vc5dH01dlSbpr/ErVAwpdzXY93vhzBvV+6Cpr1QOARG2uYIQRAAAAAK4gjAAAAABwBWEEAAAAgCsIIwAAAABcQRgBAAAA4ArCCAAAAABXEEYAAAAAuIIwAgAAAMAVhBEAAAAAriCMAAAAAHAFYQQAAACAKwgjAAAAAFxBGAEAAADgCsIIAAAAAFcQRgAAAAC4gjACAAAAwBWEEQAAAACuIIwAAAAAcAVhBAAAAIArCCMAAAAAXEEYAQAAAOAKwggAAAAAVxBGAAAAALiCMAIAAADAFYQRAAAAAK4gjAAAAABwBWEEAAAAgCsIIwAAAABcQRgBAAAA4ArCCAAAAABXEEYAAAAAuIIwAgAAAMAVhBEAAAAAriCMAAAAAHAFYQQAAACAKwgjAAAAAFxBGAEAAADgCsIIAAAAAFcQRgAAAAC4gjACAAAAwBWEEQAAAACuIIwAAAAAcAVhBAAAAIArCCMAAAAAXEEYAQAAAOAKwggAAAAAVxBGAGQVHf1EvznWqK3La2T5/BO3qkdUt/0NdZz9QmNubyAAVIwh9TZt1Yb1LzjcNmprQ5P+9cRZDY1F3d5QIG+EEQAZRDUWfld7n144GUJSb1XLtK31jxql7wFACVxWx/oFmWuyzy/LZ2nhxhadH73r9sYCeSGMAHB285yan74v0eCqH16rhsZDav5Rk15d/6iqE4FktQ6eHXF7awGgAtjDyDzVrnp+8szImidUYw8kWwK6xBkSGIAwAsDBHYUD2zQ31tjmrv2X5KNs0T/r7ME1iUAyd0unhuh5AFBk9jDyhPYHR23/dlejF3+mXbX3xP59mXb3Dru2pUC+CCMA0o1/pKMr5sUa2krtD6af+YgO9Wjvjn9U87/9Ur+7cJW5IwBQdNnCiJR6IOnehh5x3hrljjACIN21Lu2YEzvdP/819d7gtAcAuC9XGJHGQ0e0Mj5c66vN+oCpIyhzhBEAaaKX27Qu3szub1KQ0x4AUAZyhxFdCWgD9RsGIYwASHP3g2Y9RjMDgDJDGIH3EEYApLM3s79q1JlbDNMCAPflDiOc2YZpCCMA0t3q1/5FVqzhrdHR0M20u0SHOrVtTo2e/NZran77D7pKXgGAIssVRqK60fua7osvyf6tTg25sp1A/ggjAByMKNi0Mtbw7tGS3b/VNXvYYGlfAHBBjjAy9rlO7Fga+/eFejHwuSjNKHeEEQCOouFf6NsPWImm9lTDj3Wi9/cKnv612vY8r4Vc9BAASsweRh7Shqa31BEIqCMQUKD1Te22X5B26esKRogiKH+EEQAZjGnoVKOerIpf0dfp9hVtOnpOo/Q7ACgBexjJcnvgJf3r+b9wVgRGIIwAyOKuRi+c0P6NtqNt8bHID39Dje98RBABgJLJEUbuX6Gte/5dZ67ccntDgbwRRgDkIaqxqx/r/WBQwWBQ74e44joAAJg+wggAAAAAVxBGAAAAALiCMAIAAADAFYQRAAAAAK4gjAAAAABwBWEEAAAAgCsIIwAAAABcQRgBAAAA4ArCCAAAAABXEEYAAAAAuIIwAgAAAMAVhBEAAAAAriCMAAAAAHAFYQQAAACAKwgjAAAAAFxBGAEAAADgCsIIAAAAAFcQRgAAAAC4gjACAAAAwBWEEQAAAACuIIwAmDAW1pnWRm1dXiPL55+4VdXquYZDeufsFxpze/sAAIDnEEZgrEgk4vYmeMedj3V801diIaRGy9es14b1z+uph+fFQsnX9dq7gwQSADlRmwEUgjACY3V3d2twcNDtzfCAOwoHtmmuz9KDW97ShdG7tn+7pSvv/VDPzfHLmrNNHeE7rm0lADP09fUpFAq5vRkADEEYgbH2Njaqu7vb7c3wgGvqfXWpLN8yNZ4eyfLvC7W1M1zyrQNgljcPvamOQMDtzQBgCMIIjLWktlYN9fVub4YHjOjMnmWyfAu1qe0Th6FYUd387H39rn9Aoau3XNg+ACahNgMoBGEERhocHExMssZ0RRU5e0grqibmizz5rT062tmrc5dHFXV70wAYxV6bmTsCIB+EERipIxBINDzGJs+EWwqfekPrHrAmV9Ly+WXdv0JbdzezmhaAvHR3dyfqx8DAgNubA8AAhBEYqaG+PtHwjrW0uL053jH2hc51vaXm3d9WXXwlLZ9flm++ntz9a4XHOFcCILO9jY3UZgAFIYzASPaj9y9t3uz25njUXY1e/oN6frondsbkPj3T+rHG3d4sAGWL2gygUIQRGGdgYCB5KBFjk6clOnRaP9nfpNfbzmrU+R6KBF/Xoz6/rBVHFCKNAHAQCoXSavPw8LDbmwWgzBFGYJxjLS1pDa+vr8/tzTLXUKe2VvllPbRXZ25kGIZ1JaANPr+srzbrg7vS3VCbXt74hnqv3XW+P4CKY5/LR20GkC/CCIzz0ubNaQ3vzUNvur1Z5op+ro5NC2X5arTu4GkNpc4Lif5F53+8XnN99+jRpn5FJI0Fm1Tj26KOK0xrBzCB2gxgKggjMEokEklrdpbPr9V1dW5vmsGiunOxTS/GVtKqfnitGhp/pNbAT3X0wB41rKlVtc+v6uWNOjU0ET4IIwDsMtXmJbW1bm8agDJHGIFR+vr6HBseY5OnK6qx8G91aMsK1aTt24V6qqFFZ65MXvCQMALAzmkuX/w2ODjo9uYBKGOEERjlzUNvZmx43d3dbm+eN4xdVSgYVDAYVDB4XpdH0+eFEEYA2FGbAUwVYQRGWV1Xl7Hh7W1sdHvzKgZhBIAdtRnAVBFGYIzBwcGMzY6xyaVFGAEQNzw8nLU2Wz6/25sIoIwRRmCMSCSiUCiUuMWbnP3/oTQIIwDiqM0ApoMwAmNxxM09E2Ek9ejnAm0IXHZ70wC4jNoMoBCEERiLhgcA5YfaDKAQhBEYi4YHAOWH2gygEIQRGIuGBwDlh9oMoBCEERiLhlc6HYGA+vr63N4MAAagNgMoBGEExqLhlY7l86uhvt7tzQBgAGozKspYWGdaG7V1ec3kgi5VtXqu4ZDeOfuFWHMyN8IIjEXDKx3CCIB8UZtRMe58rOObvhL7zNdo+Zr12rD+eT318LxYKPm6Xnt3kECSA2EExqLhlQ5hBEC+qM2oDHcUDmzTXJ+lB7e8pQujd23/dktX3vuhnpvjlzVnmzrCd1zbShMQRpDBXY1ePq9gMKj3Q1czp/roqC6fez/7fdKe87wuJ31pp4aGVzqEEaBcUJuB8nBNva8uleVbpsbTI1n+faG2doZLvnUmIYx4ze0BHXz0HllfekU9I+OJ/z0eOqKVPn/G/39vQ49GJGksrNPN27SkKuWCdvc/q709tlON0b/og7Z6Lbfdr/rxerU279CCtIvf3VL41CFtqp1ne875Wr6jVcGhW1N+qTS80iGMANNEbQY8ZkRn9iyT5VuoTW2fOIT+qG5+9r5+1z+g0NWpf58qAWHEc64r2PQ1Wb6l2t17Lfb/xhQObFW1zy/L9zXtD16P/f9b+rT1G7J8j2hXz1VJIzp7YLWqffO0ZOM+tQZ+qa5f/UzHf7RjorFVrVfrxVuSIrrYtk0LfZZqVjWo+e2f68TPW9S4dpHDlbjv6trpH+jJKr+qa19UU+svderUL9X6gxe1pMqv6qf/WWeneCSOhlc6hBFguqjNgLdEFTl7SCuqJuaLPPmtPTra2atzl0cVdXvTDEMY8Zyobpzeq0W+e7TswIBuS5KuqqfhkViDmKeVRz7SuCRFL+r4ugWTR+RGerTrS35ZS19XMGL/Ko3q3IFVk43s+int/rIlq/b76r022ayio+/r0NP3JTe8+NHAOVt0/PObtueM6JPWTZrru0/PtH6scRWOhlc6hBFguqjNgPfcUvjUG1r3gJVyxnKFtu5uZjWtPBFGvCjeuFYcUWhc0o1e7Z7v172btmjzfL+qNwYUjkrRoU5tm+PX3C2dGor3t+ioBj/7n6QvT3T0M/2m6ZlYI/tMIz2v6F6fpa809Sv5xGP8aN5kw7v7QbMe8/k1d3uXrilZ9HKb1vn8supa9ekUDiPQ8EqHMALMAGoz4E1jX+hc11tq3v1t1T2cPOzxyd2/VniMcyXZEEY8KX607RtqvXhLt88e1DLfIu3oGlDX9kWxo21jutb1Hc31PaRtnf/1/7d3x79R33eex/+U74gvsQgiBeKgVFwXC5Q2CUojilKLLNpABIYQLWRbQVoZkgpzUjG7MREJYeO9LNyBe1tDNU63ZhW7F+cON3F6TOJwB0oniUnAZxpzcAUvgxObed0P9tgz4xnPd2a+8/1+P9/v8yGNVOEZM/3GvN9+fefz+bxnP1JM39bl/jNqb9mtpvWrppcPZB7L1RQf0rX4zryP+2dNJNpUP/O1e9PNMW+Nc/5jWZsSFdw6oOF5hzACuIHaDITfpMaufqy+Xx+c/sSk8k8Zo4IwEkoTGu3ePd3MvlDy+Mbp5nd7+u7YGrX0/2mqKS7Ypa6R6W6T/rPOHfjRdJNbrIb1W7Vn/xGdiPfq7Mzdt/kaXlrjA61ZmyQnp5tqTIvW79YrbW06XOhxrE9XK/hXSsPzDmEEcAO1GQiL9OiA/svhNr3a+YnGCj9DqcSresTK+jQUBRFGQio9Etf2BTE90Pym/nlb/cw/hKkTWu7To4eO6D9+11bdpk5dSUtSevouXaGNiyldam+cbnJf6U7/AS21Ylq6v193cv7WAksBPnldq7JPhMk2cV3JKo6SpOF5hzACuIPaDITEaLd2LYjJ/u4hfXinyDKsa3E1WTHZ32/X//60Uz/ddiRnPxemEEbCKrMB8jvLVb8gaw3x+HkdXpnZaLVcmzuHppcBTEzfVYtp+cGB3PXGdy+oPXvz450BtX7Xlv3gbnVdmd34mL79gQ6tuS/3zlzqvA6vKbRJckKjPfv0sJW3LroMNDzvEEYAl1CbgXBIf6Wu7StkW/XadHRAo/n7QtJ/0cV/2qJF1n16pO28bifaVG/tVNc1trTnI4yE1t3pJQCxrOMhpdzTW56dPg5yyr2hDj29ICb7we06+s4HSiTO68N3/yXrWMgl2tDxudKa0Oi5Vj2xICZ72Y+1p+0f1f7aL9Q0c1Z99jKBcY10N+thK6a6hl06+rtzSiQG1NfRosZltuyFW3XiT4U/4Cwl0/BSqVR1lwolEUYAt0SnNt+4caO6SwUExODgoE6dPJn3p2l9O9Sp56ZP0qr7q2e0t/VNdcR/rROvH9TejQ2qs2KqW9uqc6MT0/u2CCOFEEZCbGaY1sLdOjua+eGfXSs8dw3juEbe/eVUI8segLX7hN7vO6p1OXfKxnVt4J+1Z2399PNW6Km9b+l02zNz1yynb2uo5/Cco+/qGn6iE+crP/Yu8302NDZqeHi4wu8CJwgjgHuiUptXNzRQm2G83t7eeQJ2WhMj/0Nv7HxS9XMOgVihp/ae1IfXpm4sEEaKI4xgronrSiYSShRbMzxxXZ99dr1Ao8qsS16pPT1fz31dekxXL3ykRCKhj5KFXl+e7H/0qxsa9P7771f5HVEMYQQIAANrs23FqM0wUiqV0rE3js38jjE4ODj/C2b+fRb+N0oYKY4wgvJlNm3ln0H/7SWdaFyaNQ24trIbXeZ/z/0YFW4gjAAGCGBtXt3QINuK6dgbx2r+9wJuuXHjhp7fsUO2FdPzO3a48gkfYaQ4wgjKlx5Rz4trZFuLtXpLi9o7zuj08Ve0Z/0K2dYSPdH6B930YL5P9ibJZDI50/QOtbayj8RlhBHAAAGszcPDw9rQ2DjzSx21GUFXq98nCCPFEUZQkfTYpzrb9pxWZ61hrvurTWr51fm5J0rUSP6JLbW4k4EphBHADEGszalUaqY2s48EQVbLlRaEkeIIIzBWoeMjy17jCUcIIwCcKna0b3ZtZh8JgqbWP59TYSR/k3uhIaXRQxiBseY7y74rHp/5em9vr8fvLHwIIwCcmq82s8cPQZP9yR2nc/qDMAJjlRqsNTg4mLN5krXKlSOMAHCqVG0eHh6eqc17m5upzfBN9s8ie5r8QxiBsZxM+R0eHs7ZR8IQrsoQRgA45aQ2s8cPfuO0t+AgjMBYThqeNPUR7KHWVjZPVoEwAsCpcmoze/zgh1MnTzIHJ0AIIzCW04aXQfGpHGEEgFPl1ubsCddd8XgN3xmiLpVKaW9zMzcnA4YwAmOV2/AkPpatFGEEgFOV1Obs2Q7s8UMt5C/b5mcsOAgjMFYlDU9iCFclCCMAnKqmNrPHD7XAgTbBRhiBsSpteBJDuMpFGAHgVLW1OXuPXzKZdPndIWo46j/4CCMwVjUNL4MhXM4QRgA45UZt5hdIVItgaw7CCIzlRsOTGMLlBGEEgFNu1mb2+KESHB1tFsIIjOVWw5MYwlUKYQSAU27XZvb4oRzZhyEcam3lZ8YAhBEYy82GJ3EnZT6EEQBOuV2bOY4VTnFMtJkIIzCW2w1PYghXMYQRAE7VojZLs3v8mBWFQtgDai7CCIxVq4YncXclH2EEgFO1rM3s8UO+7NMxNzQ28smZgQgjMFYtG57EEK5shBEATtW6NrPHDxn8LIQDYQTGqnXDkxjClUEYAeCUF7WZu+HgU7LwIIzAWF40PImzyiXCCADnvKrNktjjF1GnTp5k/1CIEEZgLC8bnhTtIVyEEQBOeV2b2eMXHZysFk6EERjL64YnRXcIF2EEgFN+1GZmS4QfM2fCizACY/nR8KRoFkTCCACn/KrNzIoKr6jeCIwKwgiM5VfDk6L3UTFhBIBTftfmqO/xC5soL5GOCsIIjOVnw8uIyhAuwggAp4JQm/kF1nwEy+ggjMBYQWh4UjSOFySMAHAqKLV5cHCQWVGG4lj9aCGMwFhBaXhS+AcvEUYAOBW02hy1PX6m4zCC6CGMwFhBanhSuIdwEUYAOBXE2hylPX4m45jmaCKMwFhBa3gZYRzCRRgB4FRQazOD8oIrlUqFsnfCGcIIjBXUhieF7+4OYQSAU0GuzRwRGzzZqwo4kjmaCCMwVpAbnhSuda+EEQBOBb02h32Pn0n4bwGJMAKDBb3hSeEZwkUYAeCUCbU5zHv8TBGFkyjhDGEExjKh4UnhOCudMALAKVNqs5S7x499JN7huiMbYQTGMqnhSWYP4SKMAHDKtNrMHXrvZH8ixclmyCCMwFimNTzJ3CFchBEATplYm8O0xy+omPmCYggjMJaJDU8ysyATRgA4ZWptDssevyDiFDPMhzACY5na8CTzhnARRgA4ZXptZt6Fu5jvglIIIzCWyQ0vw5QiTRgB4FQYarPJe/yCIgyHt8AbhBEYKwwNTzLj42vCCACnwlKbTd3jFwTDw8M5S95u3Ljh91tCgBFGYKywNDwp+IOfCCMAnApbbeaX6vIQ4lAuwgiMFaaGJwV7CBdhBIBTYazN2cuNglSbg6a3t5flbSgbYQTGClvDywjiMCjCCACnwlqbTdnj5wc2/qMahBEYK6wNTwreEC7CCACnwl6bg77Hz2sciYxqEUZgrDA3PClYQ7gIIwCcCnttNnFWVK0EqU/BXIQRGCvsDU8Kzh0nwggAp6JQm7P3+EV1H0nQPsGHuQgjMFYUGp4UjLW4hBEATkWlNkvB3OPnhaj+/0ZtEEZgrCg1PMnfIVyEEQBORa02R+kTgiCf+ghzEUZgrKg1PMm/89sJIwCcimJtDvqsKDdk/3+M+l4ZuIswAmNFseFJ/gzhIowAcCqqtTkoe/xqgVPEUEuEERgrqg1P8n4IF2EEgFNRr81+7/FzG/NVUGuEERgryg0vw6smQRgB4BS1OXcSeVc87vfbqUgqldLe5uZInxgGbxBGYCwa3hQvPj4njABwito8JXsGh5d7/NyQvxzYpPcO8xBGYCwa3qxaD+EijABwito8y489ftXy66AURBdhBMai4eWq5RAuwggAp6jNufL3+CWTSb/fUlF+HiGP6CKMwFg0vMJqMYyKMALAKWpzYUH+Rd+kwITwIYzAWDS84twewkUYAeAUtbm4IB6RG+YjiWEGwgiMRcObn5tDuAgjAJyiNs+v1nv8ypG9yf5Qayv7Q+ALwgiMRcMrza07XoQRAE5Rm0sLwrG5YTh+GOFAGIGxaHjOuDGEizACwClqs3OZ2uz1QMFa7C0EKkUYgbFoeOWp5i4YYQSAU9Tm8ri9x28+2acubmhsZH8IAoEwAmPR8MpX6RAuwggAp6jN5XNzj5+ffwdQCcIIjEXDq0wlQ7gIIwCcojZXppafWnj56QtQLsIIjEXDq1y5Z8oTRgA4RW2uTrV7/PKdOnnSl30pgFOEEVQu/ZXO7tuupi3N6rj073O+fO9Kt36xbauatuxRe+Lm3JeP9unQtq1q+llcl+9N/+G1uJqs5WqKXy3519Pwqud0CBdhBDAItdl4bpx0FYQTuwAnCCOoQkqX2htlW0u0oeNzpXO+9o2udD6nOism27K18uCA7uR8/Z5u9b2sB6yYlu7v17/f/Fhvn+nX5T+/p5Yla9Ry7ktd7o/rNx9+nfd9Z9Hw3OFkCBdhBDAJtTkMqpkBEqRZJkAphBFUIa07A4e00opp0e4e5d5f+1o9u1fKXrhSDSvvk/3IUV34Jrt1ZZrlSu3pGZlpfnbeo25bXCNFOh4Nzz2lGhdhBDAJtTksKpkVFcQp78B8CCOozq0+7bs/Jvs7rfpwPD3nzxft7tC/HnxctrVRJ5J3Z7+e/lwdjUtkL9ilrpGJqT8a+0xn9/9o6o5dwz6duTiqiXn+ahqeu+b7SJ8wAhiG2hwa5ezxc7r0FggSwgiqk76irm31eQ0tc1duuTZ3fqG/9L2sB/KXC9zs0Z6FMdlPHlfyniRN6ubAK3piwRrtefOIdj24VE+0/F4jE8UWAtDwaqXQEC7CCGAYanPozBc0yj2UBAgSwgiqdFfJ4xtlWyu0q3tk+s/GdOH19TNNMD3arRcWZn+sn9ad/gNaat2nR9svalKSNK5rA2/pxZd+qysTd3Ulvl8vHP2DrtHwfJF/DCRhBDANtTmMBgcH58yKquS4diBICCOo2uSldj06vdnxjiTd+1Qnnlw8uxY5PaTTm5bLXvhz9dyc1Oya5MfVOvD/Kv57aXi1lT0gizACmIfaHE75e/wq3eQOBAVhBNW706+WJTHZ32/XpUkpPdShDTmntGTu0K1RS//N2TXJ97+svlv3Snzz4vI3VM73taA+J/t5Xj6nkvfN0ZCAYajNkajNtsVGdZiNMAIXTJ/OsmCXukbuarR7txZZq7Sv7/r019P65pOj+kHmo//MBsqd3Rot/kl/SYUKNGojO5C4MYQLgBeozWGUSqVy9vZlHgw0hKkII3DBhEbiu1RnrVFL/5/Ut3eV7IW7dXY067yVzB26xlP69Pxhfc9ars2dQ0XPqXeChuedTBDJXPNKh3AB8BK1OWxSqVTO/pBMCOEoX5iMMAJX3Ese1zrrPj366jEdWmnLbuzQ5Zxudn2qEd7/dzp8aIPmHCdZARqed2xras9INUO4AHiP2hwe2fv49jY3K5VKzVznQl8DTEEYgTvGz+vwSlt1y5ZrubVY645/qtwVx5k7dEtUv6zQoK3y0fC8k2lwUmVDuAD4hNocCvknHBaS/anJhsZGajOMQRiBS26qf/+a6WK5Xkc/GZvzjKnNk1PFdOZ0lyrQ8LyTHUYkzrQHzEFtNl1mf8jqhgZH+0LKfT7gN8IIXDKpmz0/1yIrJnvJAfXfKXBnLXOsZM4GysrR8LyTH0YymPYLBB212VTZn3QUO82w2HV28kkKEBSEERiLhuedYmFEKjyEC0B0UZurlz9LpFhdne86s8cPpiCMwFg0PO/MF0Yk540TQPhRm6tTzulYpa4ze/xgAsIIjEXD806pMCJNLSnY29w875ICAOFHba7cqZMny5ob4uQ6Z88lYVYUgogwAmPR8LzjJIxklNtMAYQLtbl8lR4KUs51Zo8fgoowAmPR8LxTThiRyltmACBcqM3lGR4ezllKdePGDcevLfc6s8cPQUQYgbFoeN4pN4xIDOECoora7Fy14aCS61xN+AFqgTACY9HwvFNJGJEYwgVEEbXZmd7eXt+WTeUvC6M2w0+EERiLhuedSsNIBkO4gOigNs8vSBvK2eOHICCMwFg0PO9UG0YkhnABUUFtLi6IR+2yxw9+I4zAWDQ877gRRiSGcAFRQG0urBb1z63rzKwo+IkwAmPR8LzjVhiRgnlnEIB7qM1z1eqTYTevc/YeP/aRwEuEERiLhucdN8OIFKw10wDcRW3OVcs9c7W4zuzxg9cIIzAWDc87boeRDIZwAeFDbZ7ixWmCtbrO7PGDlwhxFO5YAAAUBElEQVQjMBYNzzu1CiMSQ7iAsKE2585ZquUejFpeZ2ZFwSuEERiLhuedWoYRiSFcQJhEvTZ7eTpVra8ze/zgBcIIjBX1huelWocRiSFcQFhEuTaHcW4He/xQa4QRGCvKDc9rXoSRjDA2cyBKolibU6mU9jY3h/pmSvbE+K543O+3gxAhjMBYUWx4fvEyjEgM4QJMFrXanL/MNMx7K7JnpbDHD24hjMBYUWt4fvI6jEgM4QJMFaXa7PcBHH5cZ/b4wW2EERgrSg3Pb36EEYkhXICJolKbg3A0uV/XOX+PXzKZ9OV9IBwIIzBWVBpeEPgVRjIYwgWYI+y1OUi/iPt9nYMQyGA+wgiMFfaGFyR+hxGJIVyAKcJcm4N21G0QrjN7/FAtwgiMFeaGFzRBCCMSQ7gAE4S1Nmdv3j7U2hqI+hOU68weP1SDMAJjhbXhBVFQwogUvDuTAHKFsTYH9VjbIF3nKBxvjNogjMBYYWx4QRWkMCIxhAsIsrDVZvaslSdzvZgVBacIIzBW2BpekAUtjGQE9W4lEGVhqc3Zp/ltaGzkTn8Z2OOHchBGYKywNDwTBDWMSAzhAoImDLWZ/WnV4xrCKcIIjBWGhmeKIIcRiSFcQJCYXptNuqsf9OvMp0twgjACY5ne8EwS9DAiBevsfyDKTK7Np06eNGq/gynXmT1+mA9hBMYyueGZxoQwksEQLsBfJtZmU0+CMuk6s8cPxRBGYCwTG56pTAojEkO4AD+ZVptNnpFh0nWWgjmrBf4jjMBYpjU8k5kWRiSzf8EATGZSbTb9xoUp1zkbs6KQjzACY5nU8ExnYhiRzF16AZjMlNochiWdJlznQtjjh2yEERjLlIYXBqaGkQyGcAHeCXpt5hfh4AhDIET1CCMwVtAbXpiYHkYks47rBEwW5NrMMeDBMzg4yKyoiCOMwFhBbnhhE4YwIjGEC/BCUGszm6eDiz1+0UYYgbGC2vDCKCxhRGIIF1BrQazNYT1WNmjXuRrs8YsuwgiMFcSGF1ZhCiMZDOECaiNItTmVSoX633pQrrObTBs8ieoRRmCsIDW8sAtjGJHCe7cU8FNQanP2p6BhPUI2CNe5Fkw/chnlIYzAWEFpeFEQ1jAisY4ccFsQanNU9of5fZ1rKSr/DUEYgcGC0PCiIsxhRGIIF+Amv2tzlE7OC3sPZI9fNBBGYCy/G16UhD2MSMweANziZ23O3h8Shf0GUemBUfvvGjWEERiLMOKdKISRDIZwAdXxozZn30HnJKZwitInXlFDGIGxCCPeiVIYkRjCBVTD69rMjIroYI9fOBFGYCzCiHeiFkYkfsEBKuVlbebUpehhj1/4EEZgLMKId6IYRiSGcAGV8Ko2M48iOntG8oV9fkzUEEZgLMKId6IaRjL4pQdwrta1mcMmZkW9B7LHLxwIIzAWYcQ7UQ8jEstBAKdqWZuHh4dzlujcuHGjJn+PKeiB7PELA8IIjEUY8Q5hZApDuIDSalWb+aVzLnrgFEKq2QgjMBZhxDuEkVkM4QLmV4va3Nvby3KcAuiBs/KX71GbzUEYgbEII94hjMzFEC6gMDdrMxuV50cPnIs9fuYhjMBYhBHvEEYKYwgXMJdbtZkjXFEp9viZhTACYxFGvEMYKY4hXEAuN2oz/65QLWZFmYMwAmMRRrxDGJkfd3CBWdXWZj5xhFuy9/ixjyS4CCMwFmHEO4SR0ljbDkyppjazF6s89EBn+LkKNsIIjEUY8Q5hxDmGcCHqKqnNnFJXGXqgc3ziFlyEERiLMOIdwkh5mIeAKCu3NmfP72Ftf3nogeVhVlQwEUZgLMKIdwgj5WMIF6KqnNrMqUfVoQeWjz1+wUMYgbEII94hjFSGIVyIIqe1mXkQ1aMHVoY9fsFCGIGxCCPeIYxUh1+6ECWlanMqldLe5mZCugvogdXp7e2d+Xntisf9fjuRRRiBsQgj3iGMVK/y5Sh3lezcp6YtW9W0ZY/aEzeLPjM92qdD27aqacs2/bQzqck5ry/02KZde9v0n3uTGksX+jsLPP72ZR3t7NflscmKrwfCa77anL98kTX71aEHVi97pk15e/yozW4hjMBYhBHvEEbcUdkQrjEl2h6f+Xl/YG+fbhV83oRGu3dr0fTz6tsSmijw+uKPJXriwHsaTTt/Td3aX6pvZNy164NwKFabOdgBQVXZHj9qs1sIIzAWYcQ7hBH3lD+EK6/53P+y+m7dm/u09JBOb1o+87y5DW+5muJXC3z/cY2ef0vbH7RlW+t0OHGrxGvSmhj9SP91z6OyLVsP73tXN9MFvi0iq1Bt5shrBF3+Hr9kMlniFdRmtxBGYCzCiHcII+5zPoRrtvmsfWyVbGuV9vVdn/Os9JVObV6wWD947BE9UFbDk6TbSrT9ULZ1nx5tv6hJB69JD3VogxWTveSA+u8Y0vHgiezaXP4veCgHPdB9zoMztdkthBEYizDiHcJIbTgbwpVpPo/r74+3aV3B5QDf6Ernc6qzNqr9eIvqy254d3Th9XVlNTxdi6vJisle8FOdHTVrfTJqK/MzzRGqtUcPrA1ne/yozW4hjMBYhBHvEEZqp/QQrtmGd/iPf9SJJxfPXQ6QWQbw5HFd+mNbmQ1vUmNf/EZ7HnK6FGDqNbcH/kGPWDHZ32/XJTP6HTySqc2Zn+tDra3sD6kRemDtlN7jR212C2EExiKMeIcwUlv5d5BzN09mNbzEdSWPb5yzHCCzDGDd8U/1TaJYw7NV/9hf552+skV/81j99L+lFWo8/MH0GuPMa5boqbZ/UyKRmH30v6Mzx1v0Nw/asq1V+rvuqzJjIQC8kr2RluNSa4seWFv5x1BTm2uDMAJjEUa8QxipvcwQrkOtrXlfyW54Y9PNLXs5wN2pJrjgOZ2+8o0mija8YievrNBTe17TmfMj08938pqYbGulNh3+7xqZMKXdwSuZnxFm6tQePdAbx944pud37Mj7U2qzWwgjMBZhxDuEET/lNryZj/0zywHufaoTTy5W3aZOXUlrnoaX+7F+euxz9bQ9qxWWrRXbTupizrn0mdcs1tq9b6krHs95vN3zgZLXzTk2Et6iNnuH6+wnarNbCCMwFg3PO4QRP+U1vJkNkVPLAe4lj2udtVybO4eUlvOGJ0ma+Epn96yRbdlasTOuKzN30pxsrAQKozZ7h+vsJ2qzWwgjMBYNzzuEET/lNzxlLQfo1v88vlH2whfUNfKtpDIbnqT06Dv62UO2bKtemzuS+tbBawqZTHbqp9uOqP+mITsmUTPUZkQDtdkthBEYi4bnHcKIn+Y2vNnlAI9o7SOLtWhn9/R03vIbnjSh0Z59etiKyX5wt7qu3HXwmgLfJdGmemunuq5NlH4yQo3ajGigNruFMAJj0fC8QxjxU4GGN7McICbb+q5e6P4/M6emlN/wJKVH1PPi9JKAXb/TSDqcDQ/eoDZ7h+vsJ2qzWwgjMBYNzzuEET8VanizywHshbt1dnS2yVTU8JTWxJW4XnjQlm2t0YvdFzUQwoYHb1CbvcN19hO12S2EERiLhucdwghKMaHhwRvUZu9wnVGKCbWZMAJj0fC8QxhBKSY0PHiD2uwdrjNKMaE2E0ZgLBqedwgjKMWEhgdvUJu9w3VGKSbUZsIIjEXD8w5hBKWY0PDgDWqzd7jOKMWE2kwYgbFoeN4hjKCUzOZMO+cRrsFccIba7B2uM0oxoTYTRmAsGp53CCMAnKI2AygHYQTGouF5hzDiva54XO+//75u3Ljh91sBykJtRph1xePq7e2lNruIMAJj0fC8Qxjx3t7m5pmf8Q2NjTr2xjENDg4qlUr5/daAeVGbvcN19h612X2EERiLhucdwoj3shte/uP5HTt06uRJJZNJv98mMAe12TtcZ+9Rm91HGIGxihUDHjyi9jjU2qre3l4NDw/7/c8S8P3fAw8eQXnsbW6mNjtAGIGx/C4yPHgE8fH8jh3clYOv/P43wINHEB8bGhupzUUQRgAggOZbCpD/4JMRAPAGtdl9hBEACKBS65K74nHusgGAx6jN7iOMAEAA5Z/YcurkSU5sAQCfcZqW+wgj8Ff6lpK9b6lly9qsCaH1euJvW9Xx3hcaS/v9BgF/9Pb2MmcE/qE2AwUxA8p9hBH4Jj32v9Sx8weqs2KyrcVqWL9ZTVu2auv6VTN/tnrnr3RxbNLvtwoAkUFtBuAlwgj8MTGkrp2rZFu2Vmw5qr6h25q90TapsaF3dXTL92Rbth7e062RCW7DAUDNUZsBeIwwAh9M6mbffj1sxbRo06/0xbeFm1n69h/16g+XyLYe0Ut9X4uWBwC1RG0G4D3CCLyXHtLpTctlW6u0r+/6PE+c0Gj3bi2yYlq0s1ujdLwaGVV/2y41bdmn08m7zl5yLa4ma7ma4ldr+9YAeIfaHDDUZkQDYQTeu9WnfffHZC/8uXpuzr/mOH21U5usmOwlB9R/h45XG1fVtWW5bOtxHU6MzfvM9M2P9faZfl3+83tqWbJGLee+1OX+uH7zIXdHAeNRmwOG2oxoIIzAe9fiarJispe1KTFR4rkTCR1eFpNt7VTXtVJPRmWcNrx7utX3sh4ocLZ63ba4Ruh4gNmozQFDbUY0EEbgPRpewDi/+yZJ6bHPdHb/j6ZO1WnYpzMXR8V/GSAEqM0BQ21GNBBG4L3Rbu1a4PDj/TKWDaBS5TS8Sd0ceEVPLFijPW8e0a4Hl+qJlt9zog4QBtTmgKE2IxoII/DevU914snFsq31OvrJfAU2rTsDh7TSisl+8riS9zx7hxFTTsMb17WBt/TiS7/VlYm7uhLfrxeO/kHXaHiA+ajNAUNtRjQQRuCDcQ11bFGdZevhF98pfhJLekQ9L66RbS3X5s4hNuHVTHlLAYwwmdTpn2xT0086lSz3pm3mtduOqJ87vogUanOwhLA2S5XXZ2pzaBFG4IvZc+q/p+0nLmgsv5tNfK3EP+3QCiumuh8eUeI2had2QtjwMuvZnax9L/Za1sIjgqjNQRLC2ixVXp+pzaFFGIFP0ro79K96ae0S2Zat+rU71Xr81+qKx3X6+EHtWls/dRLIY3sVT4aoCAdSCBseYQSoELU5OEJYmyXCCOYgjMBHaU2MfqwzB59Vw4K8IwkXPKLtbW/rk9Fxv99kBISw4ZVsdpMau3pRiURCHyWv5544k9/wJq4rmfhIF66OlViOMq7ryUElEhd1dcytu8VT77P03w24idocDCGszVKJ+kxtjiLCCIIhPaarFz5SIpFQ4sLVuUsDUEMhbHjFmt3EiAbaX9Dq/F+wlv21DvUNTzW+mYa3Xvte2a21M8+1Vf/jf1DfSN4vYenbGup5TdsbFmd9z8Vave0Nnct+btEGPKFr8Z2yM1OTM8/7zk61tm5U/fT3e/T1j8Wvf/ActdlHIazNUuFaSG2ONMIIEHkhbHgFm8stffL6BtVZi7V629+rI/5v6nnntzr95p6pprZgizqGxrMa3vRd4Fd+rb7+/6b4a7umGmXDL7M2T45rpLtZD1sx1TU8p7ZTb+tsd1wdBzdPralf+4oGMs8tt+FZMdlWvdZu3KKt69frpb7rnl0+AEEQwtosFaiF1OaoI4wAkZdpeIvVsH6zmrZsnfsw7fSSQs0lMxdhzatKpLJv747pwuvrCzScem3uSOrbmefdUfL4ZtVZi7Xu+Ke6J0m3z6nlIVv2wp06/dXdrO+Z0hcd27XIuk+PtJ1Xqth7mnqzRRrecm3qSDK0DIisENZmaW4tpDZHHmEEiLxMw4vN8zBsw2Cx5pIe0/CX/1e5f/Sl3mt7em7DWbBLXSO5/5/TVzu1yYrJbuzQ5XRad/oPaKkV09L9/bqT9xbSo916YWFM9vfbdWlynvdUtOFt1InkXQGIqhDWZqlwLaQ2RxphBED4FA0jt3W5/4zaW3araf0q1eU09byGU2hzZc7XMo1qqTZ1fjl3E2Pmufe/rL5b9ypoeAb+kgEApRQMI9TmKCOMAAifgs3uzzp34EfTTW6xGtZv1Z79R3Qi3quzhe6+OW54068r9h4W/lw9NyezNj+26sPx7PY4rssdz9LwAERDfo2lNkceYQRA+MxpWml988lR/cCKqe7H/6hPco53TOlSe+PchpO5a5aloqUA/+F1XcheCjCnkY0p0fY4DQ9ANOTUZ2ozCCMAwmhOGMncKYtp+cGB3GMY715Q+4+XFmg4a/SznpGsj/gzmySX6umOz3RPUvrmu3rpIVv2Q/vUM5rdnDKbJG2tPDgw1QzTX+r0M0tlW0+r/VJWe7z7sY6uXUzDAxANBT/FoDZHGWEEQPgU+Dj/3lCHnl4Qk/3gdh195wMlEuf14bv/otZnVk6vS16iDR2fK519fOOyp9XS8Xt9eP6cfvf61PGRdT88osTtzN27lIY6X5g6KvKxPWrvPqdE1nPth5p1duY8+3ENdWxRnWWrfv1etXfG1dX5n9SyMfP30/AAREBefaY2gzACIHwKri0e18i7v9QTOUO1lmjt7hN6v++o1lkxLdrZrdHMa5ds18FDz2rFfMOyJCn9F1068ws9tczOG6z1mnqGbudsnkyPXdSZfY3Tw7Jisi1bK545or74AdXT8ABEwZz6TG2OOsIIgGiZuK5kIqFE4qKujpU6nz+tieuf6aPER7pwdWzuqSw5T81Mqh5U8vp883gz3zOhj5LXOaseACRqc4QRRgAAAAD4gjACAAAAwBeEEQAAAAC+IIwAAAAA8AVhBAAAAIAvCCMAAAAAfEEYAQAAAOALwggAAAAAXxBGAAAAAPiCMAIAAADAF4QRAAAAAL4gjAAAAADwBWEEAAAAgC8IIwAAAAB8QRgBAAAA4AvCCAAAAABfEEYAAAAA+OL/Ayl7mvbDGvSJAAAAAElFTkSuQmCC" width="400" /> </span><br />
<span style="font-size: large;">Economic rent is the area to the left of supply of labour but below the equilibrium wage rate. The largest area would therefore be (C)</span><br />
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<span style="font-size: large;"><img alt="" height="100" 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width="400" /> </span><br />
<span style="font-size: large;">The answer is (A). The government is there to improve allocation of resources. However, sometimes, government interventions may do more harm than good. The existing problems become worse or new problems are created. This could be due to problems like regulatory capture, information failure and others</span><br />
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<span style="font-size: large;"><img alt="" height="118" 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eYvfPpKY6QJHH0qBZINT4FE+jF0jwchhBwJjI9/ujgISEL2leH7CMkhQYE0JnKmprY/Q1nVYKdACHkSyFnJ+t43dZaYs5VPEAoksvfI1X7lI76Askqzrf30ZN+gQBqVtmMt+eViQsgTou2oWac9BuTooEAie0/78d3b209P9g0KpLFpxHyK2NX5iuKIEPKkaMbmnyKeZpivKI6eJBRI5CAw7Jva+n56sm9QIBFCCCGEEEKIgAKJEEIIIYQQQgQUSIQQQgghhBAioEAihBBCCCGEEAEFEiGEEEIIIYQIKJAIIYQQQgghRECBRAghhBBCCCECCiRCCCGEEEIIEVAgEUIIIYQQQoiAAokQQgghhBBCBBRIhBBCCCGEECKgQCKEEEIIIYQQAQUSIYQQQgghhAgokAghhBBCCCFEQIFECCGEEEIIIQIKJEIIIYQQQggRUCARQgghhBBCiIACiRBCCCGEEEIEFEiEEEIIIYQQIqBAIoQQQgghhBABBRIhhBBCCCGECCiQCCGEEEIIIURAgUQIIYQQQgghAgokQgghhBBCCBFQIBFCCCGEEEKIgAKJEEIIIYQQQgSHKZDyBdJJiCC8wGydt18zSbG0XLLXNPL4Fcv0OwTBd0iXX4tLlikmQYhJukBnFvMv2HyRV8lnPUMy++SZjl2yxvL2EnEYIAgCUZc5NsvfMY1Pi39TymN0amVmucSnDg4Rj/ovyiJAmMyw3lHyvHhUW37aNGxjH+rCoX0fLTsq/6P3j0+U3fn6b9hsPPr3/COy8zNM55+L/xXpDLrSKttDOc5A437zb4IknWG5qVt3+32niKe/YrZUU/MVy/QM0fQOG/fcIt9s8EXPw4H3b/lqjmwaI5TlFcaYZnOsHiFLFEj7ymgCKcdmcY04VIXEYQgk3cmEyQxr1ZEFwZbSZSqztjQe8QCAAomMwH4JJPf2fbRQIJEB7MTXb/5CGj/zsJ0H3GevcHKe4d4kcFrGgrbrugWSGJso73S+L3yF7P5Bye8dptHLUty1s8YiPUeo5ukI+rd8dYuLKHQq411AgXQw9BVIzfu8BNKjkWM9u0AYnOI8+1jlbz1DEm67sZjKzJJKDgBKKJCIjf2yDff2TYZB/3ic7KI9+9pOfp/hXJv0kM94Hj1HaG3vwh88jxCFZoFky2e+usN1MmmMpdrTvsYyu0DUeG4h8EKXMatpfHvw/dtnzKcvilW567tyxShf/YHL+PRRxqsUSAfDUxVIWhqlQNrqQIsCqQ/7NQg2cPAdyOGyX7ZBgbQr6B+Pk/0TSEWbNq/khJj89BNeh5Zn5QukkxNxjZ9Asl3TnfZPmCXPmn3ReoYk9IjsOSaBJNJvLOudjPuaPD2BtFlidjOt9rXoMaTrGRJjQ8qxfv8b3uvvE43LGDs65FmjhNiJRqguVU5SLHNVIP1vbZ9PGE+RzVfV84xlvcZyliIpl0JDREmqxdTayVdzvE0TROryqfpePYwuCBAEEeI40v5NzfsDVvNM2ZsUIkreYL56MCUA88xmA7Yys+TFWAc5Nsv3uFHjaKME6WwpbESKP9MA7RPeZ382nEDxnhety+9VWv7GeplV9RMluFbr1LUe1LrQ29pmidsyf6eIL//A/aKrMxFlayrP9Z/I3uudgrDT6BLzTe5Qrmo5PENy+wF3l+La6BLz9d9GW16k5wiDEFGSKbHkLvYk0hde4HbxHzHLFQpfkGOznCFNJpUdGdJqJV9h/vZKaWMtsdit9iwx5cfQZrv8I6B0ZO+wuPtZXKvYpotttPm3+QflfoNNFonQ9iKeIp7e4Db9oTmpUqOjfbvk34jqn/9RfGqR/1Ve1FNpj8Ep4unvzb0LHm3SrfzF/bcpXodjlv8DVvPf6vYdnCKeZrU24jTI7cqPQ1ss3qNFG9T+ptqER9t2KQ/reMQ2EenRVxnz4uLj23wTUPThv3b7A6Bne+5TBvL9sn9U+/qOyQyLsKjK6z1uLX1Pcc13SO9+Q7JrgdTIV/HvrUJAiIXGOEitg/tFvc60dlngYYe9+4X/C8n0/0Zk8cnNttmW591PtDwtgbT5C2lpDNov+hGz1QPKBq03pPwjsvNmPGzZuNqWbvs8aycC6RRn8UvNEWmxsY10iGVgl5haE5s7TC0xpoGed2eB5JGm/COyc7MNFLNPQwWS3N9gyl+I6OJWDJbErJVuA4YwAasdWdISvX5teP8EF7P76l0u9WCsf9u9IaL4zBA2YEqjnj9LaEGtjBzLFdVgSbXt8DzD/Tc9L4o4Uu53t3E5CHmJ+KwaqJ9nH/HtPsO5Ma3mQVwdGWpgzmvNZjrt2SM/Tv6xsonwLMZZqD3H1Tas/u0Zouiko9xzbOaXNRFR//UUSK75NyLTP8Hr5Ewr61OcZ/+Du0adanXp2Sbdy1+xiV2Uf2OA6SiQTPlxtV1rxEglFPz6L4/y8BIHw/pPdx9v90156fdM9efST7i05yFl8NVTINknHFVB+dl4jVh5SmZYS+HhLJDUSRqfEDvAuoIk89I2tu0USGqdm/oDlzpQ90YN7Bf+u0R2fmrYFqG3TQvy/S7jy5E5bIFk7SBNzlo2VE0lK7MjshHYY1kDzQGbl3VrSe37rNEOaWgLsQsQhDEu7+TKzT1mF5N6x62nQ/5/bcDwgNXsR0TOaZkgyRbKTLrpfvcQu1wORqMLZOUM2ANW8zdIolCpn2pmKox/xt1KHxjKMhoQYlfaphpHa3KkJlFQ2Wh9ELxAOnnWObCuNoYqs9Z4wErO5pQrMR71YLVDdQY8x0aZzWw/LcgwOVCWmaGdSKfoXK5KOYTnSBdKSmp5+SwGCaeI07/qK1DO9lS1ozC+xqKcTavKVx1slBtQXYVubUXLdL+jPcsOVW3rijgs6sLdP1Z1oZedh21Y7Sqoz4a3+aSa/VZx/d2hw20+0SH/rc+s24266biqI0XsN/onjzZpLX/VdrZY/rX2oV7r2UdZ8+PTFuWAT/PZWn/Rp207l4eDOHB/v6WovH287puUZ9RWnZQTY/v4eh+B5OSPXMc3yjsMA+3aM0yrEPkC6eR5kbYWgdQ1zrSG9pnS3uFTnFZV2kLstP6g8kFKu/RuB0P6BYuAtUwS18tK9mWacN8RT0cglU5dOhD1eWIWtmxgnzBLnisVVxzBOLn6FVeTs6qSneJFez5rJwLJtiTd5vjkDOwESXqDLHvnFBrQIF9h/jZDlmXIlKXbymG4CqQ2MaM3TNuytkuZWbKh1UE5uDWEXEqnVKZ9PUMS6jPDZ7jK/o2JPggedIqcHDwYbLWrHmwCuTHIr2aV2weSIj96JzT5N7KrM8WW66EGPuVqLYcyLzF++ik2iiM/e7K1I3ldiCi5QpZleGsIcezmAav5u6Jusl+qUIhGW3SZXXUcpLr4R9tgyMc2WlYwunyS3e+57q001LFX/9D2TP3d7aE0xmf6tsnyPvu+226/7tEn1JI6x9usSGsV+qpPVjjannVw7dIWYQjDsbXXIW3bpSz19MtneObHVFTOPt6WfvnvpnBt7RmD2rOtDBz9ERxtB0Bb6Hb9Gfp1Wt/aRyBZwp57nWLnk+82gTSmHY7RL5RpO6m1zcKGWuy9jI54HHEEHLpA8gmxa93kpRuMqLyauDpDuvxciBsR8qMP9CwJ6fesvRVIllCnMMb05n13rH45A2eZifEWSIaQmcZPc/idYqOvQLKkubxYd2qfMZ++rIurSYrlN2kjUtQpAruxvF4NmNvsobnS5VgPepm1tSPXjZSbO0yjM2UgUrSDbzL/ZXut2qNPuXYKpJaZPy97ahuQG8MSTN+/MCFXDWwdq0OHVOIoGnz8o+29Prbh4N8k9fpss4UOO7Hlxzf/rs8E4CWQ+rZJWxmrjFb+4t9ajuMdTyD5tEXl+tK/Wv7fq207lIfzwNQ3P4aicvbxHYLd4jOaKy597clWBu4HRDkLpM6JAb1/rk+Y1icszQKpXgZytVpdxTO911bHEyTpb/aJZZd+dJBA8rDDMfoFAKX41if3rONnyynGO4YCCYB9RvEM6fJLTeAUYT8XmK3/0VaGutLr+ay9FUjiutUcb2ub9mwDTlNaio2uN2Lm8e18VQyOtyaQDJsY90IgKaIoV8WSHhfdHMgNE0ge9bANgaSIolwVS2W4wz/ahMHYAukU8eVbZD+9QHNPkIc9dXX2+Qrzt8rKT8fMYb2u5KSDWEl4O8dK30NFgaSX3AELpAFt0lbGKmMKJLUdTX8RK5zvMF+tmyFlWxdILStGjRWlPm171wKpvawokEwXugok1G1Cj9rx2oMkV9v0/aueaTexFwLJwQa8BJLMlyq8+uzR2i1PRyB5h1A84D77AS/S97hVxYscxN28QXLiWnk9nrXnAqmOeiJO25Kpfcm+3Esxaoidzp6F2AHC9s7FCTpa3YYJbm4SnDgebWl35hZH5lIPev23tCOfo1/z+wznL65wd6sKISkM3+AmeWHc9DpOiJ3Ii9yAbNyc7WJP7p09oJ7A19ZmW95fxu7veYidi20MGKDvd4hdT4E0pE2Wl44RYjek/GVedxFiZ0EMvKLpn7hvhKz1adtDBJJeHj3yo+Hs48cMsevVnm1l8Jghduq1ou9R0+t7SEMZAtZc5RgikB43xM7ynqEhdko6wuQW/+0MJ6VA6k8fgdRnE245W28+4MDrTHbfZ+2rQBL/X9sUDignjTjUSW1j4Lp+zLi3QFIGyPElbpXwpeojbnqolrapvTx+t3v2sJGl3oc0lE+oTuwxbrh0/1ZVtayvbV6X5duYLHCoh4YdKjNnXRvBW5EdZ91+q9UTy+DP45CG7jalxNKrX193tqeOQUhtE3JRxsVG5LY6NW3W1460VtLvZM/GTdHKxu7ayZYem3Ebbd3DNkZZwbDY+aMe0jBQIPVqk3oa9PKvbGdMgVQ7RKR2FPRYAsmnLeplIGbCtUGzf9t2CTmUdazuaTQfGuKfH62oXH28Qx/ffUiDj693LwPzIQ26P/IRGY6HNBT/Uo4rouik3qa9T7Gr6lOPChgukAYc0uBxWIh7OxjSLyisZ0hOXmH608uD+EbpExJI6HGMqzhuV3eyxqOKu/B81mgCSRmAlwPBIStILcdDWmb4K9ru7S+QqoGn6ZnaRvyWY5HV7+00y8xSugYH7HocdcnmDtNIP81F1JGHE2k/Arb+XRHnejC1Ndv+muSVwyENZWrNmzRzfTOncr3XMd8uAgmojtRWy8fVnlrakfWY78A8G+d6ry4eney5rb7V7+f4Hedq9L+utjFEIGHIMd/F/cb2Pcox331D7Aa2ybL8hx7z7SJQW2xOK/+hAsnLt2vpNduBb9t2s8fmsdQBgvB7XF3p3+Xyz0/z3S4+vm011eeYb1df71MGjv5IDSdvDUvW9xY1y6tmf+VzzWMLv+8gVXmpTbL1Fki546FMapicWMHyEEhedjhGv9BI9xCfsDuelkACig9e1T7E1/4hwHx5je/1iswXSL+/9la/Xs8aTSAB2CyQyQ/6hReYrb8MDLHTPxQbuH8EM19hfq2Wv9i4vvizMbvvLpCA5kfPWtLU+LCm4UNqjTKz2YepDnw/EvoVy/RfBudusJcWqrR8wH35oTbLBwBd68HW1mrtyPVDsXqCTbZvLgtxg1O5+gkkVIPKmnBxsae2QYghrc4fHa2OWy0HtvEUN7MPmJve52LPhvwYPwDq4h+7/K+LbQwSSLJ8+3woVqbR0r49+4eKMQ5pGNgmlfIf9KFYp0Ma5EyzHMAWh/Qs5leO4XjqC7r6cw/fPtrzfO2x3icWM/OfLXviPPPTeLeLj+8KN/X42Luzrx9WBk1/5HF0v2VPi9n+LOFbvQQSYAq16y+QHD4UW7y0uZLnJZAALzsco19Q8tcZnUOBRAgZk0EbQwk5eIbv8ThW6BuOA9ajDf+Ii73E6dMxB0zLPsl9hAKJkCOBnSd5EshV5No+SGVG9ZFnHR8POTOu7X0rV8uOeOD1RKCPt1OEJh/y5Ijp4/HHhPx8xeH4IQokQo4Edp7kadB2TO3jfjfjcfW8chYAACAASURBVLHsA5EhTK2fYCCHAH18G4XAcD31de/Y3GEavTScLnjoaP66Yw/uPkGBRMiRwM6TPBka+64se6qeHIZ9BWGMaTY3ftCSHBb08R1s/kIanx2gyCg+BTNpPeTqUFFOlqyd0rn/UCARQgghhBBCiIACiRBCCCGEEEIEFEiEEEIIIYQQIqBAIoQQQgghhBABBRIhhBBCCCGECCiQCCGEEEIIIURAgUQIIYQQQgghAgokQgghhBBCCBFQIBFCCCGEEEKIgAKJEEIIIYQQQgQUSIQQQgghhBAioEAihBBCCCGEEAEFEiGEEEIIIYQIKJAIIYQQQgghRECBRAghhBBCCCECCiRCCCGEEEIIEVAgEUIIIYQQQoiAAokQQgghhBBCBBRIhBBCCCGEECKgQCKEEEIIIYQQAQUSIYQQQgghhAgokAghhBBCCCFEQIFECCGEEEIIIYIjEEg51rMLhEGAIAgQhBeYrfPHThSwniEJA4TJDGvjBV+xTL9DEHyHdPkVAJAvU0yCEJN0ge4cfMNm87X8v+LetvftK7IcniGZfRrt3nyzwRf53wPKplEn+QLpJEQwSbEcbGZD8n44+Nn18aHa4rgPFrZY+ryhPmWfeOy2cSz+lYxD3R52y47aQsOf7OheQvaUIxBInzBLnhXiKAj2ZLApHVpQG6yYr+kxmNn8hTR+VrvucDvwsQXSGov0HKEiYCiQHpfDHaQPpWmLo0KBtB2Oyr+SwRjsYbdQIBHyGBy+QBIrNZVACkYavA5AOIvwLMZZaBuc9B/MmK5jBy4YVcBsWyA9DQ53kD6QndvKMQmkx4P+lag8fht6GhNphOwbBy6QlPC68HtcXf0gQu1sqzY7StUyxSR4hmT2d7G6ZZxVoUDaChRIe8fjDzAeCQqkg4T+lag8fhuiQCLkMThsgZR/RHZ+ikB2XOVq0mM6s0+KKPomBJzJsfUZzGj7rRQxWHXgt7hf/o5pfCr2ZMWYZnOs9AdulpjdTBGXq28TJOkMy03evC5NEAUd1+UrzDPtedd3zfc2aDr/qhz+xOL2snpmIy/avY3VxKIsvxkHNw9YzX9DmkyU608RTzPMVw9VtloFUo7N/BKRpeOqhLKtU9PzrtjE/ANup3FZ12E8RTZfudm0S12o+Vgvq3eFMS7vivfkqz9wqdrR7RIb4/0LZGU5Nt9ltuscm+V73Ch5DKIE6Ux5x+YO0yg0D0rlKm0yw7rWlv7BsrSZU8SXfxRpyVe4u5TvOkU8/b2fDZf5vsJ8obQz3XYsttisP+EvTCJq/Sey9xa/EV1ivv57pBA7cV94gdvFf0Sdh4imd6IuHrCaZ0peQ0TJm1o7aS3Dhr9weZ7WNmR9n2e41zNSs4WWdHT6oxH962B/6O4D8tUcmdaOrsvrZJ5Mk4af8D77s9G2iry+wHT+uSWda6WdyXL4DenrZwZ7NOwRHeyTnyG5/VC16egS803u+YyuPsZuD1V6B7QLoz3k2Gj2dXn3f7BwEUhj+XSTP+myxdZw3z4+2cN2hua7wQCf7GGD4oEO7UhmvK9PIX05aIEkG0rViJT9SI8VC6sfzmCdRd6SQDqLcaaHHAanOM8+Vs/c/IW0dOraL/oRM9mIFQGq/2oDFdfrjNgF0vPouZZXPS99BZIUNob8ayGanStIIu/NfFaDTrsd2gTSM0TRSTNd4Stk94bOt2YirnUm8hG9QqLbQvgK2eI/mEah9gxlcNB2fxAiurgtHXfTrnNsFteKo7fd+4D77BVCQ77r4lOW2wSvkzPNZk5xnv0P7qYvGu+ptTPfcnseITKkv7zWWSDJvOgDWJF33W/kC6STk+JZo+1Bkrb6EvHZqVJuH5HLdJjaiV4vTmXo+ryWyQNtoN+YiOjtj0byryP5QxcfkN9nODe2IyVNqs2oub3PcB7q5Sne37rq+RnzRntS09hHIPn65FOcxS+rAft5hvvc36+39zFtAmnsdtFWBhHiODKWY71QR/LphvrrtEXrvX19cg+B1DffpqLs65M97Ni9HfnYEBmTAxZIykEIpSGpDu0xlqNNs3W2jn07IXa1GRo8YDX7sWisZcOU79VmuzbVzIt0PPI96mAX+T1mFxNDRxEiSrJqBihfYX6dINIHDw1sAilAfYakLS/q4KgpSO0O9QLZUpk/beTNJcTOMkNrGZS0512xaXUWuExXl2141IXMR+1apYxrdiQOGzCVQxAgjH/GnbCjaqaumoG2lmGtftWZU6U+1zMkjX18+iBOLbeqTvPVLS4iPY2KOCvv71tuVfup3mUYcHSF2OUfkZ1rm8DL99TtKl+mmMiBydgCKQgQxtdYKKs95QC81lYesJq/QRKpKzqV71XtoZqMEULD+XkGv3Cf4bxhC5+0MOah/miofx3LHzr4gHLQNEGSLcoZ8Xx1h+tkogxgTQO7qh9o2t2z1jSWZaHW4UZZRe4jkLx9coAgPEe6UK/t8YzOPsZiD8523MO31FY41lhmF8InOwqkoT69UX8utth2bx+f3MN2+ubbWJYDfbKPDXa2o+E+jfTjcAWSOkCrhVZY/n2XadIGRKXQKENWgJ3tQdIdV9mA5XKweq3ocOW1chY8SpBmGbK3plCStkFgy1J1oxyaAqkzL30FkvrI1RxvswxZlinhXqZwv5Y9SA0xJGeRuvbC2VeQ3EJS9Mx41IXt1CFZ5/ozbCujhhUyOXjQhbYsH3N7MN9rnNHe3GEanTjMNsoVZb0etEH1GOXmaItmhLjQbXbyb2RXZ0o+i7TY62CoQNLLz75q05wYsJW16T0uzzOlyeBPdAE92B+N5F9H9If1dNnbVQ29XNYzJKEu3s9wlf0bE32yx2nV21CHLv65qzzh6pPbfWHvZxjad7OcPezYwx7s9SlXGhwF0mg+vYdI6bzX0ScPerdnvs2F2c8nq09otUGPdjSCTyP9OFiBVM0AtfxcQpJ2maZaA34kgdTqHPQ0ydkWbUk3nuJG7hUxnSLYmm/bO1tEiS0vAwSSOpPV/HkKpDIUTKbL1Wn5hhF1OHWfurA5Xd/O1JRH7W/1MpQDCEtnb6q/+wznobzeZ5XWsTMeo9wGCSQI0XemiIOzKjxU3m8c5G5TIOmfUGhpKy2CudfzjGnS695gC4P90Tj+dbg/7PIBpvAvQ/hNmd7PmE9f1icpJimW3wqhVInc5x22og9k2/7mJ5D8fLJNXPX067b6NF7rYcfO9tC2X7nDZ+ppH+rTW/yJtf6c792iQOqbbxt9fDJcbdCjHY3g00g/DlQgqd8Zavvt8rAGlzSZ9s/ss0ACirCBd/XN9GpeXBqv06zyDgVSucp4inj6C7IsQ5a9w3y17k5LqzNWO0UX23sEgdQ1s7mHAqk+S2cSnzsQSJ0zwgMFktIB52rHnC+QTp4jmf3TmNHcD4EUWvZDmfB4ni1NtbZlW1Ea4o92IJB6rrL1EUgNPzhJscxVsVS8rzrkqGvVe0sCydsnt9RFH79uq0/jtR527GwPXyiQ9k0gDfHJnTY4skB65JObj5XDFEhOBtPsIHaSJtv7Gn8/gBA7E+rpd+UM5JCjjHcvkOzlLJ13D4FUDjRu8V/rqVFdeR8okHwG5KN3pnpamyF1/ULslGeGF5j999a+J6lvZzxGuQ0WSCLvL65wd6t2utKu3uAmeVEfLDxqiJ3O0BA71zSJ90SXmN8bbMGzzE1sL8TOBXcf4NpfVA/4iOz8HOndbzUhVLStBDc3CU6cBo1DQ+yU/Wq9fbLFR/T169Y8mK71sGMPe7D7RbtYcHrXUQmkpu1sTyD5+2R3GxwrxI5skwMUSC4HMairOV3HlY6ZJpcjnWV6HkkgeR/SoG5wLPIqN1QW18kNhPoxndWG1X57kLYvkGobHpX89xNIKBzvyStMf3rpsWowokDyqYuxOtNaOaoHLTgcdOFySEPJJ8ySF3g9/ZfhdKGhnfEI5TaCQKrSazkgoHHs67YFkiJY40vcKpuOy4MAGuFu2iEN5VG+4kRJ5+d1zyCbZ06H+qOh/nUsf+gyKJUTWvpxzXLzdvNo/bLvNM56ux1sZN5crh6v3Dw0qTr8I8dmmRXlMMgn2wVSL79ePsRFIPm0Cx/fYjp0o8chDUchkNxtZ5sCydcn97Hj7nY03KeRfhygQHI7ylvtRLd/WIMyq6mvyhjS1Px2i+dHHdUVNLHPymfT6RjHfNeEZ9vz9JOGGowskGrhD0UYYOOY79Z8DRBIFmfqnvehAgnudTFWZ2o75luZBW3Wp+sx37USMA/uauXYtzMeodwcbbHdJiyHe+T6ISDqv29XINn2Ico8xelfysC8pV2VvtH1eS1pKgf0lvYwyB9hu/7V2R+6+IC2dtQ8kbBIm37AifJO50GWx/HExmiPU5xf/YzX4RCfbKqLAX69rT4N9uDVLpztwVKf4RmS1xNL+zSk/SgEko/tbFMg+fpkdxv0akceNtRYYSO9OTyBpDQap3Aj3dC2gHuog3QCr5Ddr/sLJMOsklcHDrh/ALZxXYgoSTFbaiXf+IiZ5boGYwuk5izT/2fcECxn+qSTiTG9eY/F/Ko9jMVJILnGA29BIBWZ666LsTrTSYrFvfIRPv1jr6YyLP4Vm+Ws/jE9w73KU4TjN7WPETrjoeXmaIvddbdA+v214dn/8ghpGlMgAc0PYrbUVaMMTR9IdHleW5ocQo56+yNgFP862B+6+4DGh2Jtvrx8ftOW8uU1vncN1QPg/oFLrZ3L1S7DINXPJ9sOaejp18sHmOrTtoozpF3Y7KFZXr0+FHsMAsnVdrYqkODnk+FugyIxAz4Ua7IhCqQxOTyBRMi+8pRihXeeV5/9K4SQnfOU/B8h24LtaG+gQCJkFOSH6R7jA8WPwI6duDw6lbNihDwmcoZa35tarbKwjRLSBdvRIUCBRMggtCNfO/ahHQ07EUj6Uca7OHCFENJK2ymyO/72ICEHC9vR3kOBRMgglBMT1dNojp0drSBVh62oJzsRQh6T5r4n014zQkgbbEf7DQUSIYQQQgghhAgokAghhBBCCCFEQIFECCGEEEIIIQIKJEIIIYQQQggRUCARQgghhBBCiIACiRBCCCGEEEIEFEiEEEIIIYQQIqBAIoQQQgghhBABBRIhhBBCCCGECCiQCCGEEEIIIURAgUQIIYQQQgghAgokQgghhBBCCBFQIBFCCCGEEEKIgAKJEEIIIYQQQgQUSIQQQgghhBAioEAihBBCCCGEEAEFEiGEEEIIIYQIKJAIIYQQQgghRECBRAghhBBCCCECCiRCCCGEEEIIERyoQPovsvgEQRBYfqeIpxnmq4cdpukTZsmzljQFCIIQk3SBfIepenQ2S9xOY4RO+f+GzeZr+X/5MsUkCBAmM6x3kdZDIf+CzZexrOgrlul3CILvkC6/dl++Q8as/6dhS/tblzth1HahPVq3n3yBdBIimKRY5sBelP0W89/9Ppn/Z0hmn7b8Xr3sPW5dppgcVD+cY7P8HdP4VIwhnmjbJuQROFKBJH7hK2T3uxJJFEhNZKcp89/SeW7+Qho/q5XP0xjU+pBjs7hGHI7ZSe7BwM4CBZIv+1uX22Ub7UJ7w14LpO3nv/t9FEhbQea1HNNcYLY+iJQTcvAct0DaqSMUAokOTEGWSbdQNXVcT2NQ68M2BmH7O6hm/fuyv3W5XR4h33slkHb9btP7KJC2wnqGJAwQnme4P4gEE3I8HLxAOpnO8U37a766xUUkZl3iDKudpIkCqYl7mVAguUCBRNrY37rcLhRIFEiOtx6qQKIPJGTnHLlA2vMVpHyFeTZFHMoVrwmS6zus5O3rGZLQlIcc6/e/4b3+nnyBdHKCaHqHDQDgAat5psQvh4iSN9reLNGxhRe4XfwHl/FpcV35DGPCsVm+x025tyhAECVIZ8vyHjm4ra3oGTu0HOvZRfUcJc66GiDf4l6Nww5jTLN5VU6SzRKzG6080xmWm7x5XZogCjqucyo/SwmVHfGfWNxeVmnqnXZDCGfXACFfYf72Ckmkhmjo728Odoq0P0Ny+wF3l6KOo0vMRVry1RyZVvfX81WznTm9v8p/tVftFPHlH7hfqALpM+bTF5b2Vdmwre3ZQ6SuMF+oMf5++xddyqKyhb+xVuw4jH/G3eoBwANWdz+XdR/Gl7hdri33Z1V5Nt5lGyivsZz9qtlxiln5jhyb+SUiy+C2tIfZp8F5KfDwS8F3SOcfFNsIEMZTZGW+PdrFAH+6HjXEbof57+pjlLyEyTssyrp7gen8syHttvepAul/sVR8Xj29ymtd/YiOUSA9YDX/DWkyUdLWbMu2tmRLo1OfItPT8D9N0djlW5v32iJiutq08gxr326yQ/0ZcLMhQo6QgxdIrT+j49kWngIp/4js/NSY7mo5XTg4vcPPPyI7f9bo6AvnKzvoB9xnrzThYdqbJZ3oS8Rn1SDxPPto6ahk/Lk5pDG6uMUqH1kgncU4a7xPS+PmL6SxuTyD6EfMZCfpVO7wKD9L9YqO+Hn03PCMPmn3FUhCUBjbhtrR2gTSKc7il9WgTJRNfp/h3Fj3us24vh/A5g5TVURJW4rPECmD0uLdBtssB3j2WVarQHoeITLkxyWkxbUspC1Er1832k14foPF3aUi1pt123Z/EExwMbu31iWwxiI9N9uxeq9oF81818Xn0Lx4+6XgGaLI4OvLa33aRX9/Ot4epB3m39XXyfaj+lmrj+sSSHW/YfOZ7n7EQKPspcA3Pa9vW4JHn+IrkMy+tU6bQHJs0619u6MdOveXhBwfxyuQwhjT22XLKsjYdB3SoM7OSucUIkqyajYqX2F+nSBSOomiI6l3uqX4qHX0hTNsDGSjC2TljNADVvM3SKKwKcKCAGF8jUWXoCw3jaqzSOpJO2o+xwmxkysKxbsesJr9WHSGjcGJNhOrrEqUg2zZQQohV7zoHrOLSW1w415+bfkJtHIalnafWeoyn6p9QVldbRnYlWkPz5EuFMlRdpYTJNmiWi1c3eE6mdQ6Vv/3nyKe/i6uzbFRZ3fL/At70ga49YmB9vpoDHC1cq9WnzvK2Lssgvq1pc0VvuryTsxel4MyQ33o7UDO9pcTQS11WZudX1cz/GXblBMVWr7FKopsl4Pz0sMv1dJevqtd5Furra8/HUkg7S7/7n1M1RZOEad/OfSZbSF2mg2Y0uvRdsyFqJW9/P9amarvNrUlzS/LttTHL3sLJINvtWEIsXNv0y19u3hura5K4SXrysOGCDlCjlcgyQGFk8MfAw+B1BpDrQ8CP2GWPNc6wzNMrn7F1eSs6qDWMyShfEdbZ60PhPxix8uBryEET3b+jQHt2HuQ9A6p7CANK4ayM5bXyo4hSpBmGbK3hnAvr/Jry8/Iae+11+ABq/k7ZFmGLPtFCVO0P9OW9tb4fWv4Usf7rW2hmhVuDg7U/IuVqo5wQ+sA12FQY3+eW1mYy1Pakf4M+e/NQVVzhUwOYGztXv6/KVxKv1eWyYmSHlkHXbbhmpdx/FIzDT7too8/HUsg7TD/Pn2MtS3Y8NuDpKe3nx9RH2jPW76a422WIcsyJQTcpS1pefLxyz0EkvOeooZA8mnTtjqxtVcNr3EKIcfHwQsk0x4kbBbIZCzyzg5N8Aixk4P01hWwamZ3M79EVOvMzpAuPxcde7pALh1eTVR1HTne5URNNAdv9T/rDnVHAql1I6vemZvDE8J4iptyD5VP+bnnZ3jaPfc5yNWqVvtyFUimUEhD2EV5j+P72/Jv+psMBZP/5jKgMuXJ2vm7tAe/sjDbgq9AMuex/je9LtvbX/O5YoBVXt8cBA3LSx+/1LT1YQKpjz8dSyDtMP8+fcxOBZKvHzFVYbPt1g5mavHV9rak2aqPX96pQPJp07Y6cezzvcYphBwfxymQAHybT3ESBI6d5hiMLJAas4FnSJdfap17vkwxCS8wW/+jzYr6fJPpqQkkQK5q1A6ZCIoVxyJkYPg3rR5bIFWhHDGmN8WMavZ2jtU3vTMfVyAFqm26vN9XIMl0hBeYrb85reYZ87QDgVQvi0MQSKivnBjE5/YFki0vLXXpu7Lq7U93KZBGyr9PH7OHAql1ZcIWYhecIp7+Ilar32G+WlsECgXSaALpyZ2YSZ4SxymQ1BWkfRRI3seUPuA++wEv0ve4VTvufIF08hzJzRskJ+p7fQYMTyzEzoR6UlFtw3F/23EWSFsJsWu5row9HznEru/7W/LfXv/Pkcz+dg7zGFcg+ZTFWALJISxoaIid8swwucV/DeJzWF76+KUtCCRvf7qLELuR8+/Tx+xTiJ0LWt7sz5OCtCmQmv3XNkLsbO8/hhA7Qo6fgxdInb+dNW6fU+ykI1M3phf/LjfrNtJdzuaYN8Y2BrNSrOhHBsuNsD33ID3GIQ2dAsn7kAZ1s7tIvziZr35imkv5uednaNr9BZK6CVqto34CqRoYaAeglJt29ZlLl/ebNgLbDmmo6ms9u8DJ65/wU23PjJ2xBZJ7WYwnkOrlqWzKdjlwo3NDt8J6huTkFaY/vbQciDEgL95+aRsCCf7+dORDGraff48+ZscCyaftmAvRLJBqBwnUPhswpC25+GUphNQ9z2ssswsRYjymQPJp0y2+zHhIg35YRY9xCiFHxJELJNu3HLaB5zHfbUeIGk+4MW9Gt5/g1XYUqOrIPQUS3I759i4TdTlfnGLkLpA6ytPxmO+6vbiWn6WUnAWSR9q18JS2k/Tsx+jKMu4hkFrrvn5Skvv7bfk/RZy8ahzS0LQXt0Hx6ALJpyxGCrEzH02s2qxp4Op6JLCKHPA17XdoXvz9kotAcG8XFX7+dLxjvneYf9c+xlsgmd7nc6iEe9sxv14PsWvz6SaB4tKWOsqvxS9XZfw9rq5+cFwNtmAM9fM85tvoy1qO+VbLwXmcUpUBP2pLjoWjFUjWD79tjTE+FGv5UJu8fHmN700D7u+vLbM4+ofggsYHXf0FElDM8M/qH+VrPBfwK5PmjJuXQALcPwDbuM5W7i7lZykhH4HklXbXA0iUWT6lTdzMPmBeq28fgSSyoH/g0ZhW1/eb8m/6UKyGFEiOM5jjCyT3shhvD9IH3Jcf8mz5MKTxQ7GpUhftfqYSSLbB+RCBBPj5JReBgF4H8/j40/EE0o7z79LHeAsk0/u+eAgkmTQXP2LAeEiDXIGTg/cY05v3WMyvLOF9+odiTR80hsdHxettrHjeZ49wWQvWvVAubbrLlzXt0DhuchqnUCCR4+NABRIh5CkzeB/DAbHzvHLvASGEkCcOBRIh5LCQH4B8IkfM7lYgyePZfVaUCSGEkOOCAokQchjUjp01n6R4jOxGIGlHUJtO7yKEEEKeCBRIhJDDoDxBUTux6sjZjUCqTnALogtk1v1JhBBCyPFDgUQIIYQQQgghAgokQgghhBBCCBFQIBFCCCGEEEKIgAKJEEIIIYQQQgQUSIQQQgghhBAioEAihBBCCCGEEAEFEiGEEEIIIYQIKJAIIYQQQgghRECBRAghhBBCCCECCiRCCCGEEEIIEVAgEUIIIYQQQoiAAokQQgghhBBCBBRIhBBCCCGEECKgQCKEEEIIIYQQAQUSIYQQQgghhAgokAghhBBCCCFEQIFECCGEEEIIIQIKJEIIIYQQQggRUCARQgghhBBCiIACiRBCCCGEEEIEhy+QNkvMbqaIwwBBIH5RgvTtHKt8R2nIF0gnYfX+tt8kxTL/imX6HYLgGZLZpx0lcvfkyxSTIECYzLAGqnKapFjmACDL4Tuky68tD9LvOwJknsILzNbHkqkdsLVy+4bNprLBhu0+KRzb5V6RY7P8HdP4VPhaS9qP0ZfU8Ohb9t4HHUg/ufflOAaH6BPGpN4/kKfBAQukHJvFdV0Yab8wvsZiswOHRYFkhAKphSfRqW6BbZTb5i+k8TNM0gXkEymQDmwwpPtgm30coy+pQYG0c/a+HMfgAH3CWBj6B/I0OFiBlN9nOG8RR8UvRDS9w2b3qcN6doHQ6tgPxPGPDQUS2UMKMRRSIJUc4GBoPUMSBgjPM9y3+Qj6koq9H9g/0X5yLzlAnzASpv6BPA0OVCB9xnz6ohJByRvMVw/ib2ssby+rlaVHcf4USEYokMgeQoGkc4CDISmQuuqLvqSCAok4c4A+YSQokJ4uhymQRGcYBLYZwwfcZwnOp7/g7Xz1CEbtI5D+tybowniKzJDmfDVHNo0RKvusrrXriob8DMntB9xdimujS8xFmKHLMxqsZ0hCk3PIsX7/G97rHWu+QDo5QTS9w3obIXbrBbJkIsRvjGlm2GuWrzDP1H1pEyTXd8570vLVHG/TBFEtXFOrlzJNV5gv1L0Pp4inmSLYO/JUDk6Usph/wK1STz42kc6W5YrpaPaQrzB/e4UkUkOYTGW/xnKWKteFiJIUs2VzyNrLFkcqN+Vhop2qq86FLVYC6Rb36t6W0W3OI/3WAW1zIFl16n9jraQ/jH/G3eoBwANWdz8rfucSt2U9qe3yHyyzC9EW7LY9hn8ys8Zy9qvSvnSbkmmtRw5YBzNGgZRjs3yPG2tbknZi8lOf8D77syHKiry+wHT+2Z41m1+z2Y5TO7SJirXWz/yMu/sPHQJphHw39ghPkKQzLNU6F+UQJu+wKG3yBabz/9eQFyW0PrpApviWwTa4WWJW8/uGtJoY1Sepz3XwKTUbWlbvCmNc3hXvyVd/4FL1X7d6HyH9RFbZVqPsbH11V/vMsZlfIrKMhcr6mH0anJeq2FztIMQk/ROL2oS62p7s/QN5GhykQJKDl/2dWXIVSKc4i19qDTBAEL5Cdl8NQuzhhKc4zz5qs971Z0oB6foMa1r1Gdf8I7LzZlxukQZ9kDmSQIpeISkdsRJGeXFbdRr5R2Tn+jVtYlpjc4epOgCxOUeZpucRIkO5Oof6NDrVZ4iik+a7e9jEOPagrtY2Q1ir+n/AffaqacsD7Hkb5aY9rFsgncU4a6RVS+cgm/NIfw+BFL1+3dinGZ7fsFbAHQAAFOpJREFUYHF3WZsACILA0C4neJ2cNes0+hGz1bj+ycwai/TcbFPBBBeze+SDBVLbXlbFt4iJn4a/u89wHur+y+IzbWlx8WvO7dAkkCz3RmeIo44VpCH53vyFtJEvgw1JgaS2tfAVsvu1lhdVHI1sg98GtOFRfZJ8pmN62mwofIVs8R9Df1bVW5ufqNqYaldqnbu0zyovzXIUz5TlNjAv/nYQ4nn03JB+eS0F0lPnIAXSt/kUJ3ttrK4CKajNjiC/x+xiUu/wSkc5QZItqpmf1R2uk0nN2ZbCMTxHulDm9jyeYcyNoTMs31UbBBT5KgfhYwskLZyymk2S98tBeogoyaqZv3yF+XWCyFUMauUEPGA1+xFRrV5sabrFRRS656nRqQb1GS+TTeATZskzBMEp4ss/ytmucvAgyncMeyg7ULU81XzKuiw7N3XgYiq3YbY4rNwsj2wJsauXscyPavdj2ZxD+r0FUlAv5/KZmt8pB7LSZm1pWolZ95H9U2u9aGlQV0LUcugbYle2Y3V2Xj0RT5apqGeDv2vYWL5AOnnmLvYDdWVP9WvVSoxzO2yxhdoq4UZdiW8Lseub7+qaWgj8ploZaPQLwSni9C/F76p5+af0b43Dl0awwbJ8a5Ntsr1s05e3lLmLT6n1Q/JaxU/V/JcUNNX7rX5OruSVK7zNvtq9fVpWInXxPTAvveyg1u5N/t3cP5CnwYELpAjT+e6PYOim/x4kXVS0Nk4t/M22b8LnGWY+YZY812YpzzC5+hVXk7PK6a1nSEJDxzyWQDJ05LW8te4vEKLCde9BvsL8bYYsy5ApISKNvDgMVt3y5G4TZYhpR17GtYcHrObvivLIflFCzmT6pWibIElvkGXvzKFYQ21xSLm1lpPjHiT9/YNtziP9PQRSPf3SL+llrPurFhvW8juGf2ovF1OYmhxAKunrKZDKgbHhMB85G11vd/oq8hmusn9joqxIrWcXCF329bT5Nf3dSt7b26Fedy0+Vq6Wd6W1T77LCRNDCKUcyOrXWu36FPFPP5rFEUayQelTowRpliHz+UzI2D7Jx6fYys7WR2jtxJ4evY3pduTZPhsrkTL0zhCVMSgvA+3AkAYKpKfLQQqk4wmx63KgpiVew5J7q7Pze4YtP5v5JaKaUz5DuvxcCKV0US1HN2ZetnzMt+oklb1p1l/XYECdZW8rJ2uahgqkZlmYRbPrwH+oPagzeG3laQlVCmNMb96L2cARbHFAubWXU0+BNNjmPNLfaw+SSQi5CiTz3pNZ8kyk4dsI/smG+p5m2TXy10sgdfjpRhv/jPn0ZX2QNUmx/Cb94Vc0J5PkxIFaJoY9F3oWG39zbYe6LbSVY3sZV/TId2t9aPbVaddqPvUV5jH6SMAWLhbGU9zMmvtcjHU1lk/y8Sk2GxpBVNT/pufJs31K0aRPqKnpG5SXPnZgyDcFElE4SIHUfUhDjvXsX5gkV8i6nNtW2K1A0kOq+gyI3eLlz5Auv9TEUr5MMQkvMFv/ow0M9lQgtb6r6pDDeIqbrFhBejtf4VtnXrrr1pinPRVIzTC9GNMbsaL2do7VN/OgJl/N8Vb/cHPZTkewxUMUSE42d7wCqd0/2dhHgaSIg1wVDSK0uPRBarmNI5Dc2+E2BFKPfI8skML437jN/h9EjT5/jD5SUqzO1Q7rCAJ07o18DIGkl93eCyT5bmGXpmiBHQikzpVvCiSicJgCqdbp6Ccracd8P8o+pR2F2Olv7RNS5cwD7rMf8CJ9j1tVCOULpJPnSG7eIDnRBsujH9LQDNdwD7FzwHp/5Xz3QSBtNcSuRkv9yDS0Dq7UE47Uww8G2OK+CaShNjeKQJL+cGyBZAif8Qmx0zj4EDsARXjYOdK732qCoJgoSnBzk+DE9Wh419Bhr3ZoC7FrqUuncEDPfI8aYifzIg+bMG+4H90G1RP4djlp4+NTRhFIpvTYQup6htgpzwyTW/zXuidpO2KvUWwUSMSBAxVIcPxQrOPJZeOnbjSBVHUm2pGW5YZNl7ha92e0Us5sqY5NmeUzDsTHPqQhK8O1qo3U+iENp4invyubmR+wmr8pjjB16ehqx8dqx+Pug0AyHtKAxqEVw+3BdGiFWu7NUA91szmA6gCA8rqBtrhvAmmozfWt93Iz+1o5hntsgRTU20K5wd6wMXqIf2qtl2BPDmnQy0obsJXP8Qj7dvZrHu3QtJoo+8paXboe0tA33z0OaXDZz1num1JPdxxug8W/1/0plLDh3Yb9eviUkQRS3baUNtbSV3u1T/X9J68w/eml4WTcYXnxtwMKJNLOwQok1XlZxZE+WNth2kYTSB35VDet2p2v+zPaETN4mqMq3usxAz72Md/q7G/b0bKdp2e1HFUty2ovBFLbBEFVHmPYQ+dEREMotKdpsC1uQSDVQlrEwMtnE+8wm/NJvyWMJPweV1c/1PzNOALJdsy3uiowhn+yVozbMcJKHfp/KNbxmG+VzR2mkX70tePR3qa0OPg193Zo8j+2/TWv8drlkIa++fY85tvtwBu5ub+fT+mcNDKWr+P3rMb0Sa4+ZaRVF/Mx32q+BxzzXUNO8rSIk74CydsO3ASSqX8wrdqT4+OABZKg8SG6oDiJxucUmtEZUyCJf9c/fmb4iF2X83V5RmfOltf43uRUvr9udJBb2YOkfyjW8KG45gf27B8sbb5LzjbJe08RT3/FbPGnY2jVbgRSkVStPrWPRo5jD8qsZdnRTHEz+4C5YSBW/1Bs0Ph4rd+7t1NuTZqrMF4CqchQT5vzTX+9jIujmz83/M14e5D0D8X+bqyjMfyTGcePD/cWSEX+N8sZ0mTSabcFX7FM/2WoL4NvdEzL4l75AKbx3a7t0OZ/dLtx+VDsCPl2+fiql0ACqlC7unAZbIONtDq24a34JLj5lNHC0j7gvvxIrynftjy5fxy8QAoLQ58/WCDJYnO1A0eBZFylp0B6Chy+QCKEEEIOjcH71wgZxs7Dx2jz5ICgQCKEEEJ2DQeL5JHZrUCSR9Vz1YUcBhRIhBBCyK6hQCKPzG4EknbUvelkQ0L2EAokQgghZNdQIJFHZjcCyXIqJiF7DgUSIYQQQgghhAgokAghhBBCCCFEQIFECCGEEEIIIQIKJEIIIYQQQggRUCARQgghhBBCiIACiRBCCCGEEEIEFEiEEEIIIYQQIqBAIoQQQgghhBABBRIhhBBCCCGECCiQCCGEEEIIIURAgUQIIYQQQgghAgokQgghhBBCCBFQIBFCCCGEEEKIgAKJEEIIIYQQQgQUSIQQQgghhBAioEAihBBCCCGEEAEFEiGEEEIIIYQIKJAIIYQQQgghRECBRAghhBBCCCECCiRCCCGEEEIIERymQPo2x/QkQBCYfiGi5Apv5yvkj5C0fDXH25sp4lBJU5QgfTvH6jESNAb5AukkRDBJsTzUPHSQL1NMggBhMsO69UJRFuEFZuv9LAznvBwijfL/imX6HYLgO6TLr8UlyxSTIMQkXdh9wAHZdL7Z4Ev5P9uwP1mGz5DMPg24v6oDZw6oHgghhDwdjlAgyd8p4vQvbHaYrPw+w3loT1MYX2OxOcBRwBMYxFAgHQhPSiCtsUjPEapppEAihBBCts4RC6QAQfAC0/nnHSXqE2bJMwTBBMn1XX21aLPE7TRG2DVo21c4iKmgQNozjlggmdJ4APbnxSHUAyGEkCfHwQukk+kc39S/lWJErNrsapC4niEJW953yAOBQ0772BzAAJUCiQLpYDiEeiCEEPLkOD6BBAD4jPn0RbGKtKuBRN+OfrPErLZnaYIknWGphuKpz14rAjCMcXlX7LXKV3/gMj4VeY4xvV02wgvz1RyZIh6DKMG1y14tW9660r6eIQlNA9Uc6/e/4b1eL/kC6eQE0fSuJTRSHRD/g2V2gajce/YG89WDdv0DVvPfkCaTevjlNKtdaxYVayxvL8v8hfHPuLv/0DFAzbGeXSA0hht9wvvsz4ZoKd6trnausZz9iqmszyBElKSYLdU7RTmEF7hd/EfUfYhoeoe1KS+bv5DGp0UdZYuqfPMV5plWh/oKqKj/MHmHxd3P4lqZ3jWWsxRJFLakVUestprayvpPZO/1MC+R1+gS8/Xf2w2xc2mP8ro0EbbXch0esJpnWl2a7FQvh2LCRd1bOUkXyFWBdL9QJoOaNu3+fj3Ezm5b5nZpCbHz9m0LZLKdhjGm2QHv2ySEEHLQHKlAAr7NpzgJgn5x8b14wH32CmEQIIynuMnedQ+CykGrITww+hEzeb8cRESvkOjXh6+QLf6DaTlAlb96vu37o05xnn1sF0mmwaRT2sXASR+E5h+RnT9rDGCLgW1XfcnB2ASvk7NK7JnKDTk280tlEKv9lHQ1BZIismvPP0McdczgC6HXyN99hvNQz59eRmLfiTHNE1zM7sUz5SD2JeKz01pdftPzooij6n5ZD+Y6DM8z3GurFuFZjDNpQ+ErZPeb0uYbzwhfIbu327+5rkUbatiLUp7b3IPk3B4dy03xCb7l0y2Q1Hof+n6bQGralrk8DQJpDN8WhIgubimSCCGE7JyjFUhYZYiDAEEQYTrf1VEND1iVM+zKoCWe4iZ7r80uy0GFNqOrhAiWA1w5iAhCREkmnvOA1exHMfg/RXz5hxhIyAG2MkAsB3T11YN8dYfrZNI9WGsMJt3TbhIFUozUhVPxzPoAz4R8d30FDfkKd5fFPq9yprscfF0gU1c08nvMLiaGQbWSbvn/8SVu5b0bdYa7bWXSNNCvyqw2cM8XSCfPysFnWTa11T1lJashDJqHf9TyIgeq4TnShbqqIwfPqk0V5Ti/ThCpA+LS/rSDT8ryVUWptMsugWIQyeV7DPYibXRrAsnDpsXza4N3k03JSYma/T1gNX+DJAq7bb0txE6uaIp05qtbXERhz/dbBJLBtszoddDXt1XXViviu5rgIoQQQiookLZCjs3yPbIsw40a0qYOUsvB5SXm+gBECho5CLTtO5CzzPqMu7YfqnXAaA2DU9OjDdR80o5PmCXPled/xTI9w+TqV1xNzqrBz3qGJHQ5RavlxK3Gu5U/reZ4m2VanVTPqAukllO5NnfFal1X6OZ6hkQVhvkC6eQMV9m/MSnrS4TjNQb7psNFpKDRB7HNcqjE3Y/4ySiOYB58l2ghcNZ9L8rBJOkNMpdV0yoBRd71VbzJv5FdnSn2UryjMaAeWyD52LRsd1GCNMuQGY/wbzvZrS0MsyWNxvzr79Ptw+X9tntdT7XT3jWGb4NjPRJCCCFb4GgFUhVi9xgCSSfHZpkV+zTkYKf1UAfLgMMihNoFkhwMWcLM5CpX24Z+/f0+aZdhbrWB6BnS5edCKKUL5I3Bshx4q2l0GfgZBsvlzLop3zaBJN5vFEFtf1P5jPn0ZTm4Kwb/KZbfZP6/oike259dHzB2C6TWMMpGCJcpDKtrEJtjs7hurJgGYYzpjb5iamBzh2l0pgzSC3v4JsuqtDVdaG5BIHnZtDkMMoynuJnJvX8mG7bbn1MajfnX0yif6fP+kQXSGL4NXXVCCCGEbI8jFUi7PqRBipC2AcUWBhEjCqTWwyUGDSahiKIvNbFUhE5dYLb+xywUhgokNTRs+guyLBOrHOvGAHB8gaSIolwVSyKUMJlhrQ/+xxZIYYzL2xv8FIXNMEoXgaSXoy1dpo8jN/bDmKhEUa6KpXyBdPIcyeyfxirTfggkoAhVe1dfIa6JUReB0mOf1KgCyWZLFEiEEEKeNscnkMo9FA4rIyPSfbTyCGEovQTSCKEqg0LsgCI87Ae8SN/jVhVCciB88wbJiauQbQuxq6fTnm85eOwKsTOEuvkcs5x/RHZ+jvTut5oQKoRhgpubBCc1exk5xE4IZHlQhengBadTF72OllZP4OveP5LfZzh/cYW7W1UISRH5BjfJi3r+9iHEzoR6YtskxTIf8PFUWxqN+Zf4hNjp7EGIneFahtgRQgh5LA5eILX/dvih2PIgBMMxx+qRwD02hQ8VSNWgRDv+uxST29vQ3khrbcCmbAZ3FrLKIQ3q5nPDx3jLzfTqIQS172TZBJJlg7vzIQ1lwVWrd8aN9i2rP86HNHQJJKBaUVVD7aTgOkU8/V0Jh6s28XfuQZKn2ymHBRTlJA+GcCkjKVbrNlitgpnf+fiHNKgHowBquKFuQ7WDPoDqcJSt7kHyef/IAmnwATQ5NsvfnUU2IYQQMjZHLJC0E7d2QPt+l6C5Wd73KNy+Asm2V6TcO9FxUtWQI5FLxCBdS6vb0d4qXcd8KzPRLccxt+9BAuz7TF7jtcshDZLNHaaRfuS35fjzlvcWP8Mx304CCdXhEmr5tNWh6UCRRp5bjpFu/W5OLbVihUuzActR6dsTSB3l4XjMd6B9z8pely7+SQ2TE+LWQyC5v39sgeRTlh3HfNdsqLnySwghhGyDIxRIIaLkCm9dPoC6DTZLzLIr5cOZxcA2SX8zn/Dl8sHJwQJJPEb/UKz145Yatvc7fyxTPGZ5je9NA97vrz0+rqsMxhb/RxztbX93NVsuB/7FAQKL+ZX5WG/9Q7HKR1DdPhRrSu+/GgLQWBaW97Z+KNZVIJVCRBt0Nj4Ua3hXa4idntZi9SudNT9UbMVoA+Zy26pAAtxtunGd7QO5+odafcpHOdxF1qeXQHJ9/xYEkmtZqvWgfyi28bFrCiRCCCG74TAFEnnCjLC3gxAyImyThBBCjgsKJHJgcDBGyH4h97ixTRJCCDkOKJDIgUGBRMi+UPvm1k4+qUAIIYRsHwokcmBQIBGyHygnSoYxLu8ead8nIYQQMjIUSIQQQgghhBAioEAihBBCCCGEEAEFEiGEEEIIIYQIKJAIIYQQQgghRECBRAghhBBCCCECCiRCCCGEEEIIEVAgEUIIIYQQQoiAAokQQgghhBBCBBRIhBBCCCGEECKgQCKEEEIIIYQQAQUSIYQQQgghhAgokAghhBBCCCFEQIFECCGEEEIIIQIKJEIIIYQQQggRUCARQgghhBBCiIACiRBCCCGEEEIEFEiEEEIIIYQQIqBAIoQQQgghhBABBRIhhBBCCCGECCiQCCGEEEIIIURAgUQIIYQQQgghAgokQgghhBBCCBFQIBFCCCGEEEKIgAKJEEIIIYQQQgQUSIQQQgghhBAioEAihBBCCCGEEMH/DwAzxNzU1llXAAAAAElFTkSuQmCC" width="400" /> </span><br />
<span style="font-size: large;">The answer is (D). There will be an expansion in the supply of labour and at the same time contraction in the demand for labour. This results in rising unemployment especially among the low-skilled</span><br />
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<span style="font-size: large;"><img alt="" height="279" 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CTAiX88h0wv9ZOfm2mniX+khamTmWUF8k3NLx9ls/Ttz96UtXRq0LK0T2bSFuOcLaVeCqycFr6B83Nee76++dp+PyHTfB/j1KpYan3s7/3ZsvBUryYXTMuXmG+GHc83/8e89JBZ3D2Fv5CpxTCR/LY6fvCIx/q/fCEz537PKH85k8/kKWeB1smmei47+Z7LBDaOE/+YJi/K0/Lo3hvP67Wo1JBZyv1rnjrKw/27c4EootWfiX/sCofMuZEOJQt1FwlUgCHTbXyL0fXIYaIS+7Y4j495XK3Pb8h/05pnSvNlOQXc5xImTvvuOrW522cE25KZ9/uNp3W+xnD5nRLaZcKABbeZ6vJM9e3y9M7C3EUqE6p8DX53HMNqfF6hGU9L/Q3z7XsJIVNON0x+zkFzt8JCMzo6lUu/U6577S7r43i5qfgSJi5jplu/7W3iH6ffxs9DI8/1kxzPLTfun7tUBt1/a+9ls/Ttz/dbmW8eS6mXSi2nPm7gfJ3XXq9vfrbf2n10MbDlaaHI3jC7HIOS6mMf77fMLGuU6z85zDDrVBf6KK9BdJct4Z7Cqbzk/l7m73d+SOyufN1lnZcwMf82+VrCylEnu3SVrtuhgwefs90r5zuHTPvg6f7F/xImRR/7ku9ffdRRDvfvzhvlZ/wyS5i4KBQy5zTVuyNzoHaod2quPJthEWTIzPx3++LFyzaotet44UkUMtuTGj+urux0686LuTpP/GM8pV6WfW/H0WFdGDnosJ1eFqsuMPGP8dQ0e9Hp0NHjYxrx1A2m1O6ytuPkdJx9BZbMMfGzKPnCBXXtOOxQIbzs8oDE/vnL8ix67/Be2xMx3zOs5Sze7XXx3iAm/jGefpsubh3v6PiFXzt3YfP8mzndMHk9B/20rrmVS4dy6Lp4tJ+Jfzwer3wsPRkWz8/ewS49nzM2x9s+LPJxjqTGdTy7yL3Lwt/uByD3t/FVNrzWT5l98vq0WQ5ly7aAd6Hf2lvZDGL77Yuku/2uJdRLJZVTPzdwfo5dZp8KXt98bn/OMiif5Lk+eugiV3R97PX9pm6y9gdo9rUy89SFXo55YBP/FHlP4fj9jsvWGNyuXW7KOSZzTJNGy59jGShUlspRJ1s/c7FHxJ9c7pVz65m6lg71jlh7mXm7f/FzPS1x4p+S7l/dyry3+3dHvs6VzDH1c78aMWUKmYi0ksfuAYiyapkUAAgc1zcYIlAWqItRywiZsWW03FrHFZmfNIUzqy+A8jBaXW1jlrNP9qM/KQBQHK5vKMRYvqKy9SAhE7WMkBln+aZALzAmCUDU5V9+oNByOUBV4/oGR7alfZzWCw0RIRO1jJAZc7njLBrV0tGrkSkuwED1cxiPZxs7CMQV1zfkWloX1TqjcGUQMlHLCJkAAAAAgMAQMgEAAAAAgSFkAgAAAAACQ8gEAAAAAASGkFkW7ovqLqRS+iT7f7wuKFslFj5R6pMq2A/72lmuv8OcUqmlhXkLLb4eHtPEBgX/FhcXjs62Vz/LOezIfWHn8JVpW1LjGsxOuMKkFmVhqU8LLdReTuX77oWpEfVnF403L5ZuXZTd4Z1KjQ/rqGXSnzo1tR5Ub8H3AgDCQMgsC6eL8g1d6HpKdeZFgWMTMheUunBYLXVRuKn2wEvITP1WXS2rLDfP0QlqhMzKcDiHHcU9ZNrLH+txBsupPo1byDTWMHSvu+paDuuC49ITmfOwqPcCAMJCyAyLPdjESpRuqj3w8FtU3bTjmTXj3EIkITMAns/hKJ0P5diWzDp0rEVYJlEqP+WwoNRI52LArGtRx9FhjWcD4W1NjfyTulo3uKz1eluTvd9eDJhNrerqNy/VY13Oh3ViAaCyCJlhIWRGByETxSBkZhghs9p7YERVlMpPGRjnUdNf6bjrepZ/0kjHl3NbTzP13LKmTo24tVQuTOr4SxtoYQeACotxyDRfqK9qvPelTNecOjW1/thhsWaHMR5NrerKGd+xoNT48eyTVufX2boXGRdG09iRDV0XtGDrprkYBBr1VO8fcoLN4r9ZL5o5C1E3terwyJTnUFT4/caF3r5Nxn/foJeOv6/B1lXW7kqWLsFTGuntUEt2/zeo9fAZ60LxmeNQ1zqgC2feyLz2y+oY+ZMp7P1aFwY7lz7HZcF5tzE+veb9yttddk43jr9k64qVv8upt9/BS7kpgeeQOajJ8X/OPu13O46efrd8nN7fdTzbYuEaenO6LmfOpbqXNHjhV+psaVw8hzvOKJWn3Hjeh2xZOKiRC6bjYl/U3e0cdtx5t5BgbWlxqov81QGFP89fYClcBxq/m+v57vix+cuC1+9e+n6v9cENjR/vUmtTnen4dOm4eXF21yEL9i6itutJ9rsb1dJ5cvF7F6Z0ptPY/ka1dPyzaR+9Xo8yAT7n+Lp1Wb2h8ePv2MqAbR/N3z0yZhpL61A3OnL67mLrs4VM/epcxi1SZ9TRVGeqI4z3ms5xt2+Z7NVTeepDAED51UDI3KDnWx/PHb9heYpqjIFxGt9Rp6aXBrM3L8bFK/d15otmcSHTvaVk6UbbuBHyth3uPL8/9Vt1tTSausYZXZ0yN/quN0WSFv6g3qcaHb7D1pXJCAuPt+jx7E3j4vcZN5VrmtY4jMGxb+viTUm+sYnm7wsiZHo9jqX+XgV5DZnmY+y2DV5/Nzce3u8/ZD6ilscbrdubp9z4LXvL1jSpyeH3yb625JBp6uZn/zN3O/VcB3j8PM8h01sd6DtkevodfNS/nusDn8fbc8h0up406qne93Wm48s5275URrxej/yEzHxjEzfopeOTOdejpqZkgfLiJPe7i6/P/Dz0sLeY+2lBp7UdACqtBkLmMi2ra1HnmczT2uzTZiMkaelGw9LSsaBUtsUn90Zj6QIuLUwN6qUm842hww2B081jzg2OcWNkuwDbA0T2xm2DWnsvLLUyTJ3R4dYNhW8afL4/+1T4qV5N3sgEOUt3pXw31XVqau1deqK/MKWRw61qMt+MZI9/o1q6fuvQcrHM9tuYJo3IOebWfVp6remGz8PEP07dZXOCkefj6LXclMBjyLS0vDgeRx+/m6OFbEiva3lDZ4wHOcbDikITEbmFzGUOk3m4lptiyp61RSn72+R7OOEq93zI3pQ3vaTebCvTbU2N/FitTXWmwOWtDvD+eR5v6j3XgZL3G3hvZcHPd3uuDxy7ZOapCzyHTOsxXyon5n00heac+snD9cjxN3MIesaxsPScuLHUyupwDllem+1WWmhYgHvg9l+f+Ql/tuPga8gJIRMAKq0GQqbDuAwjHFi6qZov8qaXWrrdGDdNmanSe3vV79jVqNiQqczNpPmib3yn6YY133jBnPfn8v9+48a3SS0tTVqW013J4aYo7w1B5gag4BIiflq8zP82pZH+XvX29qr36FI3vaVwGEzI9H4cvZabEhQ7JtNza7qU87s5Mlpi8oca/yHT6Tx2KQOBlD2P57Aj+/mQL+jlnt+F6wA/n+ctZHqvA03HsOANvJ+y4O27vZcb47s3qLXrqHp7BxyGSDi9z+AWrOzl0G0f7cfI+/XIW8g0/r9T11Gjvi607XmOp4X9/aXUZ4RMAKgVNRAynW5wzP/2SeaC6TJJgP3Cln0Kb+0i1NLxjmkcTAkhM+dG3v7/Fxy6czp0RXO9aSjy/dlWO6ebQYdjndO90Knbmi3YuIZMhyDn9J7sk/kC+xRIyPR5HD2VmxIEFTL9/G5OPC7LU9aQWUzZc+ueGkjIdOgCmfPn0FLoWgf4+TwvIXPBXx3o9QbeU1nw993e6wOXLrj22UyLGpPpECY9h8xC1yO3BwP27cn/G1iPk/t3FxcyVUJ9FnJ32ZxzNTPcI9mhkbkCHwEAKAkh02/IlDItZd2myRbsY1tKCZm2lgjXVo0CN9GuN8JFvt803jF3XF6RIdP+hLqkkGnuVtmho7292SfsczndXMMLmf7KTQnCDJn5bhCrJWQWbB0JO2TmabnMqQP8fF6thszMf54aUf/Rjpywma3DCJnFhczFg1tEfeZ/4p/cB6xOZSWlqSnTo0+XHjlTxgRhhEwAKLsaCJl5bk5tNy7euorZmWdFtF/UiwmZyl4gmzp+rUl7VzoV6Kbpge/3Z7tz7VDX0b82Tfpj8Ntd1v75AYRM1+8zjQsLs7tsQU7lpgShdJf1osTuskZALFt3WfuGhBEyi1iSIm8d4Ofz4thd1nvItDLPxFroAZex7UGHzMLXo/J1lw04ZFo/yXt9lj3m+cJooSVMbMufGPVfS6cGL5xf7NFi+fw5TfXu0LKm59XRuoGQCQAhqIGQucw6OUZqPDOFu8PkD14n/jFP3CBpaZa/PGNg/IRM87Y7tSpmQ1+LOgZNU8ZnJzYpdJH3837jhsV48mxc/M03N/km/rFP5b80OYn3MZk+QqZlIhTTJBhlCJnej6PXclOCoEKmn9/NkctkL6YJTjZ0XdBCNkw+pa4Lxrl5Qb3GkgilhMxiyl5ZQ6YpLLV0atDUnTA7SVROAMhfB3j/vAhO/GMvCz6+2299YPleyTRbtn3spnnyqBumJUaCDpkerkdlm/gnqJBZan1mzFC+zGHpmduaGvmn7NIoub1mTLMGN7Wqq3/pvQtTJzNLHC123bW2lC4o9bvfaWohEzYJmQBQdjUQMt2mjDfPjhrEEibmz3S6MTZ3cbMuwZBvwhvnp8f5ttdhFs4c3t9vmVnW+MiUfYZZa9fR7Gsdx+0YXapM4SKQ7rJ5liwwtstHyLR0ubQsp2K+IfN/HPOXGzm05HkUWMj08bu5ybNsxdK+Onf5rHvqv+vg8z5bgJyOld+y5yVkOp3DjgfA6aY+33ITubMqm38z5zrA6+cFu4SJ5Th4KaOeyoL/JUxKqw/MraYu3d7rdujgwec8tAb6DZnerke59WkQS5gE15LpuT5zZZoR2K2+dr2OmR8C+H2/U8h06O0CAChZDYTMr6vrwkXTItlOC4FLi0/OvSwu7fC6nM90uiFYUGq8N7sweF3rcd3Id5PsofvXwtSIes2Ll7vum7OC78+21Nm7NdnXypRLK5SUuxC7nwXRfXaPy7Ygmm62O97R8Qu/zt8l1PH7c1sz3G7IvP0OXsqNohEyjWNZ6HfLJ+f9jWrp6LXO8Jka1/Eu4/cyWh2v+u9m6Has/JQ9TyHT4Rx23Hm3m/rbmhrptY5hy7eAfcE6wMvn+ela67UO9Dlzp5ey4PG7/XWXvaHx413Z38t9f6yvW2wd/pNt/F+AYzK9XI9y6tNPXM4D+z46nafl6C7rsT4rYGFqRP1drZbAWNfSoaNu58TSO5UaH1av03t7ezPddpfldqslZAJAaGojZHodBwUAQOC4HoUrM0b08HH9zpJ56S4LAGEhZAIAUFZcj6KBkAkAYSFkAgBQVlyPooGQCQBhIWQCAFBWXI8AALUlxiETAAAAABA2QiYAAAAAIDCETAAAAABAYAiZAAAAAIDAEDIBAAAAAIEhZAIAAAAAAkPIBAAAAAAEhpAJAAAAAAgMIRMAAAAAEBhCJgAAAAAgMIRMAAAAAEBgCJkAAAAAgMAQMgEAAAAAgSFkAgAAAAACQ8gEAAAAAASGkAkAAAAACAwhEwAAAAAQGEImAAAAACAwhEwAAAAAQGAImQAAAACAwBAyAQAAAACBIWQCAAAAAAJDyAQAAAAABIaQCYTs1KlTld4EAAAAoGwImUDINjc3V3oTAAAAgLIhZAIhmpycVDJRr8nJyUpvCgAAAFAWhEwgRENDQ0om6tXf11fpTQEAAADKgpAJhKht1y4lE/Vq27Wr0psCAAAAlAUhEwhRMlGf/QMAAADiiJAJhGRsbMwSMsfGxiq9SQAAAEDgCJlASN4+csQSMt8+cqTSmwQAAAAEjpAJhORb3/ymJWR+65vfrPQmAQAAAIEjZAIhmJ2dtQRM429mZqbSmwYAAAAEipAJhODUqVOOIfPUqVOV3jQA8GduSme62/XsxlVL9VnDOn2j7U29e/aq5iq9fQCAiiNkAiF46823HEPmW2++VelNAwDv7spr0hIAACAASURBVHyoozs+n6nDVmnjlq3atvVJPfqFuzNh86t69b1JgiYA1DhCJhCCzc3NjiFzc3NzpTcNADy6o6m+57QykdT9O9/ReGre9G+3dOXED/VoQ72Sy59T/9Sdim0lAKDyCJlAmc3MzDgGTONvcnKy0psIAB5c03DbWiUTG9R++obDv1/Xye8/oGRijV4cvBr61gEAooOQCZTZ0NBQ3pA5NDRU6U0EAA9u6MzeDUomVmtHz0cOXWLTuvmH9/VvI2OauHarAtsHAIgKQiZQZv19fWrbtSv7Z4RL4//39/VVehMBwIO0Zs++qU0Ni+MxH/7OXh0eOKlzl1NKV3rTAACRQsgEQmaETACoPrc0deJ1PXFf0tor455NenbvIR1jdlkAgAiZQOgImQCq3txVnRt8Rwf3fFfNxsyyiXolE6vV3P6epuZo2wSAWkbIBEJGyAQQL/NKXf53Df9kb6aF8zN6rPtDLVR6swAAFUPIBEJGyARQjdLTp/Xj/Z16reesUs6v0Ozoa1qfqFeyuVu/pzETAGoWIRMIGSETQFWaHtCzDfVKfm6fznzikiCv9Glbol7JTYc0YWnKTOvOxXf1yo7XdfL6vPN7AQCxQcgEQkbIBFCV0n9U/47VSiZW6YkDpzVtH3eZ/k+d//utWpm4S+s7RzRr/rc7E+p+YpWSiZ3qv8LUQAAQd4RMIGSETADVKa07F3v0TGZm2RVfaFFb+9+pu+8nOvzGXrVtWacViXqt2NiuE9PmIJnS+YNPav2Wx/QQIRMAagIhEwgZIRNANRgbG9Pk5KTtv84rdXFIB3Zu0irzEiaZmWUfbTuiM1duWV7/8cjr2vTAD3Ty/E+1jZAJADWBkAmEjJAJIOr6+/qUTNTrW9/8pvuL5q5pYnRUo6OjGh09r8up3LGW6Y9/o9c2bdFrI9eVvtJHyASAGkHIBEJGyAQQVbOzs3rrzbeUTNTri+vWObRk+pCe1sk9X9Wm/b/Rx2llJgUiZAJALSBkAiEjZAKIotnZWX3rm9/MtmCWFDAlaf6sDvxZ0taltl7JxCM6cPaTYDYaABBJhEwgZIRMAFEzOTmpzc3NSibq1bZrl2ZnZwu/yS9aMgGgZhAygZARMgFEydjYmL64bp2SiXq99eZb5fsiQiYA1AxCJhAyQiaAqDh16lS2ThoaGqr05gAAYoKQCYSMkAkgCswT/IyNjVV6cwAAMULIBEJGyARQSbOzs9rX3h7MDLIAADggZAIhI2QCqJSZmRnLDLJlmeAHAFDzCJlAyOzT+bv9d6cwGsRr3P6dbWFb2JbSt6Va9nlfezsBEwBQNoRMIGTGTR6tCADCcurUqewMsvYACgBA0AiZiJhpnex8Vtu2v66T1+crvTFlYW5N+NY3v6mZmZlKbxKAGOvv68vWOcZsshbzEzr6F9u1bevT+f9iXC8DAIJFyETEXFb/1nuVjPFaasbNnnlmRybeAFAO5npmYmJCkhxC5lkd+LNk3q65i3/xrZcBAMEiZCJibunaxJhGRz/Utbl0pTemLMzd1VhCAEA5zM7OWib4KfpB1s0P1L3980omGrVp/2/0cTyrZQBAwAiZKJ+5a5oYfV/nLqeU/75kXqnL5z2/bnT0vC6n8nXZ8vq6yrCPiTIvhn7q1KkKbhmAOJicnNTm5ubSx36n/49OvPpVrUgktXpHjy7eIWECALwhZCJAma6u/+VFHTz0vL7YYHSxSmrV19t17OLHSyFyblT776lX8r/sVHv7Fq1K1CuZuFtfeqNX/zOnu+wtTZ14UzvW3W3qtrVaj+7+qT6whMhbunL6H/Ss5XWN2vhit0anb4V7KPJwmnjDPCnH20eOVGjLAFS7iYmJbF3y1ptvOb7G28Q/s7rY85xWJ+q1YmO7TkzTTRYA4B0hEwEyxlPWK9mwQc++8f/p5MivNXioVRsb6pVc96qGjRsVI2Qm6pVMrNLGLVv19Ne+ppeHR21jMuc0faJdDzfUa8W6Z9TZ/XOdOPFzde99UqsTSa1+9meaSkvSvK6f/mHu6374jL7YUK8VX/9bnY1Iq6bb7I6Tk5MFbw4BwI25V0R/X5/r6wqHzHl9PPK6NjXUK3nfTnWPp4LdUABA7BEyESAjZK7Sk90TupP977P6qHuHVibu0oY3xnRbMoXMe/VE94Tmcj4jEzJvj+nA+ruUXL5D3R+Zunyl/6j+HauVTHxNB86mTK/bqaN/vGnaJuO7P6PHuj/UQtmPQWH5lhCYnJzMjqNq27WLJU4AePL2kSPZ8d2Fut3nD5lpzU0NqPWzSSUTD+nlwcuKTRvm3JTOdLfr2Y2rlnq7NKzTN9re1Ltnr8ZnPwEgAgiZCFAmIDY8q/4p6+U6PdWnHQ31Sm46pIkFmULmFh2euJn7GZmQuTBxSI8k6rVie1+mxdKwOO7y/YlrmpM0/8FBfSlRr5UvDOq6bavSl3v0RKJeyZYeXY7AkKJC69TZJ+wgaAJwMzs7q33t7b5mqs5X/6RTZ/X3LauUTHxGzQfeVyoCdWYg7nyoozs+b+k9s23rk3r0C5nhFQ1f1avvTRI0ASAghEwEKBMQ7+nUqP1KbYRK49+yIdM+Jb41ZM6NdmpVol6rOkfzXPwXdGP4FX260PT7TttVAV4WQy/mxhFAbbE/kPK65q5r/WOe6Gdnny7FZobvO5rqe04rE0ndv/MdjdvH8p/4oR5tqFdy+XPqn7rj+ikAAO8ImQhQpULmvK4Pfk8rE/Va+bUX9MPOTu13+ntrWJcj0F/WS8g0OK1xBwDmMdz72tt99Xhwrn9ME/185XWNfhyNMezBuKbhtrVKJjao/fQNh3+/rpPff0DJxBq9OHg19K0DgDgiZCJAmYC4/HsavG69Qcl2WW3u1u/T8hwys91lvzOgacsnzuv6yb/Ty3v/Xx09+yfNn31DaxP1+nTbsHJuIeauaeL96Ky76SdkStLQ0BBLnADIMs9GHcwkYeaJfp7T0Ytx66J/Q2f2blAysVo7ej5yeGCZ1s0/vK9/GxnTxLXozEQOANWMkIkAGQFxjb47MGla8/ITTRx6UivMk+94DJmaHdH+B+7K7caUvqrh3euVTDyi/aM3TK+zT/wzp+nB3bo/Ua+VOwc0HYGc6TdkSt5njQQQb8E/dDJN9NPwVf31if9TYL3iapTW7Nk3F0N0YpUe/s5eHR446WFtZgBAsQiZCJBpCZN7HtOe7l/qzMgJHTv4ojY21GvFxh/qtNHC6TVkmkLiigdf1MGBExo9/Uv1GEuYZMcN3dLUwK7F1617Vgd+dkKjo6c13L1HzfcklVz+tA5HZBr+YkKmxBInQK0rT/f5qxp8YU2m3n5I39j6tLa5/u3WUctEbdXklqZOvK4n7kvaxupv0rN7D+kYs8sCQKAImQiQERAf0rdf2KLV2Qv53fri9jd1YsrUDclzyJSU/lgXj7UvhsXsZzZq44s9+sA8gUP6Y10c3J9zE7Fi3V/o8Eh0biCKDZnSYtDc3Nxc1DgsANVpdnZWbbt2KZmo1+bm5pInArPWP6aHgwX/HtL+0Wg8rCva3FWdG3xHB/d8V83GzLKJeiUTq9Xc/p6mIjKsAgCqHSETAbJN2nPtQ70/+n5wXZLSKV0+975GRwuMm8m+bjS7xEmUlBIyJZY4AWqJee3coM73UuqfeJlX6vK/a/gnezMPJ6OznjIAVDtCJgLk0AqJHKWGTCn4lg0A0WPvIh/UA6VaC5np6dP68f5OvdZzVs7tsGnNjr6m9ebJ6QAAJSFkIkCETC+CCJkG8xgtgiYQH+Wc7KvWQqamB/RsQ72Sn9unM5+4JMgrfdqWqFdy0yFN0JQJACUjZCJAUzr2ndVKNjyvY9NxWmMtWEGGTEnq7+tjiRMgRt4+cqSs53TNhcz0H9W/Y7WSiVV64sBpTdvHXab/U+f/fqtWJu7S+s4RzWpeqQ969eq3mrVx49N6+eAvdTHFNQ0A/CBkAiELOmRK1lYPgiZQnWZnZ0PpnVBzIVNp3bnYo2cyk8Kt+EKL2tr/Tt19P9HhN/aqbcs6rUjUa8XGdp2YnlN66mf67n0PqbX7XzR6+pgObF2vTW+8L0a/A4B3hEwgZOUImZI0MTHBEidAlbJP6DUzM1PpTapazsduXqmLQzqwc5NW5cyau1qPth3RmSu3JC0odfZ/6pW/PqZLi4s660rfTiX//KA+oDETADwjZAIhK1fIlMo3UQiA8jGft227dnHelsAYPpC3FXjumiZGRzU6OqrR0fO67NgVNq2563/QuTM/0/4tn6clEwB8ImQCIStnyJRY4gSoJmNjY/RACEDwXY3nNT3Qpo0Pfl4rlj+mfb+ajNxyWAAQZYRMIGTlDplSbtBk5lkgesxjqYeGhkL73riNySxvfTevj0//jdY3bFX3xTzrMwMALAiZQMjCCJkGljgBosl8bo6NjYX63XEKmZOTk9rc3BxgV+M5XTs7oB/1nVtaU3N6QM82PKT9o86rbAIAchEygZCFGTKlpeUQvrhuHTPPAhU2Ozurtl27KvrwJy4hszxdjed1ffgvtfqzu3Rs6pakW5oa2KX7lz+n/qk7AX0HAMQfIRMIWdghU2KJEyAKZmZmIjFeOg4hs6xdjecmNdz+uFYlGrXqnruUvOdx7RtmTCYA+EHIBEJWiZApWZ/6v33kSOjfD9SyKM38XO0hM5yuxmnNXftQ749+qGtz6TJ9BwDEFyETCFmlQqaUe6MLoPzMrW5ReMBTrSEzCl2NAQDeEDKBkFUyZErR6bIH1AJj3Ua6qpeGegsAqgshEwhZpUOmlDvl/8zMTEW3B4ib4NdtrF3mHhj72tsJmABQBQiZQMiiEDIlboKBcon6OrVRqH+8OnXqFGPJAaAKETKBkEUlZBoquV4fEDfmdRuj2q0zSvVPPnQ1BoDqRcgEQha1kCmxxAkQhImJiaqYWCtq9Y8T88OviYmJSm8OAMAnQiYQsiiGTMnaLa2/r6/SmwNUlbKu2xiwKNY/hqh3NQYAeEPIBEIW1ZApscQJUAxzq1s19ASIcv0T9a7GAABvCJlAyKIcMiXrjV7brl3c6AEuZmdnta+9veomz4pi/VMtXY0BAN4QMoGQRT1kSrld1giagBXrNgbH3NWYrvoAEA+ETCBk1RAypeptpQHKjXUbg/P2kSNV1dUYAOANIRMIWbWETAOzPAJLzBNk0a2zeDzEAoB4I2QCIau2kClJQ0NDLHGCmheX86DS9Y+9O/7MzExFtwcAEDxCJhCyagyZUnUt0QAELU4t+pWsf+hqDAC1gZAJhKxaQ6bEEieoPeZWt83NzbHo1lmp+oeuxgBQOwiZQMiqOWRKtESgdkxOTsZyBtlK1D9x6WoMAPCGkAmErNpDpsQSJ4i/OK/bGHb9E6euxgAAbwiZQMjiEDKlxaDZtmtXrLoRAlL8120Mq/6JY1djAIA3hEwgZHEJmQZzKwU3kah2rNsYjLh2NQYAeEPIBEIWt5ApSf19fYy3QlVj3cbg2CcII2ACQO0hZAIhi2PIlKxdDAmaqCas2xicuHc1BgB4Q8gEQhbXkCnFe7IUxJO51a1t166aaHUrV/1jdDXmQRMAgJAJhCzOIVOiqxyqx9jYWE0+FAm6/pmdnWVsNgDAgpAJhCzuIVOSZmZmmPQDkVbL6zYGWf/Q1RgA4ISQCYSsFkKmlHvzSesGosLc6jY2NlbpzQldUPVPLXY1BgB4Q8gEQlYrIdNANzpEBWu7Lgqi/qnVrsYAAG8ImUDIai1kSta1B2ux5QiVx7qNS0qtf5hJGgBQCCETCFkthkyJG1NUDpNRBafWuxoDALwhZAIhq9WQKVm72L195EilNwc1gHUbg2HuakzXdwBAIYRMIGS1HDKl3FYloFz6+/poPXfgt/5htmgAgF+ETCBktR4yJcbHobxYtzE/P/UPXY0BAMUgZAIhI2QuYn09lANL5xTmtf4xdzWmezsAwA9CJhAyQuYSWpwQpMnJSW1ubmbdxgK81D90NQYAlIKQCYSMkJnLHDQnJiYqvTmoQqzb6F2++ocHPwCAIBAygZARMp2xxAmKZS47Q0NDld6cyHOrf+hqDAAICiETCBkh092pU6eyrVEsNwEvWLcxGOauxkzGBQAoFSETCBkhMz+WOIEXrNsYnImJCc45AECgCJlAyAiZhTGBC/Jh3cbg0NUYAFAOhEwgZIRMb+zjwwgSkKwt3fva2ykXRTDqH3NXY8ZBAwCCRMgEQkbI9G52dlb72tvpEglJ1jG7rNtYPCOgc14BAMqFkAmEjJDpH0sqgHUbgzEzM5M9jvQQAACUCyETCJlxg2cPm/b/7hRGg3iN27+zLWxLVLfFeMhQS/tc7m2hqzEAoJwImUDInG4A4Q2TlNQW1m0MjrmrMfUPAKDcCJlAyLjJKw3LLdQG1m0Mjr2rsaX+ufM79b/8TW3b+k290vc73XH7kPT/0cnXnte2rc/oez3/odthbDgAoGoRMoGQETJLxwyj8caDhOCYxzNPTEw4vCKtm+f/Qc0N9Uou36Huj5zOpTlND+7W/Yl6rfj63+psar7cmw0AqHKETCBkhMxgsMRJPNElOhjm82Nzc3OBrsYpnT/YohWJpFbv7NOlubTlX9PTv9B//WxSyYYWHTyfKu+GAwBigZAJhIyQGZzZ2Vm17drl8UYaUce6jcGYnJz0/wDm5jkd/PpnlEys1XN9FzVn/Pf0lAZbH1AysUpPHDqvm+XccABAbBAygZARMoPHEifVjfVQg+Olq7Fz/WPqNnvfC+q/dFPSvK6f/IG+mKjXyif+UR/dSTu8DwCAXIRMIGSEzPIwJjehFay62Ls9z8zMVHqTqpa5q3F/X5/r69zrn6Vus/e3/kJXZ36lV9fdpeR9z+noRbqjAwC8I2QCISNklo/5JpugGX1M4BSct48c8fyQJW/9k+02u05btnxJK+zdZwEA8ICQCYSMkFleY2NjzExaBczrNvI7Fa+Yrsb56x9Tt1mXiYAAACiEkAmEjJBZfuYWsrfefIsWsogZGhqixTkAxXY1Llz/XFb/1nuVTDyk/aPMJgsA8I+QCYSMkBmOmZkZljiJoMLrNsIL84OUtl27fJVvQiYAoNwImUDICJnhsbf0MGtp5fhbtxH5lL9LOCETAFAaQiYQMkJm+FjipLKKWrcRjsLpakzIBACUhpAJhIyQWRnm2TfHxsYqvTk1g/GxwTE/LCmlDNNdFgBQboRMIGSEzMphiZNweV23EfnNzs6qbdeuwLoaEzIBAOVGyARCRsisLPPSGW8fOVLpzYkto+WYQF+acnQ1pv4BAJQbIRMIGSGz8uxdOBGc2dlZxsAGpFxdjal/AADlRsgEQkbIjAYmowleses2Ilc5uxpT/wAAyo2QCYSMkBkd9lBE0CxeKes2wqrcXY2pfwAA5UbIBEJGyIwWuneWrvzrNtYGyiIAIC4ImUDICJnRZL65n5iYqPTmVI1w1m2MP3urOgETAFDNCJlAyAiZ0cUSJ/4EtW5jrZucnNTm5ma6GgMAYoOQCYSMkBltrO1YmHndRrp1lqYSXY2pfwAA5UbIBEJGyIw+ljhxNzMzw2RJATE/0BgaGgrte6l/AADlRsgEQkbIrA50YcxVrnUba1EluxpT/wAAyo2QCYSMkFk9WOJkibnV7e0jRyq9OVUrCl2NqX8AAOVGyARCRsisLrOzs9rX3q5kol6bm5trcvxhf18fEyIFICpdjal/AADlRsgEQkbIrE61uH4h6zYGJ0pdjWu2/pmb0pnudj27cVW2Hk42rNM32t7Uu2evai7wL7ypiZ7d2rb1aW3b+qIOjl53fWV6elj7tj+tbVu36/meCc0Hsd1zV3X23Te1e8s6rci+b62aX3hd/SXtb6n7ZX6/w993XtGBnpP6fWre+UOrdb+yfw6/cVn3C6gMQiYQMkJm9aqlNSFZtzE4p06dygZMuhpXyJ0PdXTH5zPn7ypt3LJV27Y+qUe/cHfmZv6revW9yYBv5FMa7XwoW2d8um1YN5w3TlN9z2ll5nWrOkeXtqPI7U6nzulH2+3v26pvPJgJqg1fUWvfuG5WZL+s73f7W7GxXSemrXsWh/1KJpJa+8ZZS8gs734BlUHIBEJGyKxulZoRNEzmSY9qfSxqqehqHAVGKEjq/p3vaNzSQnZLV078UI821Cu5/Dn1T90J8HttoeNTr2j4xkLuy9IXdfSJe7OvWwotRW53Npg26uHdfZqwvW96pEs77ksq2bBZB846x6jy7pfx/nu1re+y/U2amx7Vj3auUzKR1P2739P1dHD7lb52Vj/v+5lOXvy/Ie9XHmX/vYDKIGQCISNkVr+JiYnYLnES530Lm7mr8cTERKU3p4Zd03DbWiUTG9R+2ukm/bpOfv8BJRNr9OLg1QC/dyl0bHxwrZKJtdo9fC3nVelLPXqy4W5teHC9Pm0JLcVs95ymB17QykS9Vm7/qS7NpR3ed1OXenYuvmbngKadXlLW/SocxtIXu7U5Ua9k46s6+Uk6sP2aG+3UKtfvLf9+OWxRCL8XUBmETCBkhMx4MI+x29feHovWvlpopQ1D1Lsa1179c0Nn9m5QMrFaO3o+cugSm9bNP7yvfxsZ08S1W/k/6vpJ7d9eaMzdbh2duKml0PGQOg516hHHLpi3dannGa1IbNHBQ3u0yhJaitjubCubc0DKvvP6OR376S/0b+PXFj831P3yEMau9Glbol7J5d/T4PX54vfLxlvILON+5WxwMPsFRBEhEwgZITM+4rTEibnVjW6dxauGrsa1V/+kNXv2TW1qWBzv9vB39urwwEmdu5yS70YhI/zk/XtI+0dTMoeW/b/5jQ5vuju3C6YRMjYd0ge/6bSFliK2+8awdn+qXsmG53Vs2mXinIrvV6EwNq+PT/+N1ifqlfzzg/pgvoT9svEaMsuzXw4C2i8gigiZQMgImfFiXvcwiq1WhZiXaGEG2dJUS1fj2qx/bmnqxOt64r6kNTjds0nP7j2kY2WZvdMUWkavaeLQlpwWq4WL3Xqs4TN6rPtD3R61h5YittsIi/d0arRsTV6l7pfx/kY92vlzjY6OLv2d/IV+emiPvnFfUsnEWn134PJioC52v1JndXR/p/Z3Lv798IWvaWXiLq3b+pfZ/7a/839o+PKtAPerQFj/szd0zsiTofxeQGUQMoGQETLjqRqX+ojKuo1xUE1djWu6/pm7qnOD7+jgnu+q2ZihNVGvZGK1mtvf05TjmLhimUNLSgsTh2xdMG8uBpmGZ3T00u1MK5s9ZPrc7tBDZjH75SWMrdET+/+19P0qtoW2pP1KatWDj7t3O/6LHk0QMlEDCJlAyAiZ8fX2kSNV0+U0jmNKK6XauhpT/xjmlbr87xr+yd5MS+FiC5XDfKJLbC1jzn9OLWOppa6WRhfMhf/Q4U13a8UTPbqUVv6Q6XW7je6XxlhGr0LdL+P9d2tjW5f6+/osf+8O/jp3bGyx+2XjubtsSftVRHfZEvcLiCJCJhAyQma8mVu0oho4WLcxGNXa1bjW6p/09Gn9eH+nXus5q5TzKzQ7+triGMDmbv0+X2NmCS1jS5PGLHbBXGwpu1dP9lxUWrmhpajtTv9O3c2NSia+ov2jH7vvx61RHXhsu3bvP6aJm+lQ96u4CXKK3C8bXyGzivYLiCJCJhAyQmb8jY2NRXZsHus2BsM+6dPMzEylNwlupgf0bEO9kp/bpzOfuNygGyFr0yFNLNzS9Og7evU7W/Twg8369veP6MyVTMva3DVNmMcQOv6d1+XUvHJDi7H8Rb0+3Tag/3Voi5LLX9Cx6cWIkhNafG+3JN3Sxe6tWpFIas2eE7rh+LZ53Tj537QmUa/k+gM6dzsd7n4VtdRHkftl4y9kVs9+AVFEyARCRsisDebuqG+9+VYkuqOybmMw6GpcZdJ/VP+O1UomVumJA6c1bR93mf5Pnf/7rVqZuEvrO0d0Y/ywNi9/RC//5F80OvIv6tn9iFZ+5U2dnfV7c58bWpa6YK7XxvV3W9Y9zAktPrfbKIXp6+/p5c8mlWz4qvYMfKiU5W1pzU39Uq9ubLROrBPmfhUVxoLZr/mzb2htYrWeHZiK1X4BUUTIBEJGyKwdUZlYx9zqtrm5uWq6dUaRuatx1Fqpvaq9+ietOxd79ExmhtYVX2hRW/vfqbvvJzr8xl61bVmnFYl6rdjYrhPTs7rcs0Mrtvdpyribv9KnbYlmHfzA7/nrEFqyXTDrlUx8Ts8N/O9saMgNLX622zyKc16ps3+r5oZ6JRN3a92WNh3o7lV/3090aO9OPXxPUslEox7e88siJzoqdb+KC2PVs18FJv7Z+rR2dJ7U9dD2C6gMQiYQMkJmbal0t8rJyclIBN04GBoaikVX4zjXP7Ozsy6/zbxSF4d0YOcmrcoZa7haj7aZusTa3nd9+Pu6v6iJWZxCy1IXTHPXS8lt4p/itzs1fkz7t6/PBCTz8ifNevkfR3JbRkPbr2JDZrXsV6GxrfVKbu3TldD2C6gMQiYQMkJmbarEEifVsm5jNYhTV+O41j/mBzp5HwJYxh8a4wydzCv1Ua9e/Oxa7ej+QDfLstU+eN5uq3Tqss5l3vf+xLUyrAdaGewXEG2ETCBkhMzaZQ4qY2NjZf0u8yy3/X19Zf2uOItjV+M41j/mcbJtu3YF0GI/r9T5I9px31rtOHzONk4OAFAIIRMIGSGztoWxxEk1rdcZZXHtahy3+if42Zxvaeq9H+jh5Y/o5b7/IGACQBEImYDFTU307HYfsP+dV3Sg56R+77GbkhNCJsq1TmW1rtsYRXHuahyn+if4cbJp3Tz/D2pe/lW9+t4kXRUBoEiETMDC28D93Nn8vCNkQspd4qRUlZ5gKE7oalwdytP9/JqG29Y61PvWyWAAAPkRMgGLfLPepTU3Paof7VynZCKp+3e/p+tFdKMiZMIQVHdM1m0MjtHVuNpnkI2z2dlZte3aFatxsgAQN4RMwKLw1Orpi93a2/uhhAAAIABJREFUnKhXsvFVnfzEf8okZMLM3gLpNyAGPx6tNs3OzlZkBmD4E5W1ZwEA+REyAQsP63dd6dO2RL2SRa2bRshErmIDTlzWbay0WutqXK31j72LOQETAKKLkAlYFAqZ8/r49N9ofaJeyT8/qA+KmP+HkAk3ftZiDHM5lDgLfumL6KvG+sc8TjbIybIAAOVByAQsjJDZqEc7f55Z9Drzd/IX+umhPfrGfUklE2v13YHLKmZme0Im8inUOsl4tODUalfjaqt/+vv6aLEHgCpDyAQsvMwuu0ZP7P9XTc0Vt3gaIROFuM1uGtd1GyuhlrsaV0v9wzhZAKhehEzAwgiZd2tjW5f6+/osf+8O/loT126V9A2ETHhhH3/GeLTg1HpX42qof+zjZAmYAFBdCJmAhYeJf0pEyIRXk5OT2tzcbGlJZ93G4pm7Gtdyy1jU6x9zua+VcbIAEDeETMCilJCZ1p2L7+qVHa/rZJ5ZZ+3db93+u1MYjdJr8nUpDuI1tbrf+V7z9Ucf5Ya7SCx9UR1qdZwsAMQNIROwKCFk3plQ9xOrlEzsVP+VOdeX0ZIJL8zj0dZ9YW223DDZj390Na4O5rHIQ0NDld4cAEAJCJmARbEhM6XzB5/U+i2P6SFCJkrkNB7NCEi13tXTL5a+qA7msl1rEzEBQBwRMgGLYkLmvD4eeV2bHviBTp7/qbYRMlGCQuPRWM7BO46VsyjVP7Ozs9rX3s7DEwCIGUImUKL0x7/Ra5u26LWR60pf6SNkomhex6PRrTA/lr7ILyr1D+NkASC+CJlAKdLTOrnnq9q0/zf6OC2JkIki+Q2OExMTTJDigKUvCotC/WMeJ7uvvZ2ACQAxQ8gESjF/Vgf+LOkwQ+gjOnD2E8e3EDJh52XdRqcyw4Q2Vix94U2l659Tp05lyy3jZAEgngiZQJBoyYQPftZtdCsz9pa7Wg1WLH3hXSXrH8bJAkBtIGQCQSJkwiO/49HylRlzWK3FLqKMUfWnUvWPucV+YmKiItsAAAgHIRMIGSETxXRz9VJmanGyG5a+iD7GyQJA7SFkAiEjZNa2Ytdt9Fpm3j5ypCZCF0tfVAfzONla7s4NALWGkAmEjJBZu0oZj+anzJiDbByDJktflCas+ocZkAGgdhEygZARMmtT2OPR4joRDktflC6M+sf8oKO/r6/s3wcAiBZCJhAyQmZtqeR4NPvYz2rH0hfBKHf9UytdtgEA7giZQMgImbUjyPFoxZaZuHQtZemL4JSr/mGcLADAQMgEQkbIrA1Bj0crpczYW1NnZmZK3p4wsfRFsMpR/1R7GQMABIuQCYSMkBl/5Vi3sdQyMzs7W3VLnLD0RXkEXf8wThYAYEfIBEJGyIy3cq3bGFSZMW/f2NhYIJ9ZDpOTk7Ho5ht35nGycRj3CwAIBiETCBkhM57KPR4tyDIT9SVOWPqiOgwNDUW6HAEAKoeQCYSMkBk/YYxHC7rMRHWmVpa+qA7V0iIOAKgMQiYQMkJmvFTzeLSoLXHC0hfhKHUSqbZdu5RM1GtzczPjZAEAjgiZQMgImfERh/Fo5rGPbbt2VSQks/RFuIqtfxgnCwDwipAJhIyQGQ9xGo9m7+4bZnhg6YvwFVP/2Fu9CZgAgHwImUDICJnVrxLrNpa7zFSiNbGauxpXM79liXGyAAC/CJlAyAiZ1cvc6hb2eLSwykxYAToOXY2rlZ+yZIyTjUOLPQAgPIRMIGSEzOpU6fFoYZaZcncFjlNX42rkpSzNzs5aHjgwThYA4AchE7C4qYme3dq29Wnnv++8ogM9J/X71HzR30DIrD5RWLcx7DJTri6SLH0RfYyTBQCUipAJWKQ02vlQ9uba7W/FxnadmJ4r6hsImdUlKuPRKlFmglzihKUvqoP5N6/UbMMAgOpHyAQsjJB5r7b1Xbb9W1pz06P60c51SiaSun/3e7qe9v8NhMzqEaXxaJUqM5OTk9rc3FzS5DyV7moMb8bGxireYg8AiAdCJmCRL2QuSl/s1uZEvZKNr+rkJ/5TJiEz+hiPZlXKEicsfRE9TvWPucV+aGioAlsFAIgTQiZgUThk6kqftiXqlVz+PQ1e9z82k5AZbYxHc1ZMd9eodDWGlb3+YZxsxMxN6Ux3u57duGppmEbDOn2j7U29e/aqihuoUYh5PoIXdXD0uusr09PD2rf9aW3bul3P90xoPuf9RcxnMHdVZ999U7u3rNOK7D6vVfMLr6u/bPsMoJwImYBFoZA5r49P/43WJ+qV/POD+qCI+X8ImdEV5fFoUSkzXlt4o9TVGFZGWTI/OKDFPiLufKijOz6fOXdWaeOWrdq29Uk9+oW7M8Hrq3r1vckyhC7rfASfbhvWDecN1FTfc1qZed2qztHMthQ/n0E6dU4/2m7f5636xoOZkN3wFbX2jetm4PsMoJwImYCFcaFs1KOdP9fo6OjS38lf6KeH9ugb9yWVTKzVdwcuq4ghmYTMiIr6eLQolZn+vj7XAElX4+hLJuo1MzPDONnIMQJcUvfvfEfjlla/W7py4od6tKFeyeXPqX/qTsDfbQuJn3pFwzcWcl+WvqijT9ybfV1uyPQ5n0E2VDfq4d19mrDt8/RIl3bcl1SyYbMOnHWOvQCiiZAJWHh5GrtGT+z/V03NFRMxCZlRVA3rNkatzDiN4aOrcXUwHgAwTjZqrmm4ba2SiQ1qP+0UqK7r5PcfUDKxRi8OXg34u5dC4sYH1yqZWKvdw9dyXpW+1KMnG+7WhgfX69OeQ2bmvTnzGcxpeuAFrUzUa+X2n+qS4zX1pi717Fx8zc4BTRd32QVQAYRMwMK4UN6tjW1d6u/rs/y9O/hrTVy7VdI3EDKjpVrGo0WxzJjXD937g73ZWWij1tUYS8wPB94+cqTSmwOLGzqzd4OSidXa0fORQ5fYtG7+4X3928iYt+vQ9ZPav91ljGT2b7eOTtzU0rXvIXUc6tQjjl1mb+tSzzNakdiig4f2aJXPkJkzn0G2VdQ50Gb3+vo5HfvpL/Rv49cYmwlUEUImYOHhQlkie8uo2393CqNBvCZfK20tbou5VafS2xKl4+J1WyYnJyu+LbV8/Iv9nqi22Ne2tGbPvqlNDfVKJlbp4e/s1eGBkzp3OVXU0IxsqMv795D2j6ZkDpn7f/MbHd50d26XWSMUbjqkD37T6TNkOsxncGNYuz9Vr2TD8zo2XcQEBwAijZAJWBQTMueV+qBXr36rWRs3Pq2XD/5SF91m0BMtmVFQjePRolpmzC1j1XQ8a425xX5iYsL0L2ndufiuXtn+tLZtf1X9F51/u/T103pz5/a8r0EQbmnqxOt64r6kNQzes0nP7j2kY2WbadUUMkevaeLQFtlbGBcuduuxhs/ose4PdXvULWT6mM/ACMH3dGqUJkogdgiZgIX/kJme+pm+e99Dau3+F42ePqYDW9dr0xvvy+02jJBZWdW6bmMUy4w5uBgB0/hfJvyJBvs4WaPl2Sql8UNPL457a/mxxm/a2s3m/qhjLz6gZGKVnuyeUNBTzsDB3FWdG3xHB/d8V83GzLKJeiUTq9Xc/l7RcwK4M4fMlBYmDtm6zN5cDJ4Nz+jopduacw2Z+VpNbfMZEDKBWCNkAhZ+Q+aCUmf/p17562O6tCBJc7rStzPv8iaEzMphPFownJa+MMo0M8tGx+TkZHacrLmF2bH+uTOh7idWKZn4jJoPvK9UNsPM6mLPc1qdSGr1zj6XyVlQXvNKXf53Df9kb6aFc7E10WHuV6vUWR3d36n9nfn+/oeGL9+SPWRmu8YaXWYX/kOHN92tFU/06FJaeUKmj/kMjO6yRa45DSDaCJmARbFjMtOau/4HnTvzM+3f8nlaMiMo37Ib8M5LV2NjjcwvrlvHsa4Q86RM9iV5nOuftOYu9em5+5JKNjTrtZHrSmteqbN/q+aGeiXXvarhaZqbyik9fVo/3t+p13rOKuX8Cs2OvrY4rrG5W78vlPeLHZM5mtLSJD+LXWYXWzbv1ZM9F5VWvpDp49qZ/p26mxuVTHxF+0c/dn/drVEdeGy7du8/pgl7KzuAyCJkAoGY1/RAmzY++HmtWP6Y9v3KfbFsQma44rJuYxTKjJ+uxuZWY4JmuJyWlzFzL0u3NDWwS/cn6pVc9wOd+OhftW9jo5INX9O+09eKm3wG3k0P6NmGeiU/t09nPnE52kZw3HRIE5amzJu61PeiNr5xVtk2wblrmjCPjXT8O6/LqXnlhkxjuZJ6fbptQP/r0BYll7+gY5kHDYGETN3Sxe6tWpFIas2eE7rhuMvzunHyv2lNol7J9Qd07jalEKgWhEwgUJkZ9Bq2qvui8xTzhMzwOI1Hq1aVLjPFdDUeGxvLhlK6J4fD/EDFLdznLUvpKxp+2Ty2zt59FmWT/qP6d6xWMrFKTxw4rWl71+T0f+r832/VysRdWt85stRbJv2xLg68qocbzKHPr9yQudRldr02rr/bsk5lMCFTSl9/Ty9/Nqlkw1e1Z+BDWzlLa27ql3p1Y6N1wiAAVYGQCZRkTtfODuhHfeeWujdND+jZBtOF2oaQGQ7zeLQ4rNtYyTLjpaux2/bZWz9RHrOzs9rX3u6pxb5QWUpf/5VeXXeXkol6rfj6P+g8XRTLxlovpXXnYo+eycwsu+ILLWpr/zt19/1Eh9/Yq7Yt67QiUa8VG9t1Itt1eVonvr9RK9f9P/r246uDDZnZLrP1SiY+p+cG/nc25AUVMmXukp24W+u2tOlAd6/6+36iQ3t36uF7kkomGvXwnl+WYbIjAOVEyARKMq/rw3+p1Z/dpWNTt5Ttbrb8OfVPOc/BSMgsP3MLWlyCTaXKjPvSF1b5tq8al4ypJsEe37Rujv9YTyzPtGTe95yOsmRJ4IyHArm/17xSF4d0YOcmrcoZP7laj7Yd0Zkr5l4y/6kPhk/p96kbGu18KOCQudRl1txVVgoyZGb2efyY9m9fnwm05qVbmvXyP47ktuoCiDxCJlCquUkNtz+uVYlGrbrnLiXveVz7hhmTWSmFxqNVq7DLjN+uxoW2z/55MzMzQW5uzTK3FO9rby85wKc//o1e+0qjkon1enrrJq1wW9YERfP8UMAyptIYO+kmVWLIjIZ06rLOZfb5/YlrVb0vQK0jZAKBSGvu2od6f/RDXSvwxJWQWT5exqNVqzDLjNvSF/l42b64TMIUFadOnQq2xT47HvMufXHPr3R99pwOfv0zi+MyD57TzdK/oeYF/VBgSTxCJoD4IGQCISNkBs/PeDTkl2/pi3z8lGlz0BwbGytmM2ve0NBQ0bP3Ov9WN3Wp7wWtTtRrxVde1+jH85LSuvPRP+rJ5fWmZU1QLPNDgeAnwiJkAogWQiYQMkJmsBjvF5xSuhr7LdMscVI8r+Nk3eT+VqYwufxpHR43T1pmCp8bf6jT1/N12YSb8q/TS8gEEC2ETCBkhMzglK/rWfSUu8xUoquxuWWnv68vlO+sZuZxrZubm4tusbeXpXTqfb359c8omfi8nun5UDlTls39UcdefGCxG+3Lx7PLWMCbUh8KeEPIBBAthEwgZITMYJS361n0lKvMVLqrMUuceDM5ORlYi72lLM1NanjPV7UikdT9Lw64LhORnv6F/utnk0omHlDrwB8JMh7EaZ1eAPCLkAmEjJBZuvJ3PYuecpSZILsal7J95gAVhzVNg1bsOFk31D/lV8zkWQAQJ4RMIGSEzNKE0/UseoIuM0F3NS51++ytPtyULzKPXQ2qSzH1T3kF/VAAAKoRIRMIGSGzOLXe9SzIMhP40hcKZvsq3XU3at4+ciS2S/LEVTkeCgBANSJkAiEjZPoX5Hi0ahVUmSll6Yt8gizTtdpabWA90erEQwEAWELIBEJGyPSHrmeLgigz5QxvQZfpcoXhqLO32M/MzFR6k1AALfAAkIuQCYSMkOkdXc+CEdTSF/mUo0yXsm5nNTKPky3nBEjUP8HhoQAAOCNkAiEjZHpD17NghNXVuFxlulaWOBkbGwttP6l/glFL6/QCgF+ETCBkhMz86HrmrJgyE5euxnG/mQ+7azD1T+nKMXkWAMQJIRMIGSHTHV3P3PktM3HrahzXJU7M42THxsZC+U7qn9LU6nhhAPCDkAmEjJDpLO6tVaXyU2aMrsZh3gSHUaZnZ2fVtmtXWceWhqWS+0L9U7xan/kYALwiZAIhI2TmoutZYV7KTCWXvgizTFf78h6VXpKH+se/MCbPAoA4IWQCISNkWtH1zJtCZabSXY3DLtP9fX1VWW7sExnRYh99lX4oAADViJAJhIyQuaQS49GqVb4yE9bSF/lUokybx51WQ9A0b+/bR45UenPgAQ8FAKA4hEwgZITMeI2tq7Qwl77Ip1Jlulpm0I1Sy2ut1z9exW3yLAAIEyETCFmth0y6ngUnSl2NK1mmo9zaVMlxsm5quf7xqhKTZwFAnBAygZDVcsiMchioNlHralzpMj0zMxO5hxf2cbJRCJhS5X+rKIviQwEAqEaETCBktRoy6XpWGqPM0NXYXZRC3eTkpDY3N1d0nKybWqx/vKj05FkAECeETCBktRgy6XpWumSinq7GHlW6JSoq42Td1Fr940UUJs8CgDghZAIhq6WQSdez4BjHMKpdjaNWpo0HG19cty7UBxvmFvuhoaHQvtePqP1WlRb1hwIAUI0ImUDIaiVk0vUsONWw9EUUy3TYS5xEbZwsCquGhwIAUI0ImUDIaiFk0vUsOFFa+iKfqJZpcytVuQK6eZwsLfbVg4cCAFA+hEzA4qYmenZr29annf++84oO9JzU71PzRX9D3EMmXc+CYe9qHPUyE+Xts89qHKQozmqL/HgoAADlR8gELFIa7XwoGwTd/lZsbNeJ6bmiviHOIZOuZ8GI0iypXkW9TJdj0iRzeN3X3l41ATPqv1U58VAAAMJByAQsjJB5r7b1Xbb9W1pz06P60c51SiaSun/3e7qe9v8NcQ2ZdD0LRpSXvsinGsp0kOOET506VfZuuOVSDb9VObBOLwCEh5AJWOQLmYvSF7u1OVGvZOOrOvmJ/5QZt5BJ17Pg5OtqHPUyE/XtMwQx43G1jJN1Uy2/VZCqYfIsAIgTQiZgUThk6kqftiXqlVz+PQ1e9z82M04hk65nwSnU1TguZSYqzEFzYmKi7O+LEktZSv9Rx3bv0Latu9T9wf/Nee3CpQH95fantW3rizo4ej3n39PTw9q3/Wlte3lAl4vo2RGGan8oAADViJAJWBQKmfP6+PTfaH2iXsk/P6gPipj/Jy4hk65nwfHS1TgOZSZq/CxxUo3jZN1Yy9KsPjjYrGSiUZu7fydrTrytSz3PaEWiXslEUmv2ntYnln9f0I3hV/TpRL0+8/2Ttn+rPNbpBYDKIWQCFkbIbNSjnT/X6Ojo0t/JX+inh/boG/cllUys1XcHLquYB/dxCJl0PQvG7Oys9rW3e7oJjnqZifr2uTGPrezv63N8jXmcbBxa7K2/VVqfnN6nNYl6rXxhUJa2yvT/1rGdn1Ny+RqtW3OXkusP6Nxtc633sUY7v6JkYq12D18LZ+M9itNDAQCoRoRMwMLL7LJr9MT+f9XUXHF9w6o9ZNL1LBh+uxpHvcxEffvyybfEycTERPyX5LkxrN2fqlfyv7TrzK10zn9f+UK3/mnvQ0omtujwxM2lf0//Tt3NjUo2PKv+qeJm2y6HuD0UAIBqRMgELIyQebc2tnWpv6/P8vfu4K81ce1WSd9QzSEzDuPRoqCYpS+iXmaivn2FOM3qa26xd2vljIX0JfVvX2ULkUYL5716sucj/efwK/q0vUvt9UG9uLxeyeZu/T4i4zFr4qEAAFQBQiZg4WHinxJVY8ik61lwqnnpi3yqrUw7MZfzh770YPaBSvxb7G9q4tAWJRNr9OLg1cx/S+ncG1/LBs/09ICeW16vFdv7NJWWpLQ+OfmqPpO4S186eF5FDE8PHOv0AkB0EDIBi2JC5i1Nj76jV7+zRQ8/2Kxvf/+Izlxxb+20d791++9OYTSI1+TrClzoNeauZ5XeligdF6/fY+5qXOltidJxKXVbgvye69evV8U+l7otdvMfHNSXEqYJfBb+Q4c33b00DtPoGvupVzR8Y0FLEwZ9RftHP875vLCZe1nE/6EAAEQfIROw8Bsy07ozfliblz+il3/yLxod+Rf17H5EK7/yps7OOvcfc7vJiyK6ngUn7l2Nq6VM52NuyTT+4jgrqeNv9clJ7WmsV3LTIU0sGOsBm2eUNVo7H9Cek9cdQmdl+Jk8CwAQHkImYOE3ZN7R5Z4dpi5kyqyj2ayDHziPs6uWkEnXs2AE1dW4GspMNbOPkzXKvXEOxKl1zLksXdXgC2syk/jc1PTAC1ppmTU2rVuj+/V5o3tsZjxmzoy0IWKdXgCILkImYFHqmMx5XR/+vu5f/j0NXncepVQNIZOuZ8EIcpbLqJeZamYeJ2u02BvHO44PW5zL0pym+p7VisQD2nNyXMNta5Vc/oKOTZtmjTVaO5uP6Le/elWfSdyrJ3suFrWUU6mKmTwLABAeQiYQmHmlPurVi59dqx3dH+imy6uiHDLpehacoLsaR7XMVDsvrZX5ljipRm5laWHikB5J3KUvvfaW9q1JasUTPbpkSZDXFsPnp76r/fs2K2dJk5DEdfIsAIgTQiYQiHmlzh/RjvvWasfhc0rlebQf1ZBJ17PglGPpiyiWGbOob58TP+Nk49Ry5vpb3RrR/jVJrbjnXt2buFuPHPoPWUdbGq2djVp1z11LkwKFKK5dmAEgbgiZQMluaeq9H+jh5Y/8/+3d/3dc5WHve/0b89NoecCXsJQDxPEKyycFJcvVCU7CIqygC/aqICbESamhiwVqbJOcAFk32OqRc3Jx2rrVtRvjXmIzlXJS00a+wmnxMVauRGVyQZXSGIpVUexjUzG1bCOPPvcHzZ55Zs/ee/bes2fPnq33ay2tpni+PM+eZ3/5PPt5nq3vDP+TZ8CUkhky03QB3WovHjrUlKHGSWszdkkvn8mcJ3t/b6/jHXun+tjn16ZvPyndqcx2Kpe9V/vOFGpesbIg0MoxrLwSbUzSvngWAKQJIRNoyLKuvPUX6r3hK3ru1Tkt1X9D4kKm03w0BNfsocZJajNOkl4+y9zcnK+g6FafxcVF7dq50zOgtq/rujT6bd2U7VSu6zmdvOzQY3b9Le3/3RuVq1oUqLn8dAoAAJKFkAk0xOz5N//u0t7J2rsAUrJCpjmsk6Fn4dnvcF28eLHVRYpdUtq0F/vcSq87kfXqY95Va7fQ0w6/lcVvpwAAIFkImUDMkhQyjx8/ztCzBjHUeEVS2rSboPNk/dRnZHi4LVdhTvpvZeE5vQDQvgiZQMySFDIlrcq7blGJc6hxktqMkySXz5onG+SOvd/6tONogCT/VpZmLJ4FAIgPIROIWdJCJsKJe5VL2kxwi4uLoYe1BtneU1NTbXXHLeltqVmLZwEA4kPIBGJGyGx/rVjlkjYTTNzzZIPM92y1pLYlntMLAOlByARiRshsX61c5ZI2458Z+Hbt3Blb4GuXZ80msS2xeBYApAshE4gZIbM9tXqVy6S3maSUr9VDV+1hibtx9bWqUwAA0DyETCBmhMz2k4ShkElvM0kon7lYzPHjxxv6rEbr086POIlTqzsFAADNQcgEYkbIbC+sculPq9u0GeqmpqYa/rwo6mMuYBNFmdIm7sWzAADxIWQCMSNkto8wj75YrVrVphcXF7Vr587I7xpGVZ8kPuIkCcefqDsFAADJQsgEYkbITL5GHn2xWrWiTTdzoZ0o62M+T/XFQ4ci+9ywWnn8MTsF4l48CwAQH0ImEDNCZrIldZXLpLeZuMvX7HmyUdfHXt5WalVbavXiWQCA+BAygZgRMpMryatc0mYqzCGozboz2IztnZSQ1Yq2lITFswAA8SFkAjEjZCZT0le5pM2sGBkeTtwcxyCScKc87rbE4lkAsPoQMoGYETKTJ8pHXzTLam8zaZon2+q6xNmWWDwLAFYnQiYQM0JmsrTLKpdJbzPNLJ/97l87B0yT2fZmZ2dbXZxItTpIAwBai5AJxIyQmQzNevRFsyS9zTSrfHNzc7q/tzf2eYxxbe8kPuKkUWntFAAA+EfIBGJGyGy9Zj76YrVqRpuenZ1t2TzZOPfRNM1ZNDsFkrZ4FgAgPoRMIGaEzNZilcvmiLpNt3qebKsfydJMzapb0hfPAgDEh5AJxIyQ2TpxPPqiWZLeZqIsnzmXr1VDSFv1mI847gI2o26t7hQAACQLIROIGSGzNdr90RdJbzNRlG9xcVF7du9OxDzZVm1v+3zGZgTNqOvWLotnAQDiQ8gEYkbIjFdaVrlMe5tJ2jzZVm5vM2zf39sbeZuNqm7ttngWACA+hEwgZoTM+KRplcs0txlzPuKe3btbHjCTolmdI1G0paR1CgAAkoWQCcSMkBmPVj36olnS2mZOnTpVDpjtNk82DsePH498mHejbYlOAQBAPYRMIGaEzOZr5aMvmiXpbSZM+ZoRoNIoSYvq0CkAAPCDkAnEjJDZXEm6IF9NgrZpcyjo7Oxsk0oVXtL20SR0nLT74lkAgPgQMoGYETKbJwmPvlit/LZpc55sMxa1iUoS99GohqmGqVvSOwUAAMlCyARiRsiMXpIefbFa+WnTc3NzbbNYTFL30SgecRKkbmlaPAsAEB9CJhAzQma0Vssql0lvM/XKl4ThnkEkeXubjw4JE/z81i1ti2cBAOJDyARiRsiMzmpa5TLpbcarfOY82ZHh4RhLFV7St7cU/hEnfurWbp0CAIBkIWQCVa5o9sjTeuThrzv//cF3te/ISb1TuB76GwiZ0Vhtq1y2a5t58dChtpwn2y7b21qMJ8j2rVc3Fs8CADSKkAlUKWhy8K7yBZbb39pNu/Xa+aVQ30DIbNxqfPRFu7UZ5snGxwyFfvYHr7bE4lkAgCgQMoEqVsi8TY8Mn7P927KWzk/qL7ffqVx0+wIFAAAgAElEQVQ2p888/aouLQf/BkJmYy5evKjP3Xnnqlvlsp3ajH2xmIsXL7a6SKk3NTXV0PBWOgUAAFEiZAJVvELmiuWzh3V/tlO5rud08nLwlEnIbNzU1NSquwhOepuxymfOk921c2fbzpNN+vZ2Ym77P/nxn/je9nQKAACiRsgEqtQPmXp/WI9kO5W74dsavRR8biYhE2mUy3Y2fDctSdp1Hw262vJqWjwLABAfQiZQpV7IvK6PTv+xNmY7lfvd/Xo7xPo/hEykkTlnOQ1z+dp5H613Z9Kqm7l4lmOnwLW3dPgPv6FHHt6pw2//h8c3Lun8iUFte/jr+v0DZ3Q1wroAANoTIROoYoXMLn118G81OTlZ+Tv5C7184Fn93qdyymXv0B8eO6cQUzIJmQglyW3GXCxmamqq1cWJRJK3t19ujzixVo2t3ylQ0Jsv3Ktc9kb1vDCla25ftHxWRx+8Tbnsvdp3phB1NQAAbYiQCVTxs7rsBj249+81vxQmYhIyEU4S28zi4qJ27dxZbtNpmiebxO0dhlMHgPV7+Vk8q3j2sB5Y06nc7Xs07jIHvfyaL/+53v443HERAJAuhEygihUyb9amXUMaGR6u+vvZ6OuavdDYYDBCJsJIWpuZm5urGpKZtPI1Kk31MR9xct9Xv6pctlP39/b66xRY/heNbFuvXPYu7T79ocMLrmj2wBblsrfpoSNnQ43uAACkDyETqOJj4Z8GETIRRpLaTNhVTNtJkrZ3FH72s5/p5rX/W/n44/83W9L5Y0/qpmxOn3nmNX1k/+drU9q38UblbnhSr4R8djAAIH0ImUCVRkLmFb03/JQ2vXBGXusB2Yffuv13pzAaxWu8hgJTFsoSpCwjw8OJKMtq3f5+P2Nubq7m3wKt/vvRa3r20znlPvFdnVgoGv+wrMXJH2pjtlOf3HVCC/4/EQCQcoRMoErIkLn8kc4ee05fWtOpdYOT8urPd7rQBOpJQpt58dChcvu1LxaThPKhljlUdmR4uGaYs787mh9q/Pm7lMt+Vv2j/2YMibX+u9tQWgDAakXIBKqECZnn9dozm3TTnV/To5vXEzKROouLi64rlVrS1qbTUB+3TgH7I07qB81lXTuzTz3ZTt20/ZjOWylz4YSe/kSnchv36c1rzMYEAFQQMoEqYULmv+vtE6f0TmFBk4N3ETKRKvZA4rZYTNradDvXx0+ngJ/XVCn+Rof/91uMuZfWXM1b9MDh36jo/W4AwCpDyAQiUyBkIlXm5uZ0f2+vctlO7dq50/OOV9radLvWx94pcPHixZrXmHUzg6b340yu6b0j39RaaxXZ5X/VK9tvV27NN3X0PdcnaAIAVilCJhAZQiaaJ+42MzU1VbWCbD1pa9PtWB9z1V+vTgF73Y4fP+4619a0fP6YHr+hU2sfPKJ/+ZcjemiNbfgsAAAlhEwgMoRMNE+cbcZcLOb48eO+3pO2Nt1u9QnSKeBUN/sCQc4u6MSuO5Rbs0XPfG+L1mZ79OzJ2julAAAQMoHIEDLRPHG1GXP45NTUlO/3pa1Nt1N9/N6JtLjVzf7801rLunx6jzZYj0K5fY/GL3MbEwBQi5AJRIaQieZpdptZXFzUrp07/S8Eg0QI0yng1ZbqzsO9NqV9G29ULnujel6YErMxAQBOCJlAzAiZCKOZbebixYshnp2IVmqkU6BeWwr+iBMAAKoRMoGYETIRRrPajDlEcs/u3aEDBW06PnF0CiwuLmrP7t3KZTt1f28vd7YBAIEQMoGYETKRFKdOnSoHzBcPHWros9LWppNaH/u8yWbfZQz0LE0AAEoImUDMCJlIgpHh4UCLxdSTtjadxPqYK8A20ikQtG5RtxUAQPoRMoGYETIRRpRtxrw7NTs7G8lnpq1NJ60+UQa9MHUL81gbAMDqRcgEYkbIRBhRtBn7gi5RDn9MW5tOSn0WFxcjH7Iatm6zs7O+n8UJAFjdCJlAzAiZCKPRNmM+mqIZi8WkrU0noT7N6hRopG5RLRQFAEg3QiYQM0ImwmikzcRxByptbbrV9an7vMoGNFo3HnECAKiHkAnEjJCJMMK2GebStZ+pqammdgpENfTaek5n1EOvAQDtj5AJxIyQiTDCtBlzLh+rgraHdusU4BEnAAAnhEwgZoRMhBGkzSwuLmrP7t2xXvzTphvXrp0CLx461JblBgA0DyETiBkhE81kny938eLFWL43bW06zvq0olMgauYdWIImAICQCcSMkIlmaeXKn2lr03HV5+LFi7EvotOsujV7LikAoH0QMoGYETIRRr02c+rUqZZe4KetTcdRn1Z1CjSzbmadCJoAsHoRMoGYETIRhlebOX78eMuHKqatTTe7PmanwIuHDjX1u+yaXbdW3J0FACQLIROIGSETYbi1GXOxmNnZ2ZhLVZG2Nt3M+owMD7e0UyCO36pVc4MBAMlAyARiRshEGPY2Y17E39/b2/LFYtLWpptVnyR0CsT5W/GIEwBYnQiZQMwImQjDbDNzc3MMR2wzSeoUiPv4YwbNqampWL8bANAahEwgZoRMhGG1GRZWaT90CvCIEwBYbQiZQMwImQjLvFAfGR5udXGq0Kadzc7O0ilQ0srFjgAA8SJkAjEjZCKMFw8dSvSdoLS16Sjqk+ROgVbhTjwArA6ETCBmhEwEsbi42BaLp6StTTdaH6tT4HN33pm4ToFW/1bm8OFdO3euyuHDAJB2hEwgZoRM+GUuFpPLdib6MRBpa9Nh67O4uKg9u3cnulMgCb+V/REnBE0ASBdCJhAzQib8MIcV7tq5M/FtJunlCypMfdrl2ZBJ+a3a5S49ACA4QiYQM0Im6pmamqqZt5b0NpP08gUVtD5mp8Ce3bsTfWcuab9VEp4dCgCIFiETiBkhE16OHz/uuMAPbSZeQba3uWpqOyxmk8S25NbuAQDtiZAJxIyQCTdeD62nzSRTO4ajpLYlVuMFgPQgZAIxI2TCbnFxsTzv0m1uGm0mebw6BRAOjzgBgHQgZAIxI2TCdPHixVSsspm2Nu1VH7NT4P7eXhasidjc3Jzu7+1ti/mtAABnhEwgZoRMWOx3bdr5YjptbdqtPuYzHtu1U6AdfisecQIA7Y2QCcSMkAmpev7Zi4cO1X190ttM0ssXlFN90tIp0C6/FXeMAaB9ETKBmBEyMTI8HHixmKS3maSXLyh7fdK0KE27/VY8SxMA2g8hE4gZIXP1auTh80lvM0kvX1BmfV48dKjtVpD10o6/VZiOGQBA6xAygZgRMlcn+xyzoHdkkt5mkl6+oHLZzoY6BZKsXX8r827y8ePHW10cAIAHQiYQM0Lm6mOulrlr585Qc/loM/GyOgOs/3vx4sVWFyky7dyWZmdnecQJALQBQiYQM0Lm6hLVRTFtJj5RdAqgedKyABMApBkhE4gZIXP1YHhf+5mamuJOWRvgEScAkGyETCBmhMzVwZzLtxoWKklDmzY7BdJQn7RrdJ4zAKB5CJlAzLiATbfFxUXt2b07dYvF1NPubdrsFJiammr7+nhJW93SuDgTALQ7QiYQM0Jmel28eLFpQ/iS3maSXj43i4uL2rVzZ01Iadf6+JHGulmPmVktIwcAIOkImUDMCJnpZC5Gsmf37sjniCW9zSS9fE68OgXasT5+pbVu5nBngiYAtBYhE4gZITN9Tp06VQ6YLx461JTvSHqbSXr57OqtUNpu9QkizXXzt3DTFc0eeVqPPPx1h79v6qln/1RHT55VYbmRkpjf8ZT2T15yfeXy+RPa842v65GHv6Enjszqet0yfl2P/MF3te/ISb1TuG580nmdHHzM5T2P6TsvvKyTZz9S+Go1WqeSpXmNH96txzatq8yBXnOnfm/Xj/WzMx9oKbb6AGgmQiYQM0JmuowMD8dy9yTpbSbp5TOZd7zcOgXaqT5BpbluUm0HQq2CJgfvqlrkqfbvZn1u+1/praoQF0T1d3xy1wktOL7uY80PP66bSq9bNzhZCll+ytiptZt267XzViw7p5GHb/N+z5p7tef0hZDBrNE6Sfr4Nzq67bOlz1inTVse1iMPP6Sv/s7NpfJ9Rc+9Old6fbPrA6CZCJlAzAiZ6WEuODI7O9vU76LNRCOuToEkWw1tyXt+tBWWbtMjw+eq37hc0Hunf6rn7luvXPZGfe47YzofKsHYQuInvqsTC8Xaly2f1dEHK0GqNmQ6lFHLWjo/qb/cfqdy2Zw+8/SrurQsVULZXdo7Wah+y9IHOvNXf6TPZTuV+/wPNbkYplKN1skKnzl9ZvtLmqkK8Ff1/mv/TV9d06ncDY9rZP7jGOoDoJkImUDMCJnpYAXM+3t7Y1nRkjbTuDg7BdB65iNORoaHjX/xCnArls//Qn/06Zxy2Xu0d9L5fp23ynds+sIdymXv0NMnLtR+z3tH9NCam9XzhY36pO+QWXrv2cO6P9upXNdzOnl5WZ6hTJKK/6SDd9+sXPZrOnz2agvqdEEndt2hXLZHu087bdNLOvnM55XLbtBTox/EUB8AzUTIBGJGyEwH61ElPAQ++Xie4uq1uLjocMe6foCTLuvt/Q8ol83ps4MTuipJl05q7zdc5kiW/57W0dkrxnfcpYEDg7rHcXjpNb135Jtam92i/Qee1bqAIVPvD+uRbKdyN3xbo5euy3coW/OEXjl/PWB9zDKFrdOCxp/vUS67XtuO/NaYe2lZ1pV339D/nJjS7IWrwesDIFEImUDMCJlIo6S26bm5Od3f2+sybNJdUuuDKPgJmcu6enq3bst2Ktd3ROeWVQl1nn9WIKoEsr2/+tVKGLIPL7WGld59QG//ajBgyLyuj07/sTZmO5X73f16+7rkFcqWC7/ViRe2aX32Rn3u2X9YGV4bqD5mmcLWaVmLZ36su9eszMf80h88r4PHTurNcwWXOZUB6wMgUQiZQMwImQgj6W0mieWbnZ31sdKosyTWJypprps/fkKmVJw9oHuyncrdOqjJ2ttuPr/jLu2dvKDZA1tqhpcWzx7WA2tu0QOHf6Nrk24hs0tfHfxbTU5OVv5O/kIvH3hWv/epnHLZO/SHx86VQlr9hXLW3venOtPwYkZh6yRJVzX/2o/04Kdy1WW79W499vwBvVK1umyz6wOgmQiZQMwImQgj6W0maeUzV5A9fvx44PcnrT5RSnPd/PEXMpfPHdGDkYTMQjmwVoaXXlkJaWu+qaPvXdOSa8j0usu4QQ/u/XvNL1m38axQdrPuvPeh6mGvW+7SumynctkubXrqrzV7pZGFf8LWybD0gd4cfUn7n/1D9Vory2Y7lcuuV+/uV0t1anZ9ADQTIROIGSETYSS9zSSpfOYCP2FXkE1SfaKW5rr54y9kWiGpPFy2cEZH9w5q76DX3/+lE+euyh7IysNIreGlpfmEax88oveW5REyb9amXUMaGR6u+vvZ6OuleYsm7zmMy4U39Zff+Kxy2Vt0/4G39XGg+phlClsnN9dVOPePOvHT50t3OFfuhBaD1sfzOwDEjZAJxIyQiTCS3maSUD5rMSYrYDaywE8S6tMsaa6bP35C5lW9c/hrymU7dcszJ3VZCj8nc7KgyoI4K8NLV+4C3qaHjpzVsrxCpncQrlZnoRz7PNP5BuZkhqjT8vnT+sneQf3wyBk5lU5a1uLkD1fmmfYe1jvLAevDzUwgUQiZQMwImQgj6W2m1eWzryDb6Kq/ra5PM6W5bv74CHAfv62Dvbcol+3Rsycvrvy3pQuaNedGOv69pXOF66oNZNajPTr1yV3H9P8e2KLcDU/qlfMrkTL2kNl7WO98HKQ+ZplC1un8MT22plO52/do/LJLIrSC/N0HNFsMWB9CJpAohEwgZoRMhEGbcTc3N1de4IfHytRHW/IOcMuF3+iVZ76itdlO3fTgX+m3Hzc+f3Hlg63hpRu1aePNumn7MZ0vfXQsIXPpX/TKU59XLnujel6Y0rW467T8LxrZtl657Do9uO+0zi/Ztuvyv+utP39YN2Vv1MbBCS02vT4AmomQCcSMkAlE59SpU6FXkMVqZYWlnNZ9YXP1gjJb79Wda0orl276gU7M2+c9Bv0OMyBZw0s7lcverseP/Wv50R3RhkyHhXIe3qxNt+ZK9dqt184HXskogjot6+OzR/TN0sqya3+nT7t2/5kOD/9UB194Xru23Km1VeVrdn0ANBMhE4gZIROIxvHjx8v7U9gFfrAaea/cuvZ3+vT0vv+hM+fDBkzzO6rvwlnDS81hpVLUIdNlfuWtd+ux3S9rMnS9Gq2TJF1X4exx7dt+d2l1WPNvvb6665DG37fK1+z6AGgmQiYQM0Im0ijuNm2uIDs7Oxv556d5H01z3dBGqua4mnM/AaQBIROIGSETYSS9zcRVPnOBn/t7extaQdZL0rd3I9JcNwBAMhAygZgRMhFG0ttMHOWbm5uLdAVZL0nf3o1Ic90AAMlAyARiRshEGElvM80u3+zsbKwL/CR9ezcizXUDACQDIROIGSETYSS9zTSzfKdOnSrvNyPDw037HlPSt3cj0lw3AEAyEDKBmBEyEUbS20yzyvfioUMtWUE26du7EWmuGwAgGQiZQMwImQhjtbWZxcXFqhVkm7XADwAAiB4hE4gZIRPwZq4g+/vf+pYuXrzY6iIBAIAACJlAzAiZSKOo2vTc3Fx5gZ9dO3c2dQVZAADQHIRMIGaETISR9DYTRfmmpqZiXUHWS9K3dyPSXDcAQDIQMoGYETIRRtLbTKPlO378eEsW+HGT9O3diDTXDQCQDIRMIGaETISR9DbTSPmmpqbKC/xMTU1FWKrwkr69G5HmugEAkoGQCcSMkIkwkt5mGi3fi4cOJWoF2aRv70akuW4AgGQgZAIxI2QijKS3maSXL6i01ceU5roBAJKBkAnEjJCJMJLeZpJevqDSVh9TmusGAEgGQiYQM0ImAAAA0oyQCcSMkAkAAIA0I2QCMSNkIo3S1qbTVh8AAOJEyARiRshEGElvM0kvX1Bpq48pzXUDACQDIROIGSETYSS9zSS9fEGlrT6mNNcNAJAMhEwgZoRMhJH0NpP08gWVtvqY0lw3AEAyEDKBmBEyEUbS20zSyxdU2upjSnPdAADJQMgEYkbIRBhJbzNJL19QaauPKc11AwAkAyETiBkhE2Ekvc0kvXxBpa0+pjTXDQCQDIRMIGaETAAAAKQZIROIGSETAOBmz+7dOn78uObm5lpdFAAIjZAJxIyQiTCS3maSXr6g0lYfU5rrlgbWOSKX7dT9vb36kx//iU6dOqWLFy+2umgA4BshE4gZIRNhJL3NJL18QaWtPqY01y0NzJBp//v9b31LLx46pKmpqVYXEwA8ETKBmHldQPDHH3/88cef379dO3dqZHiYobUAEoeQCcSs1Rcl/PHHH3/8pe9vz+7dDKkFkBiETAAAgITwGyrv7+0tD51dXFxsdbEBoAohEwAAICHcQuXn7ryTRYAAtA1CJgAAQELYh8DyOBMA7YiQCYSxvKDZ40N69uFNWle+IFinL/3Bbh3+5W9VWG51AQEA7WhkeFizs7OtLgYANISQCQS0XPi1Dm/v0dpsp3LZm3XnvQ/pkYcf1u99YV0pbN6sz23/K71VuN7qogIAAACxI2QCQSyd1cj2O5TL5rT+4X06cfYjVW5aXlfh7Kva9/Bnlcvm9Jn+X+g8dzQBAACwyhAyAd+u69KJZ/SZbKduevCv9NuPnRPk8ke/0g+/3KVcdqO+c+IDkTMBAACwmhAyAb+Wz+rog7cpl/28nj15yeOFSzp/7EndlO3UTduPcTcTAAAAqwohE/Br4YSe/kSncjd8W6OXvOdbLp87ogezncp1PaeTl0mZ8GHpA5352Y/19JY7S/N9O5Vbc4d6n/yRRs58oKVWl09qjzL6laa62KW5bgCAtkDIBPx6f1iPZDuVu3VQk/Wu0pYmtffWTuWy2zXyPpd08LKspfm/1w/7NpQXjqpdTGq9ene/qvmlVnVYtEMZ/UpTXezSXDcAQDshZAJ+ETLRDFfe0sG+dcplu/Slp4/ozPmrxj9e1fkzR/SdTV3KZbt0995f6aNWZIN2KKNfaaqLXZrrBgBoK4RMwK/zx/TYGp9DYC+N6qkb/A2txWr2seaHH9dN2ZzWbx/We453l5a1NH9M/Z/OKbdms/a/9R+UMbQ01cUuzXUDALQbQibgV/GfdPDum5XL3qt9ZwoeL1zW5dN7tCHbqdzdBzRbjK2EaDe+29QVzR7Yolw2pw3Pn9bl2Aqo9iijX2mqi12a6wYAaDuETMC3qzp7+GGtrfcMzKV3NbJ9g3LZ2/TQkbM8wgSugiwQdf3t/fov2U7lfne/3o7x5ng7lNGvNNXFLs11AwC0H0ImEEDlGZif1baDb6pgv5Zb+kCTf/4trc92au2Xf6TJj7iCg7ulyUGty3Yq13tY79TrjbDmBP+n3Rq/Gl/XRTuU0a801cUuzXUDALQfQiYQyLKuzP61+r/QpVw2p3Wbtmv3gZ9qZHhYRw88r8c2razguPYLuzQ86zVkDTCCQd8RnfMbDD7xXZ1YiG8MdjuU0a801cUuzXUDALQfQiYQ2LKWzv+jXn7+a7pzTekZdOVn0W3UtsGf2VZ1BJwtnz2s+32uWBzktVFqhzL6laa62KW5bgCA9kPIBBqxXNC5N9/Q5OSkJt88Vzt8FvBy+bR2355TLvs1HT7r1TGxpPPHntRN2U7d9OSoLsVWQLVHGf1KU13s0lw3AEDbIWQCQMssaHLwHuWyN2rj7teN5xYW9dHJH+mb3xvS8dkFLX/8tg723qJcdqO+c+ID22JSy/r47M/03W0/0smmPC6nkTJeV+HtvJ77/V5t2vR1fWf//6OzhVbOU26kLld1fvIlPfcHW/SlL/Tq0WcOafz9JI1YiKItXdF7w09p0wtnxGxyAEAjCJkA0ELL53+hP/p0Trk19+g7w/9Uuht+Ve8d+66+dGtOueztuvfejVqbzWn9tiM6+7HtdvnHszr84Drlsts18n5zxj6GLePy/N/oDz91l/oP/1KTp1/Rvoc36u4X3tBiU0rZzLos6+OZg7r/hnv0nZ/+UpMTv9SRp+/RTV/+sc4sJmf4QkNtafkjnT32nL60plPrBifFKFoAQCMImQDQUtdVeOuQtn0qp1z2Zt25ZZf2Hc5rZDivw88/pPXlOb+b9NzJ87Y7TwW9tf8hbdzygO5qYsgMV8aiCmf+b333+6/ovaIkLen94e0JeGxGmLp8rHNHtmntN4Y1b/0A7w/rkWyv9r/dyshsF7Ytnddrz2zSTXd+TY9uXk/IBAA0jJAJAC23rKX3T+svd/WurBBqX0zq//iOvv6pXGlhqVc0W7gu6bo+mviR7v78D3TyrZf1SFNDZtgylt536V29Of432rvlsy2/k1kuU6i6WK7r0oln9Jkbvq3RpgxRbkSYuv273j5xSu8UFjQ5eBchEwDQMEImACTJ0gXNTk5qcnJSb8xeKF3sl1Y0fvYBrfv093Xyo+LKM1vv3qIfTlzS8vvDMYTM4GVccV3nj+3Spi98VmtveEB7/mEuWQEmUF0k6boKv83rqU/foW2H39aV1pTan8B1KxAyAQCRIGQCQLtZPq+Tz35Fd+/91coCL3GHzFCu66PTf6yNax6us/ppklnDUe/QtoNvpnA1aUImACAahEwAaDfXz2jff85VD4XMdiqXvUf7zlxudelKlnThzDH95fCbKlj/6fwxPbbmLu2dLHi9MaGuav7VH+hLN5iL6qQNIRMAEA1CJgC0u0TeybyuSyf+q9Z/eqdemb8q6armj+3UZ254XCPzH7e6cAEt68pbf6HeG76i515N2HDfSBEyAQDRIGQCQLtLZMiUtDSnE7s3a122S+tuvVG5Wzdrz4l2DGkXdGLXHQ53jtv1rqwbQiYAIBqETABAEy1r6cJv9Mbkb3RhKZVjTAEAgA0hEwAAAAAQGUImAAAAACAyhEwAAAAAQGQImQAAAJ6WtXT+n/Wb/2UuiXReJwcf0yPf+JFOXrru8ToAWH0ImQAAAK6u6tzo9/XVWzfZVhM+p5GHb1OuvLKz2+sAYPUhZAIAALhaebRL7SNrrurC7JQmyysnu70OAFYfQiYAAGit5YLOvfmG3jxXUHQPurmuwrm3NDk5qTdmL9R/9mepDLWv9RseCZkAYCFkAgCA1lj+d7398n/VV2/NKZftVC6b07r7/lijw89pXfY2PTJ8Tlqa1N5bO5W7dVCTVelvSe8Pb1fOel35P8/r9P7H9bk1naXPLP3dull7TswZAbI03PU/9evAy99Xb7kMnVp757e077U5LZWHxJqfZQ2PNYfLnnV43Sb93pY7lMt+Vv2j/2YLz5f19v4HlMveoadPXGjqJgaAViBkAgCAFljU2SOPa302p/V9z+vIq6c1+drL2tO3oRTSwoTMBZ154X6tzd6sz31jQIeH/1ajv/gfOvpnT2nTmk7l1jysw2evll5rBMg1G/XID4Z0dDivw//tmysB9YYn9cr5f9c7J1/W3odvVy57ux4ZfEkjP/ufeufKsqpDptPrTuqfTv+f6sl26qbtx3TeTJnXprRv443K3b5H45eju3cLAElByAQAAPG7fFq7b88p9+lndKK8Oqu0/NHr2vP5G8OFzIUTevoTncp9/oeaXDTDW0FvvnCvLZBaIXG9th35rXGH85JOPvN55bIb9NToB3IfBmtf+MfhdR//f9r/5ZtLgdX6hmUtTv5QG7M3auPghBaj2JYAkDCETAAAELNlXZ3cq89mO3XLMyd1uerfrmj2wJaQdzIlLRc09+7/qppXuVx4V78cfMAlZH7NuLvp9LkNhExd1dnDD2tt9jY9dORsacjshxp//i7lsvdq3xnmbgJIJ0ImAACImRXkbtR/2f+Wrjv+W9iQ+ZHeOfmy9j/7pLZtuUvrquZJOoVMKyS6fW4jIVNafu+IHlrTqbUPHtF7y6rcbb37gGaLUWxLAEgeQiYAAIiZV8i8rkuj332M/N8AACAASURBVNZNdUOm7Y6nJC3/m1577itam+1ULnuz7rz363rqmR/p4PBxveJ6J7O5IVPL/6pXtt+uXHaLDs7+hy6O7tQns7fogcO/ERkTQFoRMgEAQOyun3lBdzgOl72qdw5/rfZOZk0YtEKdFQaXde3MPvVkO7X2vj/VmYIZXRf19v7e1oRMFbVw4rv6ZPZm3XNgVD/ffrtya76po+9da3wjAkBCETIBAED8Fie09/M3KveJJzTyr8acyI/f1sHeWyohb/ldHe27RbnsA9r/thFHr/yj9m262QiDVjjs1G3Pn5Y5y1JX3tT++25pMGR+Xs+evGS8zi1k2l+nyiJHG+/Spk84rDYLAClDyAQAAC2wpPOv7daX1nRq7Rf6dWD0dU2e/Ln2P/nl0nBXK+RZi+fktO7eXdp/ZFgjR/5Cz26xPepEUvHsYT2wplO5T23Tvl+8rsnJCY2/+pJ2lx+L0qX7D/9zaQEevyHT+v9zWr9lpwb35vVmoejwfrfXSdKCJgfvKZXB6bmZAJAuhEwAANAiVzV/4o/Ve2uuvDjP2i88qcFd1Y8bWS68pZef7jUW8clpfd+PdGL4Oa2rujt5VfOv/kBfWmMu9tOlTU8e1KkT+3RP1TMr/YZMafn8L/X9TV2lz9uig7NXHN/v/DrJHMqb+/T3dfIjZmMCSDdCJgAAaK2lC5qdnNTkm+dUWHZZNVbLWrrwG70xOak3Zi9UPaLE9fMm39K5wnWvV/q3XNC5N9/Qm+cK3nchXV5XnD2ge7I5bXj+tG0OKgCkDyETAAAkiFvIbGPLFzW++26ejQlg1SBkAgCABElRyLx0Unu/8XU9suUurcvmtP6xv9E8kzEBrAKETAAAkCDXdf7YE1qbXa/Hjs23ujCNuX5G+/5zrjyH9LX5q/XfAwApQMgEAAAAAESGkAkAAAAAiAwhEwAAAAAQGUImAAAAACAyhEwAAAAAQGQImQAAAACAyBAyAQAAAACRIWQCAAAAACJDyAQAAAAARIaQCQAAAACIDCETAAAAABAZQiYAAAAAIDKETAAAAABAZAiZAAAAAIDIEDIBAAAAAJEhZAIAAAAAIkPIBAAAAABEhpAJAAAAAIgMIRMAAAAAEBlCJgAAAAAgMoRMAAAAAEBkCJkAAAAAgMgQMgEAAAAAkSFkAgAAAAAiQ8gEAAAAAESGkAkAAAAAiAwhEwAAAAAQGUImAAAAACAy6Q2ZxWkN9WTU0dFR/69nSDPFK5oZuk8dHevUP3ah1aVHDIqFgi6Hfe/MkHo6OpTpH9NCpKWyBGiPVlvP7NDYQrEppfH8+ga2o/uHXlbhcvx1SYQW/57JU1Rh5u800NdVOmbfp6GZKx4vN9sOx3XaEwCgFQiZhMxVaEHTQ1uV6RnSTMhrLkKmFMV2rFVUYfqg+jJ1gkSaEQqq2Y/lrtvFqe1wXKc9AQBaIb0hs0ZRC2M7lHG92OBiZNWwLroSHTKDFKZFF5ERbMda1n5IyCQUlCyMqT/ToczWvOY8N4dT2+G4TnsCALQCIbOMi5FVg5AZ7fcSMqNFKKhmhcy6+xoh0xHtCQDQAoTMMvNi5J81MzqovszK8KxM34DyE/Oyn56L8xPKD/QpYw3j6u7XQYfXuZWnep5Rl/oGjmp06HGHMi5oZuwl47UZdfcPaWymcsm1Enq6tDX/bm05Z4bUU/WZ1zQ/kbd93k80MX+tdntkdmh0+h802Ne18rqBcS3MDKmnI6Oeodc1bWynjkyfBvITmi/aPqPjPg3NfGBs0y71DZ5ceV1xXuOD1jbsUt/A32mmYKtBcV4T+YHK93T0qP/guPE9MgLPfk1M27drvlK30gVrZbh0Rj1D096/WWFGowNGGQdPam7aOWT6bxNOv4H5m7pdHC/Y2uYLGp+bcr6I9LPdSvUbG+pXd4fxuqGx2t/B5LkdiyrMnNBR23YYGptRwWs764LG+tc5DGWvbNuRqnLa982iChOD6u6w3/Wy/ntG3TtGa+tffpkRmhemle/vcd1u5X1qdKrSfrsHNVEoBqy/n9/TPSi5dXY4tcPa72/sOFBQUYWZMQ2Vt5Pf39mou+dxzaq3n/3Vre0k+LhemNHYUdv+6bjfRd2eAABoPkJmmXUx0qXNffdUTubleUCPKj9XufgqzuW1NWN7Temiwino2ctiXQw7zxM1y1ia9+b4uh7tGJtb+S7Xu0qVi8SVC4xrmss/6vx5VXW03neP+jZ3VdVtqRQyN3RvcPgcs/7WNu3RE/2bba/t0tb8Gxof+KL3RWTxXeW3djlup6ogYdV/Q7e6HX6X8muDhszCuAa67XN7M+ru27wSZoyLe/9tws9v4BQsPtREzfbqUEf3ZvV12y4ifW83n6+zc92O1rw4p+1QJ+R5hUzH38H6M+9cWfuLsc2t95ZDoAurDXU/qv4++zapLrvVqWMeK1a2V5D6+/09g4VMf+0wguNAQ8dAP8e1KENmwo7rhV9rqKaNWb//9zRWDvrNaE8AADQfIbPMuKDJ9GlwvNRzXZzT2I6e6oub8oV5j/rz0+Xe5OL8uA7299RcuNQWxVrIwnz/gmbyO0oXKJUyWheR1b3pRm91TXi0DTO0DTUrX0R171C+fMfgmuYnfqL+7owRLCrbI9N3UNPGxXm5TFV3eK5pfux7K+UvB11jmxrfV5wf1Y5SYMj0vaDx+Wuqupgqv9+qU0bd/flKD39xXhMH+9VtXviVt2n13ZjKdxnbxfcwz8oFauUOa1GFmbz6rfJbF/dB2oQV0Mx2Vr7ottpZbbAoB4q+QY1av13BuONW0xbqb7diqcOg6mK13ObrreLpsB3Ntl1uG+bdnXrDFr2GPFZv20qbc+mYyDyq/NwHpQvvL2pg4kOP7zXLbrZLqTh/snQHr/IZ5X0gs1VD0wsOn1G//v5/zyAh0wpbxmgBh32r8eNA5Tcpd3TJ2N/q7Fv+j2uKaLhsko7rVplsd46NEROV40oz2hMAAM1HyCzzfyFXLA8XdehRXxhTf8b77pj7++1lsP5/pwtkK0gY5a35bqvO1kWX13w3t9f6H6JXO/fH7TOsC2F7OUr/3Xq/Zxgsvdb6N9d5Rw5l8BsyXV9nDMsM3Cas7VxvmK5bW3D47aw7dWG2mxV4u/s1lM8rPzLhcaex/vYph9aB8ZqhfFaw8Q4LdeZkFuc1MZJXPp9X3hhqWDNcdC6vrRnrjrNzeVzr43Axbi+76zBV3/UP8HsG2Ret39OzbUdxHKi04+7+/crn8xrxPaQ0zHEt+jmZLTuul++YO9xZL3eQrPz2zWlPAAA0HyGzzO/FiPU5bkOinC96/ZXD/m+20GV/dc1FjS1AuP3/nmW3hxq37eFwMeUaMl3CZL2QWTMk02loX71g1UDI9Lq4rfq3IG3C70Ik9td5tYUGtpvLsMVM34CO1ptbV7Md6+xjvra7S5sp33nyu78Zw0HrDZP1Uz7bvzmHzCD1D/B7Bg5K9QJZNMcB5yGfXeobeKlqvrjr9/s9rsUSMmM8rnvWx6zD5Sa1JwAAmo+QWRbtxYj7hXQzQ6btLkRN77ufi0v34Zru32v9QwtCpvUZbRAygz2Ptckhs2rbX9P8xLHqhUVKgcFzHlpsIdMcsjmgo/l8+c7ZkmuoMuan1Rvm6Kd8qy5k1j8OrBRgXhMjh42Fbjp8bPP2DZmRHNcJmQCAVYCQWRbRsCo/JWnWcFmpHCy7B17XXNWwN/Pz/TweIgEhM8gjMpoRMj2GtYVvE40Ol3VoC/bt3uijRcxVL70+I67hsh7Dlq1gUP2Z1r7Rpa1DP9EP/Cz6Y36P03BZ2+8b3XBZH79n3SGrUQ6XdXutn0eAmKugerXvNhwu60Myhsv6aU8AADQfIbMswLyn8oVAnwZGjSGF5YVV6lyouC0QUV56PszCP/Z6OPe8ly9MzMUhpMriFr7nZMYQMo2wUP1ok8oCJTVzMqMMmY4L6NRZ+MdPm3Bc+Oea5sdfMIKdw8I/Tou1eC78U3+7WaukVhaJ0UodSwvFeF7Yx7XwT/mi3FykxvaoBofVVcurvVqPL6k3L7Nq8Sjz97bKXilT3XnJfhZq8f17GmGyvPiOSzt0XPhHxuJFK3Vo/DhgrTprtuGV32Vl+LX37xz/wj9JOq43aeEf3+0JAIDmI2SWBVnoxmtZ+drVWJ3KEvkjTBzK63xB7/V5Xeob+nXp4igJIVPeS/2bK3sGCZlVwwXrDAl1m3fW/6jtESZB2oTH4yPKdyKcyu02f/IJPWFf2MP3dnN/hEn9FVmdtmMjjzBZ2Y7msMWVoOi1vWwhs2plWWu45of+Vpit9wgTI6S6D0sNUv8Av6fjEOgubd3/gp7IOIdsx+8v1yGC44Dr93T4uHMc4LjmO2Q6tZ2EHteb8giTEO2J4AkAaBJCZlkEDzz38xB7ozy+H9qtBc2MDZXvWtQ+tNz+0fWGR9kfwt7h8HDvhIRMaeVOQt58aLlD/QOFTLe7QC4KMxob6i9dPK7cIZqbbrRN1P4G1Q+Hd9v+1W3B82HrfrZbTf18tK/KF7hsx6IKM2Ma6u/xaF9e29vh7kv5bpIRhAZe0tj060bdr1SGydo7Dvw8K9NoQ9Nz1p0/57J7z30MUn+/v6ftM627bS4BrKYdZvo0kLevHNzYccCxnoGOgT6Pa75DphzazuXkHtdr9ju372lCeyJkAgCabBWFzHYQZK4UgEg1OpcVcMRxHQCw+hAyW8HqmTce+F51V4jeZSB+hEw0guM6AABlhMyW8HqEQJ05ggCag5CJhnBcBwDAQshslZr5cvY5eQBiRchEoziuAwAgiZAJAAAAAIgQIRMAAAAAEBlCJgAAAAAgMoRMAAAAAEBkCJkAAAAAgMgQMgEAAAAAkSFkAgAAAAAiQ8gEAAAAAESGkAkAAAAAiAwhEwAAAAAQGUImAAAAACAyhEwAAAAAQGQImQAAAACAyBAyAQAAAACRIWQCAAAAACJDyAQAAAAARIaQCQAAAACIDCETAAAAABAZQiYAAAAAIDKETAAAAABAZAiZAAAAAIDIEDIBAAAAAJEhZAIAAAAAIkPIBAAAAABEhpAJAAAAAIgMIRMAAAAAEJn0hsyFMfVnOpTpH9NCzT9e0czQfero6FBHz5Bmim7/fp+GZq6oODOkng63z3J63zr1j13wX9bitIZ6MurI7NDYQk1hIuO/Hq20oJnRQfVlOjx+n4pioaDL8RVulQrZrhGOdTyo0/aldtmnna2UPaOeoWlVVbN4WYXL3hVv53pHqZHtYN/+rr9HHAozGh3oU6ajQx3lMtjPBf9d+T9L7vm1/HVRnpNqjgXV1ybJsKRCoVKW9tk3iyrM/J0G+rpW2leitmn6FecnlC/v8x3qyPRpID+h+dgPPmim9IZMXdBY/zqXE0vp3zo6vP+9dGAnZMbHKmNH6c+9rAuaHtqqjI8LcTSKkBmrVRsyiypMH1Rfpv7FXjvXO0rpCJlGp29HR/k4U3su+LnGE3x+bco5Kekhs/BrDfWtq2ozbbNvWtu2HHLi6YSAVJwf1Y5uY9ub+/nWvOb4GVIjxSHT42C8MKb+zDr1H/3Jyv+1n7Bsd0GbftCMuac1uYpaGNuhTEeXtubf9b7QCXAhjkYRMmO1akNmwi6gUy45IdPqEH5U+blrVun8nwuSohnnpISHzJbe/W6UdZ1HqInZh5oY+KI6OnrUf3C8fOeyOH9Sg31dXGekTIpDpnUAtDdY6+R1n4am39BQT6bmAs3+PkJmXKzfxsdBhpAZI0JmrAiZibiATrvkhUzz/BfgXJAUhMz24jmlCk1TatOO253fJHVSHTKdG2zpIN0zpJmi+b9t/24cxCsXcqOaM8fw14whd7sYv6b5ibwx9j+j7v4hjc2USmWGzLlpY25Kl/oG8pqYv6a6CjMaG+pXd3nYQY/6h8Y0U6gc+u0XpPbhSDV/VdvFqQ4/8Vc2q3xHByrza+zlsw9d8ZojUfpdK68zT3LXND/xcw319xj/bt+OVk+avZe80sO2Y2yuzklzQTNjL7n/ppKq2tLElPG7dijTN6D8xHyd7zDb4geaye8o/b4O27584D6m6fEXStv5ixqY+NDf9q98UPU8lUyfBsfPatrWrl3DjVuHSXFeE/n6318zT6O7Xwdt26ncCTQ6pfHB0mu7BzVRKPraD2p/yjH1Z5wulIpaOPFznbB3/BSnNdSTU/fAuAorHxCgLdReNNdsS7eL1ap5a13qGzypuWk/IbP03ZkdGp3+h1JvccYov999e0EzY0PqLw9zcqina4dZbf2rL1CNKQyOxx/bT+C6zfZrYtqcZxXgGOrr2OGmqMLMWPV7u/s1NDZT2sYG3/ui8/5gfqbzfuivHt4hs3QsdOz4rLSnep2i9fZnx3NQ92b11Qylu09DMx82fn6td0wy7qxUvbdeu/I8J7lvm5GqY5XDecF3yPRzDPKot739Fec1MbLf2Nft1ztWJ0Dt+dq5TRZVmDmhox5tudIeMuoZel3T5nzcQPP16m0L+/DsOr9XvXOrn3YkBTg3Ned8Eqj8NeWK8BzhxfVcjHaV7pBpm1spqXyBuNKIjbua5QN27XvKO+3mPm2uOpF02IKK045/TXP5R20HY+vAWRoeVD4J3qO+zV01r6s7nKP4rvJba99nf2/4kOmjDl4Kv9ZQn3P5Orq/p7F5Yxs0FDKLKkwMVp20XS9arTKVy2+917z4dlOae+P4PWZArbSH7u5ciG1nvb9HT/Rvrv0+a9tJlROJ2Uatz/ez/Vc+xGX7dauvr1uhQ6bf9jmX19aa/cu+j1nf3aXNffdUQvvWvOaW/H2P63a2h5riu8pvXVdzwlv5fqttBm8LoUJmYVwDNRfeGXX3bVa30+/gVL+q44u1Tf3u2z5f1+qQuaFb3Q5tqP6QuADHDqd3+2y7/vdFf59Zux/6r0e9O5kr3+8wXNXrTkTAbdJ4yAxyfg1+TPLdroKGTMf92azrlerv9wyZfo9BfuttdbY6fV7Gdu1UW27HNjl90AgxtmPYjtHKkMlSG9zQvcGhPn6GTvvZFiFDptO51Xc78ntuat75JHz5Iz5HuKm5JkMapDxk1obImiG09p6TqhAq4z0rB7m+wZOlA+I1zY99b+VkXnMCsH9+R+mOkNVDaR1ISt9rBKxM3wsaL11oVCZHew+NsQ7M5sFaxTmN7eiR8x1Zt4uDogoz+VIvVCVslS8WuncoX+6Ruqb5iZ+ovzvj7wLe3vNl3JUxT0YNDZe1/ltVOZ23hYx6ZbbmNbdQOulbd8S8vtpqD1W98sZKiOWLGeNkZr62XJ56PXbG+832U5wv3cEzAnG5DXWpb+jXRkgOsP3LF2N9GhidqdylK99BDRMyKxcjZtuuXGyXfpPyya5H/fnpyp2a+XEd7O+pOvGUt39mq4amjb5yn/uB4286l9dW24Iz5e9xGOlgtfngbSFMyLTe26W+gb8r9TCb+6rPkNnRoUzfQU2boxv87tvlfcsMQtYx0H78DBMyzdeEWPin3P6r27nfY2jQY4fz9q2+oC9/d83v6OdYaIVu85xjXKy7LUoXoB71h8s6dNKWX1dve/rfn/0Pl23w/Fr+fOtiOKPu/rwxmmZeEwf71W2GmSDtyvdw2Up7MbeN5/7kETL9H4P8HYvLx1Fz28ipPTu1Ga9907zDZ46YqT2vVL/W6VrLmf9tIf9DM13Prf7bUdBrtKacT2rK77M9RH2OcFL+Tj+jyNBOUh4y7aGytFNV9WhW98o6zeP0f0Ft3/GtnbjODhbgwsyRdaLt7tdQPq/8iPOwEu+QeU3z5aEU5oWN14Wf051gl7o5hTfrQqTmJNj4nMzi/IRG8nnl83ljiE7tMKuVk4R1p84YQuLK2h5Or7U+z/qeACcCz+9y2B72bec6JMz/9nefX2P1bIcJmdbFsr+OEsf9xNYR5PrdPvcDZxc01r/BFng2q2f/S9rfs7lSdmvRsKrfN+K2YG/brm29ctcqXDsKsm9bv2OP+oeOKp8/5jyEtNUhM+wx1PxsX8cOp22VUXf/fuXzeY04DYUPciy02rLPi2qn379ePfzMyawNlKVjga9y+dufw4fMkOdXz3OHLVgHaVdh5mQW5zUxsvIb5Y0h1PU7nKzfJMgxyN+x2Hz//MSxlbLlDxtTKCrbwk/ILAcshxFC5Y7eeoss+lq3Isi2UPCQ6XZu9dOOfJ2bmnw+qdl2ftpDE84RdkaHFAEzfVIfMqtDpFPPrDm/ZKk2hKqRkOnzAqfhCyTnIRaZvgEdrTt/Z+X9lbtV9t4uh2FsNX8e5fP1vFLrINV4yPRaGtszrPkaJmtsD5eTXfVJ1/0AHSxkOh3gbf/m1oZ8b//LHtu+9nfxvU/4ujhwGnrlMHyn7mrP/vYDtzIUJgbVXXVxubk0RG9z9RCxcpsL0xZChEyv39DXhZLbdwfZt12GvGX6NHD0RO3c6laFzJoLPv8hM/Cxw+Q4DLZLfQMvVeYjBTgW+l3Qyel1fuvha+Gf0vGx/Pm+5kwF25/Dh8yQ59eaoa1Ow/vqBdIGQ2b5LladbVM3ZAY4Bvk6FktVdw69to3986u+06pDnXO6rX7uz871U/Ygx2M1HjKDtCNf56Ymn0/cQrKfbRrlOaK6tO23ijQCSX/INIPlUu1QWMnsrf3QcW5W8kOmZPU6Vk2sL13ouM/fkaoPfk49SX4OMh4XHXGGTHNYyMDhUg/sMU3ML7hvR2NujL+lzAmZnuVvYsj099za+vuBq3KwvFwVOIszQ+rJ7NDYwge2u52rIWTaLiDnJzRStWhNR/W+064hM8yxo+Yz5jUxYtzxKV9klYaGxhEyA9TD3+qy5uifpfojV8z3+NyfExky7cfVSEOmOXx9QEdLd5tHJua15HvofPNCZmU6Qp8Gjpbuso5MaH6p9v2ETJ/tSFL9c1O7hsyA5winz1/1T1ZIr1UQMisnydHx/TVDYSVVhsCNnvAIoQkeLuvEXMHQdf6O0Ztqm99WW4aQS6bHOFzWfYiWdaC0fW75+7dp6Oj3fS76E2ZIS6Mh0+kOrMuQygiGy9ZuA7eA4DFkNcrhso6v9bnMucN+4O6a5vKP64tDJzRqhsnitIZ6Nqw8Vzdnbt8ohjcZ82LqDZd1+A0ba0eNPg7BXAWxTmeHwz6YpJAZ+NhRl7mapu0iv4nDZYPUw1/IVKX9j73lOEfTvVx+V4lM0nBZl/dGGTI9hr/XPRY0fbhsveeLB72TKY/zilyGy4YNmUkaLutDzbmpyeeTyIfL+uFwjqhCyEy7VRAyVTqYlFajdGzMKw19ZfWtAIGgbsiUcWA2FyYw5j+W77CGD5nWapuVeZSSOXTBeZih0UNlXyTC/vnWiaBvUKPG68qLOPg6SDV/4R/HBQuqHvvgtCqh1YtozTusPy8z+OT8RkOm7Tcq1ynIgit+Fv5xWqzDeeGfSrs2OicK08pbj02ot9iEsXjRygW4dZFtLjq08rqVRRTqz8n0ux94KvdOm7+ZcefB8Tv9tAVzO1iL77gs3lPTtp0WmAiz8I9Dr7fffduadmD+hpKxIqC9U8Ecdu+1eFSyQqa/Y4fL9q06xq/Ue2WUiP3CMOzCPzIeWO58xzNIPXyHzFLbzT3xA/3AoRPWeYP635+jX/in3vm1cuyvLKRVel9pMZP686EjCJlV513jmBEoZIY9Brkdi98oPa7KPAfYH2sVLGQGX/gnbMgMsi3UeMgM0I6CXqM15XxSU35/5+alyM8RWE1WR8gsH+TqDVXqcNwRGgqZXss6W4Gm0TuZHstQm6HJNWTWHerhtay2fQ6ngwCP0PD/AG6z/KWg6LkdbBdY5sqy1iYv+F1hNugy442GTLdHmBjl9DoJB3mEieOcis3qf6LH1g6d209m63/X/idsF4xev0u5Dl7L3Feviuq+P/rbD7w5L2zivqJmgMcHOA6v6tLW/S/oiUydwOQ256//0QYW/qlXfnPf9jqOmXcpXIZKZrZp//7HHYZcmxeU1e/1Gr4e/XBZ/8cOx7e7Pq7Dtp9G8ggTY+Xvmu0Q4BjoO2TKpfPFi//9uaGQGfb86vU7mB1ngdqVwznJcdt4lbm0fQKEzKgeYWK1U8+23NHhGNRW/vvKsPDa43PwR5iEDZlhjsfhQ6YCtCO/56Ymnk+cyu/r3Bz1OSLM74p2tTpCptGD7NYL67lKX0MhU6p9kG1H9UOXoxguW/Og39qH4IYPmc51cH3YuK/yOT3wN0jIdO61q/SuWQf6lUnn0xP7K3Uv97Lbn8cU7FmZ9R86HOGczOmzpd5Fl21X72Dt+0HQtofKZ/o0OH621Ltt+12qPtPqzf3AefhLzQOfnR9yX/Pwdodyem47H/tBPcWZg9rmdJGz7aDLHQq/D6Cu3bYDozMq2C923C5s7dt78KTmphscdi3J/75tr6e/1630gH/oMq/Xdkx2vBteqzkL//g4dri/u/q39drHfO+LDvuD7aH0zgv/+KtHqJAZcGign/25sZAphT6/1hyTHPbbQO0qwOiC8h1d83j4ksamX68ztNftnOL3GORUb/ux2LgTZ2zPo2NTmqipc+0oBefjs8P+4XDsaDxkBtgWUYRMx+3p8n2+z01NOp/4Lr/TuTnqc4TPbYu2t0pCJtCOGp0PAQCNCzbHEgAAQiaQYIRMAC1mLRDH3QYAQACETCCxCJkAWqRqzpff5wgDALCCkAkkFiETQIuUF8yzrVYLAIAPhEwAAAAAQGQImQAAAACAyBAyAQAAAACRIWQCAAAAACJDyAQAAAAARIaQCQAAAACIDCETAAAAABAZQiYAAAAAIDKETAAAAABAZAiZAAAAAIDIEDIBAAAAAJEhZAIAAAAAIkPIBAAAAABEhpAJAAAAAIgMIRMAAAAAEBlCJgAAAAAgMoRMAAAAAEBkCJkAAAAAgMgQMgEAAAAAkSFkAgAAAAAiQ8gEAAAAAESGkAkAAAAAiAwhEwAAAAAQmVUUMotaGNuhTEeHOjo61JHZobGFYrwlNdXgKAAABxVJREFUmMtra6ZDmf4xLXi+8oLG+tepI/OUjh59SpmOdeofu+DwgdMa6smooyOjnqFp1dTG+veeIc3EW1WENZ9Xn9VGnf4yfRrIT2g+pt8zeJvdobGFi5oY+KI6Orq0Nf9ubbuUpOK7ym/tUkfmUeXnrjWl7GiBwozGjg6oL2O02e5+DY0kuc0+pb8eHVB3R4cyW/Oacy3nh/XbNdrC0sSAcq7H2R71D/1cE/NxHZeuaS7/qPt53rQwpv5y276imaH73M8V5b/7NDRzJZ6qAIBhFYXM0gVF+cDr44DerDLUC7gLY+rPlIJj1UnF6XUr9XH/d5cAimSqFzJLf94Xw1EK0WalOiFyQdNDW5XhYj1FiipMH6wOl/Y223dQ04U4fu0wbbZ+gCzODKkn1n0PzeIdMq0Ova0amvbupoiM13m+zOoot0IjIRNAsq2ekGkEsvJf7Hf4rJOEV8C1nUhc70aWXpfp19Gj/crUXFD5+S4kjs+QGd+FQ4g2a/3X0h2lju5BTZTDRVGFiUF1d2TUPTCuQtPLjziUf2vPNhvXbx6yzRbGNdCdce4Y4c57qvgKmR32Y1cz+ekYKb3G13XLNc2PfW/lOLtjNLZRBABgWiUh0xgqm9mm/fsfLw2bbUEPXyk0uvZYWv9e7i0v9VbWnHwqJ5zp6SH11FxQub0PiVYOmd0amLBfjlsXDh3q6MipL/9ePGUK3GYr5V0ZBmaEC+tCPraLNzSfdRewFCT7f2IMNVzQzOhg5Q5nXMejUG3W6gCx36202jF33tOiEjLtx9miCjN/p4G+rthHPK3cKXf/vpV/99MGjXYc2+gBAKi1OkKm1QttDSst39VsxVBSK/w594jXnmhceuWL0xrqya2U3/zfVf/OfMy24ztkxtlBErTNmv9o7Xtf1MD4G5X/PfFhDOVGLMxh+45DSa9pLt+vrQOHNTIxH9PxNmybrR02W57jyTDZ1HAPmSVWZ5jbVJRmcO2sk4J0GldGkHxPY7HNKwWAWqsiZFpzaSq9ksb8zJYtAOQUcF1OJA5zK1fqZAUNh2E0zMdsT76Gy8Y/1DRwm615r1X2LvUN/ZphsilSe3xNhtBttjxsdofGPjzLMNkUqhsyVdDEQHfM02qsO+YOHYj17sxbym03xvmkAOBiFYRMY3J8+aLCXGm2hQsA2U9eTnckHV9vv0iqnV9UHULRNnyEzEzfoEZn4r6ACNpmTdbFUyvmQaPZKhfsSTvehG2zxrzhvs3qZphs6tQPmUuaz29bOebmBjSxFFPBXDqHfZ3Py6NGerRjbI72CqDl0h8yy4/5sA17cfvv8RSqdBFjWyjF9URiD5UrF09muauHfzEfs235Xfgn9p7qoG3WYAw9Y6hs+tS/YG+VBtqsMc+UYbLpk9iQabW7qo6R0vncs4OuMsybkSIAkiL1IbMylMvrgr0FQ6FqetNXThJuFzRVIdKpt7NqOE1tCEWb8JyTWVRhJq/+uOcKlb8+WJuV8ZqOji/qB0f/xGG1WbS7pA6XlRSyzUqV0SFMOUijQMNlYw2ZDp0ghXENdK/zuJvOSrIAkinlIdPvc6RauACQ1Tu5MKb+jMdFmhEslxx74o3PW/IzhBGJ5BkypdbMFbIEbLPmxc/AuApOq82i/dVd+KeohbHvqKd/v/JjMzH/7kHbrIWQmWaJXPjHUtUxYj2qzG1UUuX5tKwkCyBp0h0ynZ6N6fbXirliC2Pqz3xRAxMX65xIpMoQ2Z9r3HEobOVkNDq+n/mY7SrAncykt1nH52SW5w0xzy09jIXUOrrUN5B3f4RJK45LgY6zFkJmmnmFzOL8uA7298T+CBOjBCttr3tQE4UPPEclFedHtaM7w0qyABIpxSHTz+I+5p3OVswVs4LjT3S0f0OdixkrRN6jvs1dziedhTH1Z7q0ue8eZVhgpT35nZPZsotfn23WfHSJbb8qh09W7EyN6hWEPRatasn8xiDHWQshM80qIbPOX6uG9lt33I/+RP0Zl46Zwq811NfFSrIAEivFIdPfY0rMOZstWwBoQ7e63U4k5qvrzX1q6WJGiITfkNmyeY1+2uyCpoe2ejy83u2h92hflWF77qsiv6DxltxtCXactd5DyEwvXyGzpeHtQ00M3KMN3RtcOozNTvSkdkgCWO3SGzLNeUJegcsIZi1ZjdXzAczOr3UfcmbdmU3gAhzwp27ItA9HbAHPNus3QNY+9B4pUJjR2NGB6rDZ3a+hkYnWLkgS5Di78gZCZop5h8we9Q/9vLXHWFmdyu4ddYRMAEmX3pAJAAAAAIgdIRMAAAAAEBlCJgAAAAAgMoRMAAAAAEBkCJkAAAAAgMgQMgEAAAAAkSFkAgAAAAAiQ8gEAAAAAESGkAkAAAAAiAwhEwAAAAAQGUImAAAAACAyhEwAAAAAQGQImQAAAACAyPz/Ku1Wysb/ToUAAAAASUVORK5CYII=" width="400" /> </span><br />
<span style="font-size: large;">Socially efficient level of output is Q2 where MSB = MSC. To achieve that, the government must move MPC to MSC. Therefore the amount of indirect tax which is given by the vertical distance is VX. Answer is (B)</span><br />
<span style="font-size: large;"> <img alt="" height="233" 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" width="400" /> </span><br />
<span style="font-size: large;">Actual growth is achieved when a point below the PPC moves closer to the boundary (rise in AD). Potential growth is achieved when there is an outward shift of PPC (rise in LRAS). Answer is (B)</span><br />
<a href="https://www.blogger.com/blogger.g?blogID=4710215856934992447" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="https://www.blogger.com/blogger.g?blogID=4710215856934992447" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><span style="font-size: large;"><img alt="" height="295" 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" width="400" /> </span><br />
<span style="font-size: large;">GDP at factor cost = C + I + G + (X - M) - indirect tax + subsidy. The answer is therefore (A)</span><br />
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<span style="font-size: large;"><img alt="" height="132" 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" width="400" /> </span><br />
<span style="font-size: large;">Answer is (A). Pension is a transfer payment. It involves payments and receipts of money that do not involve buying and selling. That means there isn't any good or service that is being produced out of it and therefore there are expenditure and income but there isn't any output. </span><br />
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Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com0tag:blogger.com,1999:blog-4710215856934992447.post-24426950757662489712019-05-27T10:13:00.001-07:002019-05-27T10:13:54.820-07:00MCQ Walkthrough March 2019 9708/32 (India)<img alt="" height="193" 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" width="640" /><br />
<div style="text-align: justify;">
<span style="font-size: large;">SC = $100 million, PC = $40 million and EC = $ 60 million</span></div>
<div style="text-align: justify;">
<a href="https://www.blogger.com/blogger.g?blogID=4710215856934992447" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"><br /></a><span style="font-size: large;">SB = $ 100 million (since net social is 0), EB = $ 20 million and PB = $ 80 million. With this information the answer is therefore (A) </span></div>
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<span style="font-size: large;"><img alt="" height="376" 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" width="640" /> </span><br />
<div style="text-align: justify;">
<span style="font-size: large;">Allocative efficiency is when a firm is operating at the level of output where MC = AR. Answer is therefore (A)</span></div>
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<span style="font-size: large;"><img alt="" height="274" 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" width="640" /> </span><br />
<div style="text-align: justify;">
<span style="font-size: large;">The government will always consider a project which delivers the highest net social benefit (SB - SC). The answer is therefore (B) since its NSB = $36 bn</span></div>
<span style="font-size: large;"><img alt="" height="378" 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" width="640" /> </span><br />
<div style="text-align: justify;">
<span style="font-size: large;">Marginal utility = change in TU/ change in Q = (30-30)/ (6-5) = 0. Answer is therefore (D)</span></div>
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<span style="font-size: large;"><img alt="" height="325" 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" width="640" /> </span><br />
<div style="text-align: justify;">
<span style="font-size: large;">For a Giffen good (extreme inferior), its income effect outweighs its substitution effect. In this case, substitution effect would be positive as indicated by a movement from M to N. However, its income effect is so strong that it would eventually offset the initial increase in quantity. Therefore, the answer must be (A) which shows an overall decline in output X</span></div>
<span style="font-size: large;"><img alt="" height="231" 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" width="640" /> </span><br />
<div style="text-align: justify;">
<span style="font-size: large;">20($2) + 50($1) = $90. Selina would still have $10 left for her to save. The answer is A. (B) and (C) indicate that she would spend all her available income. Answer (D) implies that she would overspend her budget by an extra $10 </span></div>
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<span style="font-size: large;"><img alt="" height="375" 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" width="640" /> </span><br />
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<span style="font-size: large;">The condition for profit maximisation is MC = MR while the condition for revenue maximisation is MR = 0. Therefore it would involve a movement from R to S. Answer is (A)</span></div>
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" /> </span><span style="font-size: large;">This is related to satisficing where business managers attempt to deliver a minimum level of acceptable profit so as to please the shareholders. Meanwhile, it attempts to go for other goals. Answer is (B)</span></div>
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<span style="font-size: large;"><img alt="" height="257" 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" width="640" />The answer is (D). A contestable market is a market where the barriers to entry and exit are low. Since that is the case, it could be expected that there will be many firms that would join the industry over time. These firms would compete away the initial supernormal profits earned by the monopolist</span></div>
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<span style="font-size: large;"><img alt="" height="451" 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" width="640" /> </span><br />
<div style="text-align: justify;">
<span style="font-size: large;">The answer is (B). Firm Y is making a loss in the short-run. It will continue to operate since D = AR is above the AVC. However, if this were to persist, then it wouldn't make any business sense to continue the business into the long-run</span></div>
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9EuzvXI7R5QOt/fVM+7fm9bn5P1FIVNGmR7ugfUc+ViuX54lE9VkPxkWWTJWnI9Dd9tr+tTCJI+32c7C5JbfbdZ7k22RVF8FtvZ0371bs7nWq5/QFEr/atHf2g/tlhHCqj3mY+M6X5H7TJItha70a7bbeZItu+b2nnZpD28Qb1yOk8sttPrzIJkVdi2Xzs1bo2dpmFgf/yH5SK3neRtHv8x9F5j9a3+ZaD1RrTelT8ylNRnaGvvttW+GqsfWl83Fuw9ttNrYKnnVjnt6PEf6pg6ZTn0nk2DpAyXb11fd/D4D6Os9CE2oytLul4PnsPaBudutD7XNNSL4/E4hi0fbXMKQdL/8R8uQdKx136svM3rorcgVYOx5/Ef2g8K/guLaD8uDizm43R/0odq1XVpqPzNFcH7jt/lHrCLx3+0P+/494Ch+anmPdtSbL0BastHVp1CkPQ531sPbd3Fd5v7vSmM38k7p8V29rVffVyvZX3FVtUeU8Ncx9puQ+c1kDC+kZlaYGonQ1uH2m+BbNUjaX38h9EmdG0P76BeWe+5TkHS517o084kSB6Me1e/OilDz+bSLrDZfzUPcbU93HnsJtt5LMHAZ5iVv/MA1r6Hx0v3wbSdhwiXstIf+jrUKPMIkq1fheqb2FRu89+kMF/bKYv+4+ny2E6vpczztP3A8I0exG3uV9aaQ9R67IStLOtfDbWb1vSD5LNfHYfB9ujUF9vy92YZ9J0Dx7LyWoZd3K6HDeZHdR827fIA6ZHhgJ3yDHofKdK5/jweYH0aQVLErW7sK0iK+3XR+/7muGeP2oPeex++7rdC5fCPkD73p6XMs6vqOM17afte0n/fGSjD0XuA6/3N9kgNy/V6EvcAy8PSO9+BPUU20HbY5ro+jSAp4nq+d7PYzrbfbW73pjD+Xh4efzuB/eozfi03Q1rNwGE8S3Kg7datn91raXeL7aieOu36uv1ZZsV7x2GwYtlGKJP0D1nqx2f0EDZvcGgPe58/x3uuU5AUz3uh6334xQTJc7OLOSsefAMDALvWYjs4vlKW+X/Ka5cgufWmuI/CWGwHALA3BMleBw6Salw8DSBgOwTJ01L+KdnlxH/13Y22RZAEQRIADoUg2etQQbL9uJKtH+QNACekfLyTq/8cnqO2u40RJAEAOBSCZK8DBUltJcDOCpkAAHcESQAADoYgCQAAAADwQpAEAAAAAHghSAIAAAAAvJx5kPxL8uT1YVYLBAAAAIAX4jyDpMdDxN0ejCzS++DQu/GHHW9/PLORB+b2PaT4lFaBHXow+RdZrQ7wiJUtlauVfD72Tlj5PijZ9t4DPeZGOeaiKD4P1wYAAIDVGQbJT1JMXzdhr/X3WqbFp+al6tmNttdG11JoYbJ8zOQytH2mLRjt2DkHydXvksav9l+GW1nKLL2U8GRXgiRIbrRtgiQAAMDGzi5I1gEq/l4eFo/V0Nb/I6t5JkmkN1yf5DF7K2FwIfH0p6YHcjWTLJkYAVE1tieS3DxUPZBPsnj4ft3reejGsEOQPD32ILk+XwcI49s460cKvMAgCQAAgK2dWZBUYUX1zAzNkfxL8uSVvSG7zCXRA2Jvo/dUGuEEyb0669BzKnUYAAAAz8mZBckmmETTB1ltuthO1cith4VWwdI2THS9vZEhhXqjeTmX+2ksYRBIEMZy/bCet1kufpHr+GI9XDaMZXo/l5X5/q2Htpaymv8st2r7ap5nrm1L9HD3q8zur5u5pmEs02zTOaFmkFT/Wx8mrPa/Zz6qsZ9dWjkUvzXlPDBHtlwUkhnlcaO/Tv2o4DyUeSnzPF33flevj5JU8nmn5jidi7UnWRSZTFX96Hxmz9DWciHF3XttX2zn0CFIquvhMpPHTgEa10pVpneteceW8u+tw91rqW+Y9ui562Md2up63oyPqvbNPpTeHK1gO48/SLF40j6xKofwSu5n/67uCep+pvbzw0BdAAAAOIyzC5L6HMkw/k7+EU+8g+R6PuSFXGZ/rkPeQK+ZU4+aarhGbyWpG4CqYf9Wstm/LXM1tYb9ToJkKavZTWsBIj0cRVf3dbhQx/R19LUR9AIJgqZc/LgHyf75qGPbbsJIFH3VfX/4VrLHptHutB2vIKmGS1s+s7Vt93Ph9pm2EDY0V9g2bHuoR7L/NZ0fUobmHdvq9IZBcvM6IpYg6XreLB/lHCRdt6GC5DcSv7kwjqmaq2vd1kSu8sfT7dUHAABn5wyDpEi3d8GjN638U7LLi9ZiOzsLkkEoUZJV8zGfZJF/V/XaXEh8/Uu1b6qxqH3mLoJkvQ/6PM9SVvOfqt6NpgHfNI6NOaFqfzcajug6tLWZj6o3jMvFvVxFY0Mh1XuN3qnyUfIrY96rOs/BRJJsVvcClosHuUkm7ca96zDM+geD7ySve5lUuVnOp8O5qIOs1nvdrSPdEFb3zNf1ra8c3Ya2roObWc+r4eF1INPmEmtlOlgGmwRJn3M3dJ7M62nsvDkpm/nYWk9iHXyjK8nq3sMnWRQ/SBLpvb1NHQ7jG5np505dl62e16XM1agBFg8CAAAHdKZBUvlL8mQi8TStGuj6EDELFTjCS0ln2oDQXQVJs6FnzsU0/nsnBG4RJNtDfs3DXjdy26+1DOXdarVL1yDZvC5K3kuWZXLnMlxR9HIYDyOD522ZSxIOhZ4+VbAKJpKkt5JlH41hi+1jHj8XQ49McTvudVj5KFmWSZb92AyJ7IS/sTmSljnFZjm1DmQhxV223u5t8yieTp3eIEh6nTubTj12O2/jtAW4Wj8ODZWxOsfq3/rKQf13Y+Xparvr3s5NVu0FAADYzAsIkmqOZDXUry8E9YRIkR0GyZ7AuP8gaS5CNLx/vcd0kCAp1SNBjCHAwYXE0w8jc8HGhmCa5TEwJHEw9PQfo3XIahjL9PbnqmfQ51y4PtbD9jq9x9s2nNI3SJqBx/zf6mWq99e3TF2DpOe5sx6KWY9dztuYpcyzq2aEQfq79iOBCqpD+6yOu68czN5f45Cew6JVAADgrLygINnXgNeGFLaGnWl2udgOQdJt1dZyIcWd1oPmNGdtt0FyfNXeniNdFHKn9cLV4eYyk8fyMEGyHgYZxjK9rXoG7wpZfDHPoceqra3ePtuqx/qwzKncZlndo/ylb6j1noLk4LnqqcfD522wYLS5i7a5ii5Bsn+YcuszCJIAAOBEnFmQVAtVqLChB0lbg7nptVk/d7InoPQGiZ5eGdf3n/TQ1iMHSeO9zQqnQ691DZKeDe+tHlWhr7JZLSa096GtA+GwnnO5QZBUYSa6luLxvjuEdPQ62SRIdt+7dWhyqsfd82b/LK0H1jKaYc2njBnaCgAAnoczC5KlrIprLRg+VkHysZm7VC+io712tMdBNeL0eU/NQhnOi7AcMUj6L7ZzrCCpfgzQF5cRaXp9hhrL7kGyXrCl86iVhRQ3ycjCMH2HWD0Kw/xRQg3VNc/fxovtaHPxrD2XtkVv9M/fNEhqPZ1B0H1PvWiN3rOvLQYzGCS1wFgvMqMvXLPhuRs4T+b5GD1vHVpPY99oBrVJ9QNBfC332uvqBYJG50hqZc9iOwAA4AScWZCUkTla2rCzeuXHgeFmWsNsJ48bOGaQ3ODxH05BstPD1VsI9t41/fEaVU9yf1kHrdV0uzyC5GB5mCtm6kMTh873wCMeWj2QO3r8R907ZRnaOlSGWwTJJgTbhnoP7etYkDTqgn59vf9e3oWbnruBY3B5/MfgAl0uQ1ZVuQ49ukOfUzk0nNnj8R/O1yUAAMBmzi9IiojtQeydB6JbG639QbL7MPHA45EipxAkRdY9PLmkiRa0o0TSfN5qKB80SLYWKXlVz2ft7GcwkSTNRxY+8QmS1X83H2pv3U5Pz5iV5dEzljJ2PRdr3brXrs89i+2oHnPtPbf5b1K4DoMdLOO+OZ6qV1ALSdMPks9+HanDljJRPY49c5Tdzp2FtWfd9bzpfIKkOifGPaSzjbF5seZ+hhIlaXcRKoIkAADYs/MMkjV9jiQAAAAAYBcIkgAAAAAAL2ceJAEAAAAAu0aQBAAAAAB4IUgCAAAAALwQJAEAAAAAXgiSAAAAAAAvBEkAAAAAgBeCJAAAAADAC0ESAAAAAOCFIAkAAAAA8EKQBAAAAAB4IUgCAAAAALwQJAEAAAAAXgiSAAAAAAAvBEkAAAAAgBeCJAAAAADAC0ESAAAAAOCFIAkAAAAA8EKQBAAAAAB4IUgCAAAAALwQJAEAAAAAXgiSAAAAAAAvBEkAAAAAgBeCJAAAAADAC0ESAAAAAOCFIAkAAAAA8EKQBAAAAAB4IUgCAAAAALwQJAEAAAAAXgiSAAAAAAAv5xUkl7kkYSBhksuy849/yzz9VoIgkGCSyrzs+/dvJZ3/LeU8lUnQ91lbKj/L6nNnB05bOZN0EvaU3Quzl7JQ9e+VJPlfu/rQ3dfjU6kHHtdQuVrJ5/p/VPsfXkm+PKeK3L5/7VOrPNV/WxSSTWMJg2B9jw1jmWaFLM6piAEAQMt5BUn5S/LkVU8jsfq3IBj+96qBvJ8gWcpqdiNxuP/G3s6dSoA4BQTJI9YDn2toKbP0UkJ9XwmSW7CUp4iUi3u5isL1vdX4Cy8zeTynYgYAALUzC5IDjallLkn4SpLbH9b/12ysG72Z+wmSh+s12LmjB4gTQpA8Yj3wuIZs+3q2QfIArOf+kxTT1xIEE0luHuoeyHLxi1zHFzuvzwAA4HScWZBUDWez8VLKMr+SMPhW0tn/knQSdhrW5vsIkoajB4gTQpAkSL5EA+VprV+DUw0AAMBzd3ZB0t54qRqfk1Tmpf7/G/+uNU6bBvi9PM5/kml8MTj3p1wUcpcmEunDuuKpZMVC1i/Vhtaqv9HG+JMsiqzZdhBKlKSSz9vNsvFti9YIfC/FTDue4ELiaSbF4mm4XPVG5HImWTIZmQtl2/cfxrfjdeylrOY/y60+NytKJM3nstJfNU9lEoQySX+V2f21xOHIPK5yIUU2bV4XTCRJc5mvVHeL2aDuD4H2IFfKyqhT1w//JTPrZ3iU42ou93VZXEh8/Ys8ztyDpF89cq0HS5nnH0bOo2v5eVxD1X2geW0ok3QmpR4kH2ft8rJeB5vX46be/SHLeSaJGv4ZJXJjKdMw+Sizh++revdapsWnDcrQCNi2uqz1HLb215znqF9LfeU5VADLXJLQ4XUAAOBZOr8gacx1FJGqofZV1aDReifrBlf3PXUD9k0sb1oNqHWj8zL7s2kcrR5k2jNHqGnY+QbJJ3nM3jaNOv0vfCvZ45PHtqUJAF9HEnWOx2Euk3p/9FaSukHbNCqjq3utceq4771c3q/mytmOu70/qkH/dfS15TONc1n+KdmleXxGGW0VJEtZFdetsLb+iySOI+MzPMrRWg9CieI3ErkESd965FQPqjl11s+cyFX+WJX7MYLkNxK/6Z7n9nWwXT1W9S56985ST7XjV0FSv9fUn+9bhvq5cqjLal8fM7m0XkvV9eEbJFe/SxpfOF7vAADgOTrDINkNip3hruYv5a2gKdp7qp6K61+qxvGTLPLv1iGgEyImkmQzrSdMvVZvcHkMy1MNtzCW6wfVe6EaleozPbatGtBGj0qzUMbIPvW+X82F0spbNUqjK8nqXpMnWRQ/SBKF46HV5djr/dF7WPSevu4w5fZrbedS1Z1Awvh7eVC9TqpRrI5xmyBZB5lYpveq53Qp8+yqCpfafjuXo9r+hcTTn6qe01JWWi/YcJDcRT2y1ANV7q0euKXMVa9wPbzUJ4jvaGircY5t18G29bj3HqJ6HaNrKValtk8XEqe/W3rTfcpQ7b8KwaFESab1pi+kuEkkav2AogK6vp/aDzWq/FyHNdfXix50AQDAuTnDIGkGxyoc6HOijHk9tnmVvXPLhuZYlQsp7jLJskyy22Y4mX8jWAUaj2FhY9vu3W/HuXkDx90M4dPDre0Ybb3Bmx173dszfWg1vEWaADC6cFLnmFSD2jFUbxAk22WlU4uWqM/wKMfeBn7T++k8T23jero5Ff0AACAASURBVNRXD/QhmooKOeaxHjBIjl4H29bjofmpxvGP7pNPGY7VCZHOCAz1w81YQHQJknUvKCESAIBzd5ZBsh0ULUNdVaMrvJJ8+aUbNMUzSJaPkl9NeoYFbtII9lh4xXXbvY1AzyBpa0S25qVahh92/oa25bI/qiHf8xpjX3vDm3kuXRdi2ThIDu23+W8e5Ti0qInrgidb1yNzW0OP4ukLnacUJLetx0M/Ghj/1rtPm5RhVS6doai24bnrz3VekGk0SKo6bAwXBwAAZ+k8g6QeHr90h62KqEbYt5LOP1kW3/EJkqoBt16Y5DZb9+bcFQv5snEj2DVIemz7pILkUG8jQdI9yFTHtHWQ3EU9Mrf1EoKkW6/5yQbJ6rW7C5LD+wsAAM7LmQbJZjjr/cN7y+NApHmu5P3PA0HTIUgODCus59vta2irz7Z3FSTVvK5OWbkMbXWxr6GtDkFy50Nbu+ehf799hlb27E/vuRkJCZvUI+d6sM3Q1m2uoZ7j2snQVjf9Zd8zDPVgQ1sNOxvaSpAEAOAlOdMgKVXj6ELexN90hq2urRs965USu41F7yDZWpBDWwxj00awdcEZbaGOurfVcdu7CpKtxTv0xW26i5SE8bXca48oKBcPcpNMxo/f59idF9txCZI9i+2UC3m4jrsL/VgX6bmR2dBiN9ocsmZhm+HFdsbL0bawisdiOz512KceOC8U41F+BwuS29fj1iJP+rlWx28uYtM773SbxXb0BZhE9MWCmnKxLbYj3QWUfMIpAAA4e+cbJPXVGa2N6GY431ADbnxo68AjAjpzJJsGs20J/rahz1U9FB7b3lmPZM9jH1o9bEOPLOiuTLnZsfs//mM8SIoMPTKhs8qmXpbWoYQXcvn+e3kXtuuAdb/DN5K8mxjnwaMc65Uyjdckbx0W29mgHm1dD4zFWDzKz/0a0oenVvP2vBad2q4eDz/+Q+tlHBxSvcXjP6x1QtW3S0lnWjjuffyHfk4t5dk6YMeh4QAA4Cycb5CsG1b9QySHhv35LbajltTXGpnTD5LPfu2+dqU/xH2swWU+DN32gHjHbe9yjqT5IPr6MRbD+956wPkoh2OXUlbzXNJkMrgNryCpyrT1EHfjYfXWsjT2RZWLdY5i97XXD/8lM+t58CjH1VzyVNWFde/S48x1/tsG9cipHixlnqd1z+K6JzOVfN654tzLz/kasvRqeq9evHk9burdb/KoetNtxz8awFzKsKentlOX+8pfpFwUkk3jJrSGsUyzQnsu6EgvN0ESAIAX5YyDJAAcz9BiO7u3/ZxOAAAAHwRJANiDwwZJ9RxSgiQAADgMgiQA7MGhgmSzqI/LcHkAAIDdIEgCwB4cJkjqi4bpqxwDAADsF0ESAAAAAOCFIAkAAAAA8EKQBAAAAAB4IUgCAAAAALwQJAEAAAAAXgiSAAAAAAAvBEkAAAAAgBeCJAAAAADAC0ESAAAAAOCFIAkAAAAA8EKQBAAAAAB4IUgCAAAAALwQJAEAAAAAXgiSAAAAAAAvBEkAAAAAgBeCJAAAAADAC0ESAAAAAOCFIAkAAAAA8EKQBAAAAAB4IUgCAAAAALwQJAEAAAAAXgiSAAAAAAAvBEkAAAAAgJczD5KlLPMrCYNAgiCQILySfFkeYTdmkk7C9T4M/W26f+VnWX0+wnF5KuepTIJQJulMTnZvHcpyfRyBhEkuywPt1vF8kdXq78NtrlX+f8s8/VaC4JUk+V+H24cjKVcr+XzsnXDgdB2re94klfnJXuya1Vzup3H1XRHK5J//l/xzElruyQe+HgAAOGFnHiT/kjx5pYW1IzVI9xYkS1nNbiQOv5V0fvqNm9MOku5l+WKC5Op3SeNXBzpftvJ/KUFyKbP0UsJnErrOL0iqeqZ9T9z/3+v91+/JB70eAAA4fecdJJe5JKER1o7RsFGNqp33iKoGEEFye8+rLA/hsOfLVv4vJEg+q9B1jkGy+sExfCvZ41Pvq077/gUAwOGdcZDUhrWG/03ev/+PatjSEYICQVJETr0h9rzK8hAIkgfyrELXOQfJ4fvzad+/AAA4vPMNkuWfkl1eSKCGINa9k0doCPgGydWDTKOw+wu5+u/Rd5IvHo1hu0Zva7mQIptKXPfITiS5eZCFvvlqv8Lko8wevq9e+1qmxf/bNOqL37S5Q4GE8VSyYmGU35Msin9Jmky0/bmQeJpJsWj236shZtv/NJf5Sn/nUub5B5nGF9VrQomSVPK5OeB0KfM8lSQKe15nDoEe7rm2Dm1dzSVPE4mCof3tPVhZzX/SjuNC4umt3Kf/IaEWotbbfSXJ/W/ycF2dk+haimob5aKQTDtXQZTITedcVWV7914rj0CCMJZpVlT1w5hb3PkB5kkWRWaU+w+tc12HwPBK7mf/luv4Yv266YOsOsffV/56kPx/ZH5/XdeH3dTDX2WmfWa7DMY4lIHLdTz7aIyaaF8fLue0v158Pt51rAfJ5Uwy9Zm9ZexRp5yPZ7z81LXcqXtf9Hv2l5HrAQCAl+lsg2TTQFANca2xeuhFd7x7JNV8sUDCy0weSxGRT1JMX1dB75MMhh8tRJt/zec1+xW+ieVN3Zh+K9njsm7AR9FXlrmcesO4lFVxrQWo/qHEzkHSaf+reWXW7U7kKn+stvEkj9lb++vq49gySLqWd9+5Hiq/TpC8kDfxN00Duvr88jGTS3MYdxUELrM/tfJW9cj2WnVuhoKkS3mKNEHyG4nfXPTsizIWJNvHvKt6+HX0teU4+vZR51oGDtdxZ/h9c324ntP+evH38a5jdc+L3koSm9dGKNHVvRYmPeuU0/G4lR9BEgCAzZ1pkNQWT6jDm944PvBQOafFdsyGmWpcXchl9l+yLK4l6vTo2IYDqveFEiVZ0yNWLqS4SSTSG6H1fl1InP5u+dyg/Qt++Sj51aS9r3WD8UoyvSewfm2zb25BsjlPYfy9PKgeidXvksYX9efVDcBWD8Oy6bVS573ev+8kr3s3nmSRfydRa1/ch7aaQVIdV6txbDl++4epczCRJJtV52Ap8+yqatSbQTKQILyUdKaXtQqy+meIlIsHuUkmrQZ2va963RCRcnEvV1E4GhjqxnnrfD/JovhBkijUAlNTh8L4RmajPbNDQ1sDCcJYrh92WQ/XPzg0vfSqTgz/iOBXBuv/Pnod24aBep9TS7045nVc1+t2z2K5+KXqndY+b4M6NX487uVnHdpq+fGPoa0AALSdZ5DUgltr+GHffz/g/rgHSWkaQ9EbiaOwNYxxzdL4HpybVDWY6p7Lvp7S/rlpQyuWlotC7rJMsiyT23o4mRmExhpiqndqKICp/VO9szrVcDd7oieSpLeSZR+N4XLmZ26waqvqVYoSSbNMsjvX4ZFDZdI9B31lP1iuy1yS0PZvT7IoPkqWZZJlPzZDCgcbzkNlpH4AUP/mO7/Rb47k9vXQ8l6nkQM+ZaD+88h1bLlmfc5pf1kc8ToeKMv2+3dTp/p+3HG7JgiSAABs4iyDpHW40sgwqP3u0OaL7TTDs2yhydIIs61U2zl2o7euN0h2G3e2Bmjdm2Xd3u4aoI3hxTHa22mGF7bLIJbp7c9ar9wWQbJnmG0YT+U2n1vmBNafVDWUbWGr+2/2xr9tGGr3r3mP1vM2VDc65aiV++C21P4ePkhuXQ996p5TGWgfPXQdd4Kk3zkdD5JHvI5tP2hV96j1tjepU2PH43tNECQBANjEGQZJ85lgHj2A+7JxkNTnLdnmbm0YJNXrdxEk9eGx0x+rHq6PUiyWPT1qhw6S1X9bFHJ3O+0Eyu6wuU2fI7nu4bvVF/boPW/1Jx0sSKoGfTMMMpbp7brXKbsrZPHFpeHs0ug3e5oOFCR3UQ93FiTNzx65jjcMkuY53SpI7us63kmQHO+93CRINvtGkAQAYBPnFySdgpTZkNizDYOk6sUIL/+n3P5DX2hH8R3a6rpf7g3Q/saVaiAee2irjb7aqzlsbtMgaVjNJVfBdXThnj0ObbV+puUY1XWz8dDWvm0dJkjupB5uPbTVbvQ69h3aan7+DoLkzq/jes6lORzfZ2iraRfHY0OQBABgE2cWJF0W1NF7LG1BZB+7tUGQVPOq1BDc+pEBesNsaLGdC4mnP2lDN5vFK9znSLo32FqLt6zm2tL8vkGyZ7GdclE92mD9/i+ei+20PkukWbynPvZtF9u5kPj6F21upLZi51Dg7Ftsp34shcvcPlVXYpnea0Np6wWWzEa7vi3j0SMjDec6FMXXcq8tylIvYnKkOZI7qYeO16l7GYjbdTy02M7oOd1tkNzZddxabEd9pl7XuovtuNcplx5W9/IjSAIAsJkzC5Juj/jQ51AeZNEdp8V29MaavtKjGganhsfpKz62h3DVwzTrFU4t29BXdtzJ0Nb+R19sNLdq7DPrBvgOHv/hUpa23fMqg7EfK3wf/2Grsz3zQNWxaKum9j8SQdUPrS7ovfv1nOKhctdX//UNkrby9xnauoN66PyDj2sZuF7H+vBO9VqPc7qToa07vo7HHv/RWn3at065zPl0Lz/XIGm/Hro9tgAAvBTnFSS1L3q3XqDhwLkznkGyGQpnhhnzWZIistIf9q03hBZSZPqcwFCiJJW8tbT/rhbbUT0HqpG1XshmVrzffLhZZ/+7D0ZfD1FN172sfcdofV2wXmHVXAinryzNXbM13FdzydNEC4R9+2L9xHavYHAh8fRW7tP/cJgjqReZ8fD1YCJJmrce89Hqma4b1VO5zX+TohPa7I8h6T483laevkFSLOX/2XOxnS3rodfIgfEycL+OS1nNs/qctI9p/JzubrGdHV7Hei/rUj+vRg+hR3n6Ho9r+TkHSev1QJAEALxc5xUkgbPhPxcPAAAAOBSCJHBMagXL1hxOrYfqED3mAAAAgCeCJHBUQ48/GHp0CAAAAHA8BEng2DrzQdfzFrN6NVoAAADgtBAkAQAAAABeCJIAAAAAAC8ESQAAAACAF4IkAAAAAMALQRIAAAAA4IUgCQAAAADwQpAEAAAAAHghSAIAAAAAvBAkAQAAAABeCJIAAAAAAC8ESQAAAACAF4IkAAAAAMALQRIAAAAA4IUgCQAAAADwQpAEAAAAAHghSAIAAAAAvBAkAQAAAABeCJIAAAAAAC8ESQAAAACAF4IkAAAAAMDLGQbJ/y1Z/JUEQdDzdyHxNJNi8XS4XSpnkk7C3n0K46nc5nNZuXzUPJVJEEiY5LLc605/kdXq771u4XAcjkWdo/BK8mV5mN06onK1ks8H21q7/A9Xh09A+VlWn59BfVL1f5LK/GR395zuSQAAPH8vMEhWf+FbyR4PFCZHgqQKuJfZnzLWhjtII3z1u6TxK5mks9H9OXmux/JiguRSZumlhIcKDJbyfxlBspTV7Ebi8FtJ588g/Jx6kDynexIAAGfi5QbJIDxco2SwkVbKap5JEp1OiFk39A9YPnt0TseyEwcODLbyfxlB8m+Zp99KEBAkd4HrGACA03PWQfKraSFfjH8tF/dyFVW9g3Emi0Ps0mgjrZRlfiVh8EqS/K9D7NGgc2q0ndOx7ARB8kAIkrvEdQwAwOl5wUHyVHokRZogqfapaoSGV3I/+7dcxxcSBKFE0wdZthrh6nW2YbrNZ9S9nOVCirv3697PeohvLNOskEWp74fec6s3hJ9kUWQyjS/qXt0o+cFjvqnt/ankcz1OlLKa/yy307jZjyiRtDOHtJTVPJc0mTT72nrd2LH0nKNWr/BS5nmqlZdtfwes5nKvHUcYTyW7T+VdqIWoarth8lFmD99LHAYSBK9lWnyq9mshRTat/nsgQTCR5OahOl9m2f6rXR7mfOBlLknY3ytfLgrJjHK/KRata2TdoH8lyf1v8nBdvTa6lmJl7lB/+TdB8l4e5z819aFVF7VPWhRylyYSGfOKM33f6mvsvRQz7TM950SPl8EnKaavLUPR1X+fyFX+v+Q+edUeAaFf+y7ndKBeNKHqV5ndXzefs5PycwiStv1Pc5m36sCRrmMAAHAwZx0kB/+sjd898e6RVCHwG4nfNA3iy+xP+WL05vT+Ul83RFWvj2roDg3zHWq0Pclj9tb4N5/5pi7vV/PK7PsYXd3XjeTyMZNL6+tUA3/bILnl8a4eZBoNLLBkBsk3sbwJjc8v/5Ts8sL+/stMHpsUIKviuhUUrCFmIEiOl2e1pXkqk+BC3sTfNAG5tS9mnR4Ikvox92xvuBy186nO39eRRJbjsO+jsceOZbCer3fRrrfFtUTVjz0r+UvyviDpek4H6oW65r+OvrbUzy3LbyxIOu3/Ea9jAABwMC8zSIaxTO/dVkndicFG2lLmqlehDjFqWFwgYXwjMy3wdoYFqoZd67O7Q2VV4zNKslbPQd1Dq73fOhxRNfiiK8nqHrknWRQ/SBKF4w11FWLCWK4fVE9ItfCL2la9KJHeQ1PKqu61MoJ2MJGr/FHrUXM7lsFzpM6B+t/Rd5LXvVlPssi/k2j089T+6eWtzYW1BMkguJA4/V2rkyrIGuesXEhxk0ikB4Z6X/VzIyLlo+RXk/HAUIeDiSTZrN6HcvEgN8mkFZxV/QvCS0ln4z2zQ0Nbg+BC4utfqvOsylYLXdp51vfLeh7qcmz3kjcjEEbCh0cZrIt2fT2El5k8Lquw1vpxyja0dYNz2qkXevnp18mOym8wSDahLoy/lwd1XahgrY71mNcxAAA4mJcZJFUj1mig7Y33qq2qgdWdM9mdX6Yad3qDteoRsTYKn2RRfJQsyyTLftSGFTZDOruNtqH5XrbtdwrAGLrb8yoVdqcPnfNSN9yTXJba50XJe8myTO6MIZjmZ/qv2qp6lSaSpLeSZR/dh/AONMq7PwT0rBY72LDvP7/lopC7LJMsy7RhhVo9snzuYBktc0lCrefSc36j1xzJoZVzy4UUd+vjym6bYZWj5ThwLY3tZ18ZrKlQGEkcR9Iajtzarmuvn3FOB8pir+U3GCTVNTEcyo96HQMAgIM56yBpmyMpq5lkaj7OoVZJHQyS60ZUuwHlEySl29DtafjWPRbWXtqhIGkZqtf5G2qouzTmRxYcMhu6dS+I8ePA9ENrDuPmQbJneF4Yy/T2Z2M+mKHqfbWGLfPf+hr/nWGoI+dMX0Rq6Nx0AoNt6KBl2GJrKPUBg2Tdqzq8X/1ByKfuuZVB8zbVi2kLTZYg6XNOR4Nk/3D23ZbfyOf3luWRrmMAAHAwLy9IisiXYipfHXKujfeKiJ5BstWbYe8hbIYkxjK9rXom7gpZfOk2DjcLkkONvD0ESZGql0XrVa0b4+ZQzE2CpNpEIXe3006gHBzKe6gg2RlKeCHx9Meqt/mjFItlt9w3DJLq9YcNkvoQ76ncVj2td8WiM1f4EEGy89na/MNufdgwSJrndKsguYvyG/r8obI80nUMAAAO5uUFSb1H8myCpGq8vZZpMbcMexwYmlrPXdx0aKtTAex4aKt9G80qkeZQzM2DZNtS5vmHqsHrsHDP3oa22j7TdozqB4AthrZat3WgINlbBtpcvZ0EyQ2CiuqNDP+bpLf/XVtox9zuBgva2MrCZV/3Un66XQ9ttb57u+sYAAAczFkHydG/Qz0zbe9BUtuGtXfQtuiGvvjFWJDUGoDxtdzrQ87UYiRjIdO62M6TLNSjDSapzFXvqOsiHa3PEmkW7+kuMrTpYjutRUVEtBU7hwJn32I7TXmPz+1Tc/AuJJ7+pA2lbRY4avcSGgu4tB49Mhwkm1BkLEJVLwJzpDmS1kWEtMWpdhgkfcpAPzfrec1qRWR9nuTQYjvj53SnQXKr8mttwL7YTrmoHgWz4aJZu7yOAQDAwbzgIGkujrFHhwiS2jA2a+Ozd5n97ny71hC8eniZatzZ3u+ycNHA4zTqc7GLxwYE7dUzrccycI5cHv/R09vS4vn4D2swtc4fU8eirZo68EiGwAySrWHKzSMW+su9vXKwb5C0lb/70Nahc7DjIOlTBvqKrWpbK3Pl1vZw2fq1zud0F0Nbd1F+ZjEN1DXt2A9zHVt63AEAwMG8yCDZeRj3vh0kSI418rVeD60cbvPfpOhsaynz7KpamEf/70+yKLL2XCbrQ8b7dN/fPRdjDygfeJ31weh9x2IWnq3hvpR5nrbKzOt4W72C1bHep/LOZY5kvV/mw99DiZK0tRDJ+mWqZ1g1tteLAs2K951Vfq2PIZH1fNBMf4C8pTy9g6Sl/P0W21E9gtqPFtMPks9+dRzG6RokHcug7rk0f5QwnyUp/Qt7uZzTnS22s235WQvJ2P8LiaeZsarxIa5jgiQAAMd0hkESOF0M0QMAAMA5IEgCO1f1lJhzv+oeKnpQAAAA8LwRJIGdG36cxOCjQwAAAIBngCAJ7IVlPmkYyzQr6oVGAAAAgOeKIAkAAAAA8EKQBAAAAAB4IUgCAAAAALwQJAEAAAAAXgiSAAAAAAAvBEkAAAAAgBeCJAAAAADAC0ESAAAAAOCFIAkAAAAA8EKQBAAAAAB4IUgCAAAAALwQJAEAAAAAXgiSAAAAAAAvBEkAAAAAgBeCJAAAAADAC0ESAAAAAOCFIAkAAAAA8EKQBAAAAAB4IUgCAAAAALycd5BczSW/nUocBhIE1V+USHpXyKI84H6UM0knYbMPxl8YT+U2n8vK5aPmqUyCQMIkl+Ved/qLrFZ/73ULh+NwLOochVeSLw9ZOY6jXK3k88G21i7/w9XhAztYHdrttbk+H6FM0pmcfs0vZTX/SabxRXX//Fb+mf0Pe30qP8vq8+kfEQAAz9WZBslSVrObdoDshLcbma0O1MgYCZLrvwu5zP4cbcgdpBG++l3S+NUzaViOcD2WFxMklzJLLyWcpDI/xGFayp8guYU9XJvPKkia99LwSu4f/mnUJ3X//1bS+bn8GAYAwOk5yyBZPmZyORAi13+hRNMHp17A7XeoavxYG++lrOaZJNHphJhn1bAccU7HshODdXEPm7OU/9kGyQPYR31+VtfIMpckDCS8zOSxd2f/lnn6rQQBQRIAgH06wyD5SYrp6yYsJj9IsXiq/m0p8/vrpqfyUMFttPFeyjK/kjB4JUn+1/73Z8SzaliOOKdj2QmC5LNGkKyC5GDdIUgCAHAI5xckq4ZGEPT9av0kj1kil9Mf5a5YHKbh5BwkVWOuagiFV3I/+7dcxxd1D+qy1QhXr3sr2eOT8ZnNZ9RhuVxIcfd+3ftZDw2LZZqpOaNqP/SeW70x9iSLItPmJ5lBfYzt/ankc71JWMpq/rPcTuNmP6JE0s4c0lJW81zSZNKe/1q/buxYes5R68eFpczzVCsv2/4OWM3lXjuOMJ5Kdp/KO70hXG03TD7K7OH76keO1zItPlX7tZAi0+f5TiS5ebDM8X2SRfGvdnkEFxJPs+b8aNeGOp5WwFsUkhnlfmNcI+vQ8UqS+9/k4bp6bXQtRWeYeH/5N0HyXh71+W6tuqh90qKQuzSRyJhXnOn7Vl9j76WY6XPojDLoo1+jy5lkdTl2y7u3DJZ/tOrQ+nX2Iev1Z6gfjo54bTZB8g9ZqtERtjJuTsh4nfQ+H2P7r8Jht/5+ad0T/5I8edV+3aGGcQMA8MKcXZBUjdTgRHr3RGSDHkkVAr+R+E3TALvM/jQaTQO9CXVAUb/c6z213WG+6/cPNVaf5DF7a/ybavDagqzJ5f1Dc1tDia7u68Zq//Bl1XDfNkhuebyrB5lGAwssmUHyTSxvQuPzyz8lu7ywv7/1I0kpq+K6FbSsDemBIDlentWWqnD0Jv6mCcjWH2wcgqR+zD3bGy5H7Xyq8/d1JJHlOIaHQmrvj95KEptlbtS9vjL4YtSh3uve/JHnuNemuodE795Zrr2JXOWPWmB3rJNe58Nl/wmSAACcmrMLkl+KqXw1FhoObTBIasNt64Zl02gyFwXqDAtUDbvWZ3eHytaNxSSTuf55i3u5itr7Zh2OqIJGdCVZ3SP3JIviB0micLyhrkJMGMv1g+rlqBZ+UduqF9LQezj0VRqNoG00cl2PZfAcmSEg+k7yulfkSRb5dxKNfp7aP728tbmwliAZBBcSp79rva6qcW2cs3IhxU0ikR646n3Vz42IlI+SX03sgUuvL3U4mEiSzep9KBcPcpNMWmGk/qEmvJR0Nt4zOzS0NQguJL7+pTrPqmz1hn9znvX9sp6HuhzbPVl1nRi7H2iLuITx9/JQv/+XakRA00vcWwa9P0YY2zaGZx772mzOh37dPclC9ZDX29+gTjqcD6/9twxt7Q6VZmgrAACHcMZBMpJpcZCldMZ5r9qqGkLdXtVuo0mFRr3RVP0qbw2uT7IoPkqWZZJlP2rDCpshnd3G6lDDzLb9TgEYQ3d7XqUa1JZFkFRjc33czedFyXvJsqx3mPLGQbLu2ZhIkt5Kln10H8I78MNB94eAnpU+B3986D+/5aKQuyyTLMu04cH6EMru5w6W0TKXJNR6Lj3nN3rNkRxa9bRcSHG3Pq5Me6TPaDkOXEvtz+/fdrvuee6/UX7D18sxrs2hc2p8tk+ddD4fnvtPkAQA4GScXZA86aGtPUPXouS9EYR8gqR0G6udxqtIq8fHOoRsqLFqGS7W+Rsqb5fG/MiCQ2YjdvW7pJ0hiBcSTz+05jBuHiR7htmGsUxvf271HHUMLQhi/ltfg7szDHXknNU9PSPnphMGbEMmLUMRx0JUX7FuGyTrXtXh/RodRuoaJG0hyfg3vyBshn7bjwDHvDaHrhHjmvSpk87nw3P/CZIAAJyMswuS44vtlLLM/1MmyXvJOgu47In3SpmeQbLVOLX3QjTD8WKZ3lY9O3eFLMx5XbJpY3UorO0hSIpUvVRaz03dmDWHYm4SJNUmCrm7nXYC5eBwwUMFSbOnKLiQePpj1aP1UYrFslvuGwbJ0RDVV6xbBUl9iPdUbque1rti0ZkrfLpB0rgeLT/yHPfa3HGQHO293CRImj+SESQBADgF5xckWw0Tc4VA4/EfMP3TRQAADVtJREFUh2po7D1Iqgbfa5kWc0uPx0DDqp67uOnwOacC2PHQVvs2mtVezaGYmwfJtqXM8w9VcHVYuGdvQ1ttn2k7RnUtbDG01bqtAwXJ3jJowu/Og6RtaKtxDN5Dc6vwGE1/lcfOjzzHvjaHrjufoa3mh7qeD8/9J0gCAHAyzjBIysAKlB69SjvdoX0HSW0b1h4I26Il+iI2Y41VLcjF13KvDx1VC7KMNdqsi+0YC3qoHhjXxXZanyXSLN7TXWRo08V29IVXRKQZUjsYOPsW22nKe3xun1rY5ELi6U/aUNpmEZJ2D5mxAErr0SPDQbJebCeMZXqv9dLXi6gcaY6kdRGh9o9BOw+SvedMWxzGe46nseKo9Uee412brcV26n3Qyrmz2M54nfQ5H177T5AEAOBknGWQ7J3fpodIMyDsdXcOECT1xurAgiEu8+1aQ9jqYaIqpNneb644ajOwxH+9IuYuHv8RtJ9raD2WgXPk8viPnl7TFs/Hf1iDqXUeqDoWbcXQgUcydOaYGT326lEpQ9eLvnKwb5C0lb97EBs6B3sKkn2P/9DO9yaLBQ3N3T72tTn8+A/tmaYiHnXS53x47L9TkGwP165/MLT08AIAgM2daZCsrOaSm/PbokTSu+5Dz/fqIEFyrJGv9RrUAWEqt/lvUlgadvPsqlr8Q//v5kPDq/J0nmvafX/3oeelrOa5pMlkZBuW1wUTSdLcWAin71jMwrOFgKXM87T9kHif4231ClbHep/KO5c5kvV+mQ9/DyVK0taCQuuXqd4b1ahfLwo0K953GtnWx5DIej5opu2vrTy9g6Sl/P0W21G9olqwmH6QfPar3zMbPeZIzh7VIz/s53uzVWeHzvNxr82ml/MPWep1w+ghbN7gUCe9z4fj/jsFSRFZzSRT14Mqc4IkAAA7dd5BEjgxPvMRcUDeP/YAAAC8bARJYOeq4aPmHM66l+SEHk2DNYIkAACAF4IksHPDj9Q42CJPcEeQBAAA8EKQBPbCMucrjGWaHXh+LtwQJAEAALwQJAEAAAAAXgiSAAAAAAAvBEkAAAAAgBeCJAAAAADAC0ESAAAAAOCFIAkAAAAA8EKQBAAAAAB4IUgCAAAAALwQJAEAAAAAXgiSAAAAAAAvBEkAAAAAgBeCJAAAAADAC0ESAAAAAOCFIAkAAAAA8EKQBAAAAAB4IUgCAAAAALwQJAEAAAAAXgiSAAAAAAAvBEkAAAAAgBeCJAAAAADAy/kFyS+FTL8KJAhsf6FEyXu5KxZSHmHXykUhd7dTiUNtn6JE0rtCFnveoXKeyiQIJExyWXq982+Zp99KEHwr6fzvPe3dDpSfZfV5uBA3L4NnyKE8drq51Uo+1/9jJukklCC8knx5jCvtlKjr55Uk+V9+b1XlOEllPlCM63odyiSdHeW+5qeU1fwnmcYX1T3wW/ln9j/s1+WB6zAAAPDzwoKk+ruQOP1dVgfcrfIxk8uwf5/C+EZmq/01ms43SJaymt1IHI7v38sIku7lsRtLmaWXEuphhyCpIUi2qGNS977wSu4f/mlcl4euwwAAYBMvNEgGEgSvZVp8OtBO/SV58kqCYCLJzUO793E1l/tpLOHJNgRPPUie+v4d2oHLwxZ2CJK7cY5BcplLEgYSXmby2LuzXNMAADwHZx0kv5oW8kX/tzq0Vb2Ah+qZUo2nvu05NhiP49Qbdae+f4dGkDwb5xwkB++9XNMAADwHLytIiojIJymmr+thVQdp6G4aFFdzyVtzKieSpLnMLUNgy0UhmRaSgyiRNJ/Xw3etwzrLhRR37yWJ9KFmsUwzfc6mX6NubD/WljLPP2jzpEKJklTyudm0XMo8T7X9M1+nenq1nuaBMu6WQSmreS5pMmnPWe3sb5+lzO+vm/MTxjLN/iXpu1da3arKL7yS+9m/5Tq+WB/H9KHaxpMsiswoix+kWDxZy/YuTSRqDYmeSlbP+R0pj3IhRWbUJ7OHvKqrYfJRZg/fV6/t6b2vQoE+B3mSzqTUg+TjTPvx5kLiadY9Nt96WPzW/kGoVQYj52uwPtU7JKv5z3I7Wo/7zp/+mfahrePnUjYIkn/Icp7Vx9dbLh71IJi8l2Kmz2nsOYej9ViVQ7e+fGldl37XNAAAOJ4XGCRFvhRT+apa6OEwv3g/yWP2VsKqcXebfbQGhZbV75LWjTLjL/pOcu39/fMvL+Qy+1NKsYUoLVBbFiVqejfcg6TLftRz6qzbnchV/li9rimzzuvCt5I9Psm2QdJtf/sMlV9gCZLfSPzmwvh8l2NU9eFBpnrQav2pczNQHuWfkl3a61NrmKEKkm9ieRP27IsyGiT1Y+7Znnc9fCVR9NV4eXW4lrWan2ffn+jqXgtcLp9pCZJO51K8g2T07p1lv/Vryr8eBF9HElnKon0OfcqBIAkAwLl4kUFSFpnEQSBBEMm0ONSSO0+yqHt4tAZZPJXb7Gejl1E1uoxf9bWhuU0gVA2vC4mvf6kauVpjuGqEdUKUanwmWWvb5eJeriK98eoaJP32I4gSual7S7SePRXAVEO2FZqfZJF/J9GmQbdVBup97YZ29/iHPyuIriRTvU+rmWSqd9MMkkF3QaU6yOqfIU+yKH6QJAq1xnqzr0k203rFXMtDNfSN810upLhJJNKDc70YiuOCVENDW4NAwvh7eajOX1222r7510Oj7pSPkl9NjNA5sJ9j9aned72XTl9pVAuEKkiHsVw/LIwfStRnmkHS41x6BcnA2GftflO/f5N60L4HWc+hcz0W69DW7o9cDG0FAOA5IEgeLEgq62FzWZa1h86Fl5LOqqZV3ei9lsIcxqp6FFRQUY1Zx8Zmd27SkyyKj5JlmWTZj83QtE4QGmnUOe2H+izbUEnVyFUNbm2BovRWst5e3E2DZCnL/KpqVL+XLMs8HgszsM3O/MC+VTuH9lvtm+3zF1LcZevzpQ17HmyEDwaSqpzrnkvP+Y1ecySHVjB1rYfd97qtxutWn+pgWw891v6tCkxm/RmemzhwzGPn0jNIdo/fqAs7qQd9wdixHhMkAQA4Gy8ySDZDW48RJE2lrNS8JtWIG1yQot3Icn2kRfd1qgfEcWjmSKPOqzHfE1Lai4b0DDEMY5ne6j24mwZJ6Rk+fCHx9INl3pzrcZj/1hckLEP4On/ae+qeN/trBxvhnSGoA+f74EFy+3roVvdc6pMKPj2P6mgdq+tjPSyvcz2XWy+2YxzPJvWgs23zeDzrMUESAICz8QKD5KEX2xlpnIpIp+F0gCBZD4cLY5neVr0id4UsvvT1qB06SFb/bVHIXWvBIXOO1hZBcr0BKe60HrDO3C7f49hlkDSHR6qh0Fndg/rFpRHuEiDMXqsDBcld1EOf54MO16dDBEmPc3mMIDnae7lJkNT2jSAJAMDZeFlBsp4LZPbi7Nd4Q7dnCNrehrYONNTqeV/HHtpq3Yi22qvany2DZPsV2mqdQ0MW9z201dytvka9CgrbDG3t2dZBguRu6qFPkDQ20qlPex/a6nMufRfb6eyzz9BW80Ndg6Rn6CNIAgBwNs46SA7/9TzSYB/qlRItjxtYzSVXjwHoLCyy6WI7IuXil+pRE7aeS9uCH/qCIhsESc/9cF1sR1+sZV0G1XBU7/3rCdOthVLW+7JeLGW4p8m+2I72nFKXuX0qmMTXcq/ViXLxIDfJxPLDgr6YSfvRI8ONcBXSLySe/qQNC24WRDnOHMnd1EOnIOlan7ZebMdc5KYnSLqcy00W26nLUfvMzmI7HvVgNEh61GOtzAiSAAA8fy80SDquSLlDzWqHfXOTtMV2RHb0+I+ml8L90Rfuc9M6x+iwHzt5/Efr85qenPaQV8v++ZSBrTe4xfPxH9ZgOlQWeh0dKgszSPaUx1B9si305DzsWx/aWK366TO0dQf10K1H0r0+7eTxH/UPVeYxe5zLnTz+w/jBzLceOARJ93osjkGypw53eqkBAMAxvbAguV6h0311zh1bzSXPjAevBxNJ0n/ZVyTVeyvr1+bGo0LWykUhWWsV2PYD3a2L7aheCNVgi6dym/8mxRZD18b2Y831wfDm6wL7g+Gtj92w7Julwbqa55ImE+N82Mu4q92TtD7Wf0n6zmWOpGI+yL3nGI1h2fWiQLNfu6Gtrzw6D6K3lLt3kNQWi1Jl67vYzpb10H1oq2N9stUL6+vU/rfPXxhPJavvMbbFdhzPpfccyT9kqZ8Lo4eweYNHPXAKkvZysJaZU5AUex0mSAIAcFLOL0gCx+QzDw0AAAB4pgiSgDc19K49H1RkKfPsSiKn3jEAAADg+SJIApsYepTC4KNDAAAAgOePIAlsqDMfNLiQeJrZ57sCAAAAZ4QgCQAAAADwQpAEAAAAAHghSAIAAAAAvBAkAQAAAABeCJIAAAAAAC8ESQAAAACAF4IkAAAAAMALQRIAAAAA4IUgCQAAAADwQpAEAAAAAHghSAIAAAAAvBAkAQAAAABeCJIAAAAAAC8ESQAAAACAF4IkAAAAAMALQRIAAAAA4IUgCQAAAADwQpAEAAAAAHghSAIAAAAAvBAkAQAAAABeCJIAAAAAAC//P6PiXjEebFsiAAAAAElFTkSuQmCC" /></div>
Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com0tag:blogger.com,1999:blog-4710215856934992447.post-180061502410675452019-05-21T08:34:00.000-07:002019-05-21T08:34:08.128-07:00Topics to Watch Out For<div style="text-align: justify;">
1.<span style="font-size: large;"> Pareto efficiency</span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><br /></span></div>
<div style="text-align: justify;">
<span style="font-size: large;">2. Equity vs. equality</span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><br /></span></div>
<div style="text-align: justify;">
<span style="font-size: large;">3. Long-run Philips curve</span></div>
Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com0tag:blogger.com,1999:blog-4710215856934992447.post-4705751366641929102019-05-20T23:53:00.003-07:002019-05-20T23:53:45.311-07:00Suggested Solution for 9708/42 March 2019 (CAIE in India)<div class="yiv7596772677ydp22636a74yiv1137151336yahoo-style-wrap" style="font-family: Helvetica Neue, Helvetica, Arial, sans-serif; text-align: justify;">
<span style="font-size: large;"><b>Section A</b></span></div>
<div class="yiv7596772677ydp22636a74yiv1137151336yahoo-style-wrap" style="font-family: Helvetica Neue, Helvetica, Arial, sans-serif; text-align: justify;">
<span style="font-size: large;">(a)
Quantitative easing - expansionary monetary policy - Central bank will
purchase government bonds/ financial assets from commercial banks - will
increase liquidity in banking system - enable banks to generate more
lending - supportive of consumption and investment</span></div>
<div class="yiv7596772677ydp22636a74yiv1137151336yahoo-style-wrap" style="font-family: Helvetica Neue, Helvetica, Arial, sans-serif; text-align: justify;">
<span style="font-size: large;"><br /></span></div>
<div style="text-align: justify;">
<span style="font-size: large;">
(b) Central bank has the responsibility to ensure that the inflation target
is met - takes calculated risks every time when they implement QE -
slight mistake could be very costly - for instance, if money supply is
increased excessively, that may lead to high and unstable inflation -
undermines the stability of banking system - people may end up
withdrawing money - banks may experience liquidity crisis - unable to
accommodate growth</span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><br /></span></div>
<div style="text-align: justify;">
<span style="font-size: large;">In 2008, banks engaged in
sub-prime lending - lent excessively even to people with poor credit
history - many defaulted on the loans - banks experienced huge losses
being unable to recover most of the loans given out - many were afraid
that the banks in the USA and parts of Europe to go bankrupt - withdraw
their money - run on the bank - unstable banking system - could cause
the economy to collapse if the government did not intervene timely</span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><br /></span></div>
<div style="text-align: justify;">
<span style="font-size: large;">(c)
Fall in the price of oil is due to competitive forces - excess supply
in the market - Saudi Arabia over-produced oil - Chinese economic
slowdown - fall in the demand for oil for industrial need - collapse in
prices</span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><br /></span></div>
<div style="text-align: justify;">
<span style="font-size: large;">To some extent, the claim is true - oil
is a necessity - has low price elasticity of demand - fall in price of
oil implies lower export revenue - fall in (X-M) of oil exporting
countries - lower AD and hence output and growth</span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><br /></span></div>
<div style="text-align: justify;">
<span style="font-size: large;">However,
the same cannot be said for China - borrowed heavily over the past to
fund infrastructure projects - cannot continue to borrow forever - need
to scale back spending and start paying back - avoid bankruptcy on banks
- fall in G - lower AD and hence output and growth</span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><br /></span></div>
<div style="text-align: justify;">
<span style="font-size: large;">In
conclusion, economic downturn was not just due to fall in oil prices -
may be valid for oil producing nations in the OPEC but not for most
parts of the world </span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><br /></span></div>
<div style="text-align: justify;">
<span style="font-size: large;">(d)
The article mentions that OECD is concerned that major economies were
over-relying on loose monetary policy as a hope for recovery - did not
work - historically low level of interest rates - did not stimulate
borrowing and spending - consumer and business confidence at all time
low - afraid to undertake more commitments - difficulty to pay back </span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><br /></span></div>
<div style="text-align: justify;">
<span style="font-size: large;">However,
the OECD's concern may be unfounded - usually there would be a time lag
- flows of information are not perfect - for instance, some may not
realise about the rate cut - also firms may have invested in a
particular project - unlikely to invest so soon </span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><br /></span></div>
<div style="text-align: justify;">
<span style="font-size: large;">The
extract also mentions that major economies should instead focus on
loose fiscal policy - boost government spending onto roads and
healthcare - injection into the circular flow of income - rise in AD and
hence output and growth - betterment of infrastructure could raise
potential capacity of economies - bigger roads reduce congestion -
better health will increase productivity at workplace - higher LRAS and
therefore potential growth</span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><br /></span></div>
<div style="text-align: justify;">
<span style="font-size: large;">However, loose
fiscal may not work either - China for instance had borrowed heavily in
the past - there is a limit to how much more it could borrow further -
has to start paying back - same can be said regarding developed
economies - have the macroeconomic aim of balanced budget - pursue
austerity measures to ensure the goal is met at the expense of growth</span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><br /></span></div>
<div style="text-align: justify;">
<span style="font-size: large;">In
conclusion, it is thought that the global economies will recover - pace
of recovery may be different - case to case basis - some countries may
experience growth at different level</span></div>
Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com0tag:blogger.com,1999:blog-4710215856934992447.post-71489191751440474662019-04-28T21:58:00.003-07:002019-05-19T18:25:08.260-07:00Data Response and Essay Techniques for CIE/ CAIE Economics (Paper 4) (updated post)<div style="text-align: justify;">
<b><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Exam Advice/ Tips/ Strategies for Section A (Paper 4)</span></span></b></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">1. Read through the article(s)/ extract(s) thoroughly. Ask plenty of HOW, WHY and WHAT questions. It is extremely crucial that a candidate is able to see the inter-relationships between all the information provided e.g. HOW does an increase in interest rates may slow down the wage rise, WHY would the government pursues austerity measures knowing that it would hurt growth/ jobs, WHAT are the policies that are suitable to tackle unemployment in this case etc. Do not spend more than 5 minutes for this. This skill/ ability may not be that important for AS. However, in A2, almost every question would require candidates to be able to apply the information from the extract to fit into their answers. It is therefore advised that we extract as much knowledge/ information as we can while digesting it</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">2. Expect four or five questions with at least two of them being evaluative in nature. One common error among students is to think that there is only one evaluation question and it will always be the last one with highest marks. This is totally untrue. First, it doesn't have to be the last question. Second, it need not be the one with the highest marks. Third, it doesn't have to begin with 'DISCUSS'. We can even have an evaluative question with 4/5 marks. The technique is to identify the keywords being used. As long as justification/ weighing is required, it will always be an evaluative question. Watch out keywords like:</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">a) How far ....</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">b) To what extent ....</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">c) '....will always....'</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">d) '....the only....'</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">e) Do you agree ....</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">f) Consider whether ....</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">g) Explain whether ....</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">4 marks - 1 yes + 1 no + 1 conclusion</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">5/ 6 marks - 2 yes + 1 no + 1 conclusion</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">7/ 8 marks - 2 yes + 2 no + 1 conclusion</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">3. 1 mark will be lost if no conclusion is given. However, that doesn't mean that candidates will automatically be granted full marks if conclusion is given either. The examiner will also need to consider the credibility of the conclusion given e.g. whether it is relevant, suitable in the context etc</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">4. Always monitor the time. I realise that most candidates will only check the timing once they reach the last question. This is unwise. You should check the time spent after every question</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">5. On average, one analysis/ explained idea/ evaluation carries 2 marks. Each analysis is estimated to be around four or five lines and each subsequent line must add value to the previous line so that a complete/ coherent chain of analysis can be built</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">6. Data response with micro economic nature tends to be 'much easier' than the one with macro economic nature (Weirdly, micro economic essays tend to be 'more difficult' than macro economic essays as they are less predictable and repetitive)</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">7. Let's just say that you cannot finish the last question of Section A. In this case, you should 'salvage' by giving point-form answers for both analysis and evaluations. Three short sentences will do. Provided if they are correct, you may get up to 2/ 3 marks out of this (better than nothing right!). Cambridge has made it easier for you to gain low-level marks. However, it can be extremely difficult for you to gain high-level marks (rather unfair to some of you)</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">8. Whenever the instruction is 'With reference to the information provided/ article....', you must always prioritise the information given. You are unlikely to gain any marks if you use your own point even though they are sound</span></span><br />
<br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">9. Also, you are strongly advised to paraphrase the evidence from the article (DO NOT COPY THE WHOLE SENTENCE AS IT IS A WASTE OF TIME) into your writing before you start interpreting them into an idea of your own. For instance:</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">a. <i><b>The article mentions that large firms may not give the consumers what they want. This can be related to allocative efficiency which is commonly found in large firms (recommended)</b></i></span></span><br />
<br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><i><b>b. </b>Big firms are allocatively inefficient (not recommended) (the examiner may not be able to see everything from your perspective. He/ she may question where the idea of 'allocatively inefficient' comes from)</i></span></span><br />
<br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">c. <i><b>The extract states that large supermarkets often force farmers to supply the agricultural output to them at an extremely low price. This is an abuse of monopsony power and hence shows one of the disadvantages of big firms (recommended) </b></i></span></span><br />
<br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">d. <i>Large firms often abuse their monopsony power (not recommended) (the examiner may not be able to see everything from your perspective. He/ she may question where the idea of 'monopsony' is derived from)</i></span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">10. It is worth noting that you may lose up to 10 marks (out of 70) (2 marks from Section A and 8 marks from Section B) from this paper for not giving any conclusion at all</span></span></div>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<b><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Exam Advice/ Tips/ Strategies for Section B (Paper 4)</span></span></b><br />
<b><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Possible Questions for Macro Economics </span></span></b><br />
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">1. GDP and standards of living. Please don't forget to include other indicators like HDI, NEW and MPI as well as evaluating them. Although the question does not explicitly mention about these indicators, they actually want them to be included</span></span></div>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">2.
Injections and economic growth. There are three injections namely
investment (I), government expenditure (G) and exports (X). However, the
one that is more commonly asked is 'investment'. Candidates are
required to link 'investment' to the 'multiplier effect' even though the
question does not mention it explicitly. A simple numerical example
with a diagram (either Keynesian cross or J/W) would make your answers
more impactful. Remember, numbers speak louder than words!</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">3.
Factors that could influence the level of investment. Please link
'investment' to 'accelerator effect' even though the question does not
mention it explicitly</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">4.
Whether X and Y are the only characteristics of a poor developing
country. You will have to explain what contribute to X and Y e.g. low
level of income and high population growth rate. Then, you'll have to
mention that these are not the only traits of a poor developing country.
There are others (easy ones to write) e.g. primary product dependency,
poor infrastructure and overhanging national debt</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">5.
Fiscal/ monetary/ supply-side policies and how they can be used to
achieve macro economic aims like growth, full employment and low level
of inflation. Evaluations are definitely part of this. Also, they are
unlikely to ask either one policy but rather a combination of them</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">6.
Difference between fiscal and monetary policy. This is not going to be a
full-question on its own but rather part of (5). Candidates are
expected to mention key differences e.g. fiscal is conducted by the
government while monetary is by the Central Bank, fiscal involves
manipulation of G or/ and T while monetary is interest rates or money
supply, fiscal focuses on growth and full employment while monetary on
price stability etc</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">7.
Conflicts between macroeconomic aims. Candidates are advised to use
'growth' and 'full employment' against other aims like 'price
stability', 'balance of payments being in equilibrium', 'environmental
goal' and others. Don't forget to evaluate as well, saying why these
goals are not necessarily conflicting with one another e.g. 'growth and
low inflation' not a conflict if growth is due to an increase in LRAS or
'growth and BOP in equilibrium' is not a conflict if it is due to
export-led growth as it allows a government to achieve both aims
simultaneously</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<b><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Possible Questions for Micro Economics</span></span></b><br />
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">1. Economies and diseconomies of scale associated with an increase in the scale of production. Usually, EOS is the analysis and DEOS is the evaluation. Use points that are common and easy to write. For EOS, it would be purchasing, financial, transport and managerial. For DEOS, it would be difficulty to monitor the performance of workers, communication failure and principle-agent problem</span></span></div>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<br />
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">2. Comparisons between a perfectly competitive firm with a monopolistically competitive/ monopoly firm. Do contrast between the number of firms, pricing ability, barriers to entry and exit, nature of products, short-run vs. long-run, efficiency both productive and allocative and business goals</span></span></div>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<br />
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">3. Whether a given market e.g. pharmaceutical is contestable or not. Here, you have to mention that it is non-contestable (more likely to be) and then evaluate by saying that it may be contestable as evaluation</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">4. Whether a monopoly is desirable or not. 'Yes' as analysis and 'no' as evaluation. Desirability can be upon consumers, workers in the firm, the monopolist itself, suppliers, other firms in the industry, the government and shareholders</span></span><br />
<br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">5. Whether profit maximisation is the only goal that private firms go for. Candidates will have to mention that 'it is' since firms' long-term survival depends on how much profits they retained. For evaluations, candidates could then mention that they also have other aims e.g. sales-revenue maximisation, sales maximisation, corporate social responsibility, maximising welfare of employees, minimising losses and others. You don't have to write everything. Three other goals are often sufficient if they are well-developed for a 12/13 marks question</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">6. Indifference curve and budget line and they can be used to illustrate (a) how a rational consumer attempts to maximise satisfaction (b) how quantity may change when there is a price increase/ decrease for a normal/ inferior/ Giffen good</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">7. Market efficiency, why market in the real world will fail and whether government interventions would correct market failure/ improve resource allocation. This will usually appear as a 25-marks question. Market is only efficient theoretically/ hypothetically. That happens when competition is at its most extreme level, bringing this to a perfectly competitive market analysis. Both productive and allocative efficiency can be achieved in such a market. Price is competitive and the only way to increase profits is by lowering costs. Also, if firms do not give the consumers what they want, then they may not survive into the long-run. Candidates are then required to highlight 3/ 4 market failures (ANY OF THEM, UNLESS THE QUESTION SPECIFIES e.g. monopoly and negative externalities are common). Then candidates must recommend suitable policies to improve resource allocation and whether this will always work. Obviously they don't and that is why we have government failures e.g. regulatory capture, information failure as in the government may have intervened too much or too little with indirect taxes/ subsidies and also difficulty to predict how consumers and firms will react to the policy changes. Don't forget about the conclusion too</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">8. Theory of wage determination and how equilibrium wage and level of employment are determined in a competitive market. Do include assumptions like both sides of the labour market are wage takers, workers are homogenous and so is the product, production is in the short-run so that the relationship between quantity of labour, productivity and output can be measured, there is no distortion in the market e.g. powerful unions, dominant employers and government (which can cause wage rate to settle below or above equilibrium). Then include a table if possible (higher-order skills) that includes quantity of labour, MPL, price, MRPL, wage rate, TCL, ACL and MCL. Include a diagram as well and explain these two from there</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">9. Whether market wage rates are always dependent on market forces alone. You will have to repeat (8) and then mention that this is true but only to some extent. In practice, labour market is largely dominated by imperfections. Forces like powerful unions and government intervention can cause wage rates not to settle at its equilibrium, and in this case ends up being above. Also, powerful employers can cause wage rates to go lower than equilibrium knowing that these workers are occupationally immobile. Do include other factors like racial and gender discrimination, experience and skills, level of education and others</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">10. Whether trade union interventions will always cause unemployment. You have to mention 'yes' if one refers to competitive forces of demand and supply. Unions may be able to negotiate for higher wage rates but this comes at the expense off rising unemployment. As evaluation, you have to mention 'no' if one refers to the case where trade unions intervene into an otherwise monopsonist labour market. Wage rates and employment are increased at the same time</span></span><br />
<br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">One more update tonight </span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"> </span></span></div>
Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com0tag:blogger.com,1999:blog-4710215856934992447.post-89201752935958836452019-04-28T21:58:00.000-07:002019-05-07T15:37:19.687-07:00Data Response and Essay Techniques for CIE/ CAIE Economics (Paper 2) <!--[if gte mso 9]><xml>
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<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Body Text First Indent 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Note Heading"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Body Text 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Body Text 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Body Text Indent 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Body Text Indent 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Block Text"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Hyperlink"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="FollowedHyperlink"/>
<w:LsdException Locked="false" Priority="22" QFormat="true" Name="Strong"/>
<w:LsdException Locked="false" Priority="20" QFormat="true" Name="Emphasis"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Document Map"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Plain Text"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="E-mail Signature"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Top of Form"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Bottom of Form"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Normal (Web)"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Acronym"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Address"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Cite"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Code"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Definition"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Keyboard"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Preformatted"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Sample"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Typewriter"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="HTML Variable"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Normal Table"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="annotation subject"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="No List"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Outline List 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Outline List 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Outline List 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Simple 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Simple 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Simple 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Classic 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Classic 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Classic 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Classic 4"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Colorful 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Colorful 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Colorful 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Columns 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Columns 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Columns 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Columns 4"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Columns 5"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Grid 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Grid 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Grid 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Grid 4"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Grid 5"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Grid 6"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Grid 7"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Grid 8"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table List 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table List 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table List 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table List 4"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table List 5"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table List 6"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table List 7"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table List 8"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table 3D effects 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table 3D effects 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table 3D effects 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Contemporary"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Elegant"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Professional"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Subtle 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Subtle 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Web 1"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Web 2"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Web 3"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Balloon Text"/>
<w:LsdException Locked="false" Priority="39" Name="Table Grid"/>
<w:LsdException Locked="false" SemiHidden="true" UnhideWhenUsed="true"
Name="Table Theme"/>
<w:LsdException Locked="false" SemiHidden="true" Name="Placeholder Text"/>
<w:LsdException Locked="false" Priority="1" QFormat="true" Name="No Spacing"/>
<w:LsdException Locked="false" Priority="60" Name="Light Shading"/>
<w:LsdException Locked="false" Priority="61" Name="Light List"/>
<w:LsdException Locked="false" Priority="62" Name="Light Grid"/>
<w:LsdException Locked="false" Priority="63" Name="Medium Shading 1"/>
<w:LsdException Locked="false" Priority="64" Name="Medium Shading 2"/>
<w:LsdException Locked="false" Priority="65" Name="Medium List 1"/>
<w:LsdException Locked="false" Priority="66" Name="Medium List 2"/>
<w:LsdException Locked="false" Priority="67" Name="Medium Grid 1"/>
<w:LsdException Locked="false" Priority="68" Name="Medium Grid 2"/>
<w:LsdException Locked="false" Priority="69" Name="Medium Grid 3"/>
<w:LsdException Locked="false" Priority="70" Name="Dark List"/>
<w:LsdException Locked="false" Priority="71" Name="Colorful Shading"/>
<w:LsdException Locked="false" Priority="72" Name="Colorful List"/>
<w:LsdException Locked="false" Priority="73" Name="Colorful Grid"/>
<w:LsdException Locked="false" Priority="60" Name="Light Shading Accent 1"/>
<w:LsdException Locked="false" Priority="61" Name="Light List Accent 1"/>
<w:LsdException Locked="false" Priority="62" Name="Light Grid Accent 1"/>
<w:LsdException Locked="false" Priority="63" Name="Medium Shading 1 Accent 1"/>
<w:LsdException Locked="false" Priority="64" Name="Medium Shading 2 Accent 1"/>
<w:LsdException Locked="false" Priority="65" Name="Medium List 1 Accent 1"/>
<w:LsdException Locked="false" SemiHidden="true" Name="Revision"/>
<w:LsdException Locked="false" Priority="34" QFormat="true"
Name="List Paragraph"/>
<w:LsdException Locked="false" Priority="29" QFormat="true" Name="Quote"/>
<w:LsdException Locked="false" Priority="30" QFormat="true"
Name="Intense Quote"/>
<w:LsdException Locked="false" Priority="66" Name="Medium List 2 Accent 1"/>
<w:LsdException Locked="false" Priority="67" Name="Medium Grid 1 Accent 1"/>
<w:LsdException Locked="false" Priority="68" Name="Medium Grid 2 Accent 1"/>
<w:LsdException Locked="false" Priority="69" Name="Medium Grid 3 Accent 1"/>
<w:LsdException Locked="false" Priority="70" Name="Dark List Accent 1"/>
<w:LsdException Locked="false" Priority="71" Name="Colorful Shading Accent 1"/>
<w:LsdException Locked="false" Priority="72" Name="Colorful List Accent 1"/>
<w:LsdException Locked="false" Priority="73" Name="Colorful Grid Accent 1"/>
<w:LsdException Locked="false" Priority="60" Name="Light Shading Accent 2"/>
<w:LsdException Locked="false" Priority="61" Name="Light List Accent 2"/>
<w:LsdException Locked="false" Priority="62" Name="Light Grid Accent 2"/>
<w:LsdException Locked="false" Priority="63" Name="Medium Shading 1 Accent 2"/>
<w:LsdException Locked="false" Priority="64" Name="Medium Shading 2 Accent 2"/>
<w:LsdException Locked="false" Priority="65" Name="Medium List 1 Accent 2"/>
<w:LsdException Locked="false" Priority="66" Name="Medium List 2 Accent 2"/>
<w:LsdException Locked="false" Priority="67" Name="Medium Grid 1 Accent 2"/>
<w:LsdException Locked="false" Priority="68" Name="Medium Grid 2 Accent 2"/>
<w:LsdException Locked="false" Priority="69" Name="Medium Grid 3 Accent 2"/>
<w:LsdException Locked="false" Priority="70" Name="Dark List Accent 2"/>
<w:LsdException Locked="false" Priority="71" Name="Colorful Shading Accent 2"/>
<w:LsdException Locked="false" Priority="72" Name="Colorful List Accent 2"/>
<w:LsdException Locked="false" Priority="73" Name="Colorful Grid Accent 2"/>
<w:LsdException Locked="false" Priority="60" Name="Light Shading Accent 3"/>
<w:LsdException Locked="false" Priority="61" Name="Light List Accent 3"/>
<w:LsdException Locked="false" Priority="62" Name="Light Grid Accent 3"/>
<w:LsdException Locked="false" Priority="63" Name="Medium Shading 1 Accent 3"/>
<w:LsdException Locked="false" Priority="64" Name="Medium Shading 2 Accent 3"/>
<w:LsdException Locked="false" Priority="65" Name="Medium List 1 Accent 3"/>
<w:LsdException Locked="false" Priority="66" Name="Medium List 2 Accent 3"/>
<w:LsdException Locked="false" Priority="67" Name="Medium Grid 1 Accent 3"/>
<w:LsdException Locked="false" Priority="68" Name="Medium Grid 2 Accent 3"/>
<w:LsdException Locked="false" Priority="69" Name="Medium Grid 3 Accent 3"/>
<w:LsdException Locked="false" Priority="70" Name="Dark List Accent 3"/>
<w:LsdException Locked="false" Priority="71" Name="Colorful Shading Accent 3"/>
<w:LsdException Locked="false" Priority="72" Name="Colorful List Accent 3"/>
<w:LsdException Locked="false" Priority="73" Name="Colorful Grid Accent 3"/>
<w:LsdException Locked="false" Priority="60" Name="Light Shading Accent 4"/>
<w:LsdException Locked="false" Priority="61" Name="Light List Accent 4"/>
<w:LsdException Locked="false" Priority="62" Name="Light Grid Accent 4"/>
<w:LsdException Locked="false" Priority="63" Name="Medium Shading 1 Accent 4"/>
<w:LsdException Locked="false" Priority="64" Name="Medium Shading 2 Accent 4"/>
<w:LsdException Locked="false" Priority="65" Name="Medium List 1 Accent 4"/>
<w:LsdException Locked="false" Priority="66" Name="Medium List 2 Accent 4"/>
<w:LsdException Locked="false" Priority="67" Name="Medium Grid 1 Accent 4"/>
<w:LsdException Locked="false" Priority="68" Name="Medium Grid 2 Accent 4"/>
<w:LsdException Locked="false" Priority="69" Name="Medium Grid 3 Accent 4"/>
<w:LsdException Locked="false" Priority="70" Name="Dark List Accent 4"/>
<w:LsdException Locked="false" Priority="71" Name="Colorful Shading Accent 4"/>
<w:LsdException Locked="false" Priority="72" Name="Colorful List Accent 4"/>
<w:LsdException Locked="false" Priority="73" Name="Colorful Grid Accent 4"/>
<w:LsdException Locked="false" Priority="60" Name="Light Shading Accent 5"/>
<w:LsdException Locked="false" Priority="61" Name="Light List Accent 5"/>
<w:LsdException Locked="false" Priority="62" Name="Light Grid Accent 5"/>
<w:LsdException Locked="false" Priority="63" Name="Medium Shading 1 Accent 5"/>
<w:LsdException Locked="false" Priority="64" Name="Medium Shading 2 Accent 5"/>
<w:LsdException Locked="false" Priority="65" Name="Medium List 1 Accent 5"/>
<w:LsdException Locked="false" Priority="66" Name="Medium List 2 Accent 5"/>
<w:LsdException Locked="false" Priority="67" Name="Medium Grid 1 Accent 5"/>
<w:LsdException Locked="false" Priority="68" Name="Medium Grid 2 Accent 5"/>
<w:LsdException Locked="false" Priority="69" Name="Medium Grid 3 Accent 5"/>
<w:LsdException Locked="false" Priority="70" Name="Dark List Accent 5"/>
<w:LsdException Locked="false" Priority="71" Name="Colorful Shading Accent 5"/>
<w:LsdException Locked="false" Priority="72" Name="Colorful List Accent 5"/>
<w:LsdException Locked="false" Priority="73" Name="Colorful Grid Accent 5"/>
<w:LsdException Locked="false" Priority="60" Name="Light Shading Accent 6"/>
<w:LsdException Locked="false" Priority="61" Name="Light List Accent 6"/>
<w:LsdException Locked="false" Priority="62" Name="Light Grid Accent 6"/>
<w:LsdException Locked="false" Priority="63" Name="Medium Shading 1 Accent 6"/>
<w:LsdException Locked="false" Priority="64" Name="Medium Shading 2 Accent 6"/>
<w:LsdException Locked="false" Priority="65" Name="Medium List 1 Accent 6"/>
<w:LsdException Locked="false" Priority="66" Name="Medium List 2 Accent 6"/>
<w:LsdException Locked="false" Priority="67" Name="Medium Grid 1 Accent 6"/>
<w:LsdException Locked="false" Priority="68" Name="Medium Grid 2 Accent 6"/>
<w:LsdException Locked="false" Priority="69" Name="Medium Grid 3 Accent 6"/>
<w:LsdException Locked="false" Priority="70" Name="Dark List Accent 6"/>
<w:LsdException Locked="false" Priority="71" Name="Colorful Shading Accent 6"/>
<w:LsdException Locked="false" Priority="72" Name="Colorful List Accent 6"/>
<w:LsdException Locked="false" Priority="73" Name="Colorful Grid Accent 6"/>
<w:LsdException Locked="false" Priority="19" QFormat="true"
Name="Subtle Emphasis"/>
<w:LsdException Locked="false" Priority="21" QFormat="true"
Name="Intense Emphasis"/>
<w:LsdException Locked="false" Priority="31" QFormat="true"
Name="Subtle Reference"/>
<w:LsdException Locked="false" Priority="32" QFormat="true"
Name="Intense Reference"/>
<w:LsdException Locked="false" Priority="33" QFormat="true" Name="Book Title"/>
<w:LsdException Locked="false" Priority="37" SemiHidden="true"
UnhideWhenUsed="true" Name="Bibliography"/>
<w:LsdException Locked="false" Priority="39" SemiHidden="true"
UnhideWhenUsed="true" QFormat="true" Name="TOC Heading"/>
<w:LsdException Locked="false" Priority="41" Name="Plain Table 1"/>
<w:LsdException Locked="false" Priority="42" Name="Plain Table 2"/>
<w:LsdException Locked="false" Priority="43" Name="Plain Table 3"/>
<w:LsdException Locked="false" Priority="44" Name="Plain Table 4"/>
<w:LsdException Locked="false" Priority="45" Name="Plain Table 5"/>
<w:LsdException Locked="false" Priority="40" Name="Grid Table Light"/>
<w:LsdException Locked="false" Priority="46" Name="Grid Table 1 Light"/>
<w:LsdException Locked="false" Priority="47" Name="Grid Table 2"/>
<w:LsdException Locked="false" Priority="48" Name="Grid Table 3"/>
<w:LsdException Locked="false" Priority="49" Name="Grid Table 4"/>
<w:LsdException Locked="false" Priority="50" Name="Grid Table 5 Dark"/>
<w:LsdException Locked="false" Priority="51" Name="Grid Table 6 Colorful"/>
<w:LsdException Locked="false" Priority="52" Name="Grid Table 7 Colorful"/>
<w:LsdException Locked="false" Priority="46"
Name="Grid Table 1 Light Accent 1"/>
<w:LsdException Locked="false" Priority="47" Name="Grid Table 2 Accent 1"/>
<w:LsdException Locked="false" Priority="48" Name="Grid Table 3 Accent 1"/>
<w:LsdException Locked="false" Priority="49" Name="Grid Table 4 Accent 1"/>
<w:LsdException Locked="false" Priority="50" Name="Grid Table 5 Dark Accent 1"/>
<w:LsdException Locked="false" Priority="51"
Name="Grid Table 6 Colorful Accent 1"/>
<w:LsdException Locked="false" Priority="52"
Name="Grid Table 7 Colorful Accent 1"/>
<w:LsdException Locked="false" Priority="46"
Name="Grid Table 1 Light Accent 2"/>
<w:LsdException Locked="false" Priority="47" Name="Grid Table 2 Accent 2"/>
<w:LsdException Locked="false" Priority="48" Name="Grid Table 3 Accent 2"/>
<w:LsdException Locked="false" Priority="49" Name="Grid Table 4 Accent 2"/>
<w:LsdException Locked="false" Priority="50" Name="Grid Table 5 Dark Accent 2"/>
<w:LsdException Locked="false" Priority="51"
Name="Grid Table 6 Colorful Accent 2"/>
<w:LsdException Locked="false" Priority="52"
Name="Grid Table 7 Colorful Accent 2"/>
<w:LsdException Locked="false" Priority="46"
Name="Grid Table 1 Light Accent 3"/>
<w:LsdException Locked="false" Priority="47" Name="Grid Table 2 Accent 3"/>
<w:LsdException Locked="false" Priority="48" Name="Grid Table 3 Accent 3"/>
<w:LsdException Locked="false" Priority="49" Name="Grid Table 4 Accent 3"/>
<w:LsdException Locked="false" Priority="50" Name="Grid Table 5 Dark Accent 3"/>
<w:LsdException Locked="false" Priority="51"
Name="Grid Table 6 Colorful Accent 3"/>
<w:LsdException Locked="false" Priority="52"
Name="Grid Table 7 Colorful Accent 3"/>
<w:LsdException Locked="false" Priority="46"
Name="Grid Table 1 Light Accent 4"/>
<w:LsdException Locked="false" Priority="47" Name="Grid Table 2 Accent 4"/>
<w:LsdException Locked="false" Priority="48" Name="Grid Table 3 Accent 4"/>
<w:LsdException Locked="false" Priority="49" Name="Grid Table 4 Accent 4"/>
<w:LsdException Locked="false" Priority="50" Name="Grid Table 5 Dark Accent 4"/>
<w:LsdException Locked="false" Priority="51"
Name="Grid Table 6 Colorful Accent 4"/>
<w:LsdException Locked="false" Priority="52"
Name="Grid Table 7 Colorful Accent 4"/>
<w:LsdException Locked="false" Priority="46"
Name="Grid Table 1 Light Accent 5"/>
<w:LsdException Locked="false" Priority="47" Name="Grid Table 2 Accent 5"/>
<w:LsdException Locked="false" Priority="48" Name="Grid Table 3 Accent 5"/>
<w:LsdException Locked="false" Priority="49" Name="Grid Table 4 Accent 5"/>
<w:LsdException Locked="false" Priority="50" Name="Grid Table 5 Dark Accent 5"/>
<w:LsdException Locked="false" Priority="51"
Name="Grid Table 6 Colorful Accent 5"/>
<w:LsdException Locked="false" Priority="52"
Name="Grid Table 7 Colorful Accent 5"/>
<w:LsdException Locked="false" Priority="46"
Name="Grid Table 1 Light Accent 6"/>
<w:LsdException Locked="false" Priority="47" Name="Grid Table 2 Accent 6"/>
<w:LsdException Locked="false" Priority="48" Name="Grid Table 3 Accent 6"/>
<w:LsdException Locked="false" Priority="49" Name="Grid Table 4 Accent 6"/>
<w:LsdException Locked="false" Priority="50" Name="Grid Table 5 Dark Accent 6"/>
<w:LsdException Locked="false" Priority="51"
Name="Grid Table 6 Colorful Accent 6"/>
<w:LsdException Locked="false" Priority="52"
Name="Grid Table 7 Colorful Accent 6"/>
<w:LsdException Locked="false" Priority="46" Name="List Table 1 Light"/>
<w:LsdException Locked="false" Priority="47" Name="List Table 2"/>
<w:LsdException Locked="false" Priority="48" Name="List Table 3"/>
<w:LsdException Locked="false" Priority="49" Name="List Table 4"/>
<w:LsdException Locked="false" Priority="50" Name="List Table 5 Dark"/>
<w:LsdException Locked="false" Priority="51" Name="List Table 6 Colorful"/>
<w:LsdException Locked="false" Priority="52" Name="List Table 7 Colorful"/>
<w:LsdException Locked="false" Priority="46"
Name="List Table 1 Light Accent 1"/>
<w:LsdException Locked="false" Priority="47" Name="List Table 2 Accent 1"/>
<w:LsdException Locked="false" Priority="48" Name="List Table 3 Accent 1"/>
<w:LsdException Locked="false" Priority="49" Name="List Table 4 Accent 1"/>
<w:LsdException Locked="false" Priority="50" Name="List Table 5 Dark Accent 1"/>
<w:LsdException Locked="false" Priority="51"
Name="List Table 6 Colorful Accent 1"/>
<w:LsdException Locked="false" Priority="52"
Name="List Table 7 Colorful Accent 1"/>
<w:LsdException Locked="false" Priority="46"
Name="List Table 1 Light Accent 2"/>
<w:LsdException Locked="false" Priority="47" Name="List Table 2 Accent 2"/>
<w:LsdException Locked="false" Priority="48" Name="List Table 3 Accent 2"/>
<w:LsdException Locked="false" Priority="49" Name="List Table 4 Accent 2"/>
<w:LsdException Locked="false" Priority="50" Name="List Table 5 Dark Accent 2"/>
<w:LsdException Locked="false" Priority="51"
Name="List Table 6 Colorful Accent 2"/>
<w:LsdException Locked="false" Priority="52"
Name="List Table 7 Colorful Accent 2"/>
<w:LsdException Locked="false" Priority="46"
Name="List Table 1 Light Accent 3"/>
<w:LsdException Locked="false" Priority="47" Name="List Table 2 Accent 3"/>
<w:LsdException Locked="false" Priority="48" Name="List Table 3 Accent 3"/>
<w:LsdException Locked="false" Priority="49" Name="List Table 4 Accent 3"/>
<w:LsdException Locked="false" Priority="50" Name="List Table 5 Dark Accent 3"/>
<w:LsdException Locked="false" Priority="51"
Name="List Table 6 Colorful Accent 3"/>
<w:LsdException Locked="false" Priority="52"
Name="List Table 7 Colorful Accent 3"/>
<w:LsdException Locked="false" Priority="46"
Name="List Table 1 Light Accent 4"/>
<w:LsdException Locked="false" Priority="47" Name="List Table 2 Accent 4"/>
<w:LsdException Locked="false" Priority="48" Name="List Table 3 Accent 4"/>
<w:LsdException Locked="false" Priority="49" Name="List Table 4 Accent 4"/>
<w:LsdException Locked="false" Priority="50" Name="List Table 5 Dark Accent 4"/>
<w:LsdException Locked="false" Priority="51"
Name="List Table 6 Colorful Accent 4"/>
<w:LsdException Locked="false" Priority="52"
Name="List Table 7 Colorful Accent 4"/>
<w:LsdException Locked="false" Priority="46"
Name="List Table 1 Light Accent 5"/>
<w:LsdException Locked="false" Priority="47" Name="List Table 2 Accent 5"/>
<w:LsdException Locked="false" Priority="48" Name="List Table 3 Accent 5"/>
<w:LsdException Locked="false" Priority="49" Name="List Table 4 Accent 5"/>
<w:LsdException Locked="false" Priority="50" Name="List Table 5 Dark Accent 5"/>
<w:LsdException Locked="false" Priority="51"
Name="List Table 6 Colorful Accent 5"/>
<w:LsdException Locked="false" Priority="52"
Name="List Table 7 Colorful Accent 5"/>
<w:LsdException Locked="false" Priority="46"
Name="List Table 1 Light Accent 6"/>
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<![endif]--><b>Data Response:</b><br />
1. Read analytically. Ask how, why and what<br />
<b> </b><br />
<b>2. </b>Spend not more than 5 minutes to get a very thorough picture<br />
<br /><b></b>
3. Spend not more than 45 minutes on this section<br />
<br /><b></b>
4. Pay attention to keywords used - identify, outline and state do not require detailed analysis or explanations<br /><b></b><br />
<br />
<b>5. </b>Provide explanations if the instructions are explain and analyse<br />
<br />
6. 'Discuss' refers to evaluation-based question. They are always the last question. Suggested approach - 2 agrees, 2 disagrees and a conclusion<br />
<br />
7. 'Consider whether' is the new keyword for evaluation. Sometimes, there may be more than one evaluation questions. May carry up to 4 marks - 1 yes, 1 no and a conclusion<br />
<br />
8. Candidates WILL DEFINITELY lose 1 mark from evaluative questions e.g. 5 marks instead of 6 marks or 3 marks instead of 4 marks if NO CONCLUSION is given. However, that doesn't mean 6 marks/ 4 marks would automatically be awarded either if a conclusion is given. The examiner will also need to consider the quality of the conclusion given e.g. whether it is justified, reasonable, correct or relevant to the context or not<br />
<br />
9. Please make sure that the diagrams are clearly and completely labelled<br />
<br />
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<![endif]-->10. If you can’t finish the 'Discuss' question, please proceed into giving points. It is easier to gain 2 marks than 6 marks<br />
<br />
<b>Essays</b> <br />
1. Read all the three pairs of essays. Get the 'feel'. Provided if you are fully prepared, there is definitely one pair that attracts you<br />
<br />
2. Prepare a skeletal essay before you start and this must done very quickly e.g. less than a minute <br />
<br />
3. Do not define similar keywords in part (b) if you have do so in part (a)<br />
<br />
4. Part (a) essay has to be completed in less than 20 minutes <br />
<br />
5. Part (b) essay has to be completed in less than 25 minutes <br />
<br />
6. While you are writing the essay, keep looking back at the question to make sure that you fully<br />
adhered to what the question wants. Avoid writing excessively and going into irrelevant points<br />
<br />
7. Remember to use evaluation techniques like contradict, magnitude and short-run vs. long-run <br />
<br />
8. Remember conclusion techniques like prioritisation, depends and alternative<br />
<br />
9. IF you happen to realise that you have chosen a wrong essay and you have committed into it, then proceed into completing it. Situation cannot be turned around if you switch essay essay at this stage<br />
<br />
<b>Essays to watch out for:</b><br />
1. Using PPC diagram(s) to illustrate concepts like scarcity/ opportunity cost, economic inefficiency/ recession, economic growth and international trade<br />
<br />
2. Difference between goods e.g. public, merit and demerit and why profits cannot be made in the provision of public goods but possible in the case of merit and demerit goods<br />
<br />
3. Characteristics and functions of money<br />
<br />
4. How substitutes, complements, inferior and normal goods can be identified using elasticity<br />
<br />
5. Factors which will determine the value of PED or PES <br />
<br />
6. How useful is the knowledge of PED or XED or YED or PES to businesses and governments (please refrain from doing this type of question)<br />
<br />
7. Whether maximum price is able to protect the interest of low-income families/ whether minimum price is able to protect the interest of firms<br />
<br />
8. Between indirect tax and education, which is more suitable to decrease the production and consumption of alcohol and cigarettes<br />
<br />
9. Between subsidy and education, which is more suitable to increase the production and consumption of education and healthcare <br />
<br />
10. Theory of comparative advantage and how it can be used to explain the pattern of international trade and whether this theory is practical in reality (you have to bring in issues like trade barriers, trade is far more complex as there are more than two goods and two countries, countries do not specialise in just one good etc)<br />
<br />
11. Exchange rate and how it can affect demand-pull and cost-push inflation<br />
<br />
12. Whether inflation or deflation is more desirable<br />
<br />
13. Factors which will determine the value of an exchange rate under floating exchange rate system<br />
<br />
14. Fiscal/ monetary/ supply-side policies to correct inflationary problem<br />
<br />
15. Expenditure-dampening (contractionary fiscal and monetary policies)/ expenditure-switching (currency devaluation, tariffs and subsidies)/ supply-side policies to deal with current account problem<br />
<br />
There's more...stay tune!!<br />
<br />
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Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com2tag:blogger.com,1999:blog-4710215856934992447.post-41411538147651526142018-10-11T08:21:00.002-07:002018-10-11T08:21:21.327-07:00Highly Likely Essay Questions for Section B of Paper 2 Economics CIE (CAIE) <div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Highly anticipated essay questions for 9708/22 this coming Wednesday (17th October):</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">1.
How a production possibility curve can be used to illustrate economic
ideas like opportunity cost, rising opportunity cost (these two are
different and the latter is becoming more popular in the recent),
unemployment, economic growth and unattainable position</span></span><br />
</div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">2.
Whether market economy or planned economy is more desirable/ likely to
improve consumer well-being/ better in making decisions/ better in
allocating resources</span></span><br />
</div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">3.
Functions of money and whether money is able to perform all the four
functions in an economy that is experiencing high rate of inflation</span></span><br />
</div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">4. What is meant by equilibrium price and quantity and how a change in demand/ supply would alter both equilibrium </span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">5. The right type of elasticity to determine whether two goods are substitutes or complements/ normal goods or inferior goods</span></span></div>
<div style="text-align: justify;">
<br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">6. Whether PED/ XED/ YED would be useful for firms and governments (I won't do these essays if I were you!)</span></span></div>
<div style="text-align: justify;">
<br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">7. Whether the problem of demerit goods can be dealt with an indirect tax and banning/ better information/ minimum price</span></span></div>
<div style="text-align: justify;">
<br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">8. Whether the problem of merit goods can be dealt with subsidies and maximum price</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">9. Whether the imposition of maximum price would be able to help low income families </span></span><br />
<br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">10. Using AD/ AS diagrams, explain how a fall in exchange rate/ depreciation can cause both demand-pull and cost-push inflation</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">11. Inter-relationships between the inflation rate, exchange rate and balance of payments</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">12. Whether floating or fixed exchange rate system is more desirable</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">13. Terms of trade and whether a fall/ increase in terms of trade is beneficial to an economy</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">14. Comparative advantage and how an economy can consume outside its own PPC. Illustrate with trading possibility curve</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">15.
Fiscal/ monetary/ supply-side policies to achieve macroeconomic
objectives like higher growth, lower unemployment and lower inflation</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">16. Expenditure-dampening vs. expenditure-switching policies in reducing current account deficit</span></span><br />
<br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Several important observations:</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">a)
There is somewhat an observable trend in Paper 2. When the examination
board found a new method/ technique or even question to ask, they will
'toy around' with the new concept for several exams/ years before moving
on to other new techniques or questions. For instance 'increasing
opportunity cost' makes its first appearance in W16 (V3). Then it was
asked again in W17 (V3) and now in Feb/ March 2018 (V2)</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">(b)
There is also an indicator that questions may no longer be asked
according to chapter/ cluster. This may pose some challenges for
candidates that tend to specialise in micro/ macro (which I strongly
forbid!!) In W17 (V3), part (a) was about PPC (Chapter 1). However its
part (b) was about supply-side policies (Chapter 5). Another one is the
recent Feb/ March 2018 paper. Part (a) was about price elasticity of
supply (Chapter 2) but its part (b) was regarding supply-side policies
(Chapter 5)</span></span><br />
<br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">(c)
Effectiveness of fiscal/ monetary/ supply-side policies to achieve
price stability is extremely popular in recent years (let's hope that
the trend stays until your exam)</span></span></div>
Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com1tag:blogger.com,1999:blog-4710215856934992447.post-80508395080216239562018-10-11T08:09:00.001-07:002018-10-11T08:11:17.766-07:00Popular Questions in Section A of Paper 2 Economics CIE (CAIE) <div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Important updates:</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">1. Do not evaluate/ provide conclusion just because the question is an 8-marker (Section B, part (a) of each essay). <i><u><b>High
marks do not automatically indicate that the question is evaluative in
nature. By contrast, low marks also do not necessarily imply that there
won't be any evaluation</b></u></i>. In A2, there were instances where a
question is a 5-marker and yet evaluation and conclusion are expected
from students. Instead, interpret/ watch out the keywords that they use
such as:</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">(i) Discuss (most common one) ....</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">(ii) Explain whether ....</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">(iii) How far ....</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">(iv) To what extent ....</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">(v) Do you agree ....</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">(vi) Is this the most important feature ....</span></span><br />
<br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">2. <i><u><b>Evaluations
and conclusion come in a package. You can only have something to
conclude or weigh upon after considering both advantages and
disadvantages/ pros and cons. It is somewhat illogical to provide
conclusion where no arguments/ discussions prior take place </b></u></i>(to conclude against what?)</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">After a 'chronic' two hours, this is what I found:</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<b><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Microeconomic questions</span></span></b></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">a) Calculating percentage of change. You may be asked to find the new price or the original price</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">b) Identify one demand reason and one supply reason which may explain for the rise/ fall in the price of a particular commodity</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">c)
Using demand and supply diagram to show how equilibrium price and
quantity will be affected when an indirect tax/ subsidy is being
introduced. It can also be applied to show how an exchange rate has
risen or fallen in value. Please take note of the keyword '<u><i><b>show</b></i></u>'.
It means that you do not have to provide analysis/ explanation. The
diagram on its own is suffice to earn you a full 2 marks. Only provide
analysis when the instruction is '<u><i><b>explain</b></i></u>'. Alternatively, watch out for the marks allocated. If it is a 4-marker, then you have to explain</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">d)
Maximum/ minimum price. Normally, you will be asked to draw a diagram.
Then you need to include analysis e.g. expansion in demand but
contraction in supply which leads to shortage. Likely to be a 4-marker</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">e)
Production possibility curve e.g. whether it will shift inward or
outward based on the information provided e.g. recession, peace talk
with rebels, economic recovery and others. There will be analysis marks
for this. Usually, it would be a 4-marker </span></span></div>
<div style="text-align: justify;">
<b><br /></b></div>
<div style="text-align: justify;">
<b><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Macroeconomic questions</span></span></b></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">a)
Current account balance. Compare between two given years of whether it
has improved or worsened. Likely to have minor calculations here</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">b)
What other information would be needed to determine the current account
balance e.g. you may be given 'balance of trade in goods' and so, you
have to state the others like 'net trade in services', ' net investment
income' and 'net transfers'</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">c) How a depreciation may cause demand-pull and cost-push inflation</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">d)
Conditions necessary for a depreciation to turn a current account
deficit into surplus e.g. PEDx > 1 or/ and PEDm > 1, there
is no parallel devaluation, inflation rates must not increase by the
full extent as depreciation, trading partners do not impose
protectionist measures and others (very, very, very popular!)</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">e)
Whether protectionism is justified. To some extent e.g. protect sunrise
industries, safeguard sunset industries, ensuring survival of strategic
industries and prevent dumping. No since it will promote complacency,
lead to trade war and cause cost-push inflation</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">f)
How components of the aggregate demand are affected when there is a
rise/ fall in the price of a particular commodity. Consider the case of
falling oil prices. Oil typically has low PED. So, when the price of oil
falls, total revenue from oil exports will also decline. Ceteris
paribus, (X-M) will fall and so there will be a decline in AD. Second,
oil firms will reduce their investment e.g. oil exploration activities.
That will also reduce the AD. Then, government revenue from oil exports
will also be adversely affected. Spending into the economy e.g. schools,
hospitals, roads and bridges is likely to be cut. Again this is a fall
in AD. What about C? In an oil-dependent economy, it is safe to assume
that many people are employed in the oil and gas sector. In this case,
employment will be axed and so C will fall. Alternatively, the
government may raise taxes or introduce new ones to cover up shortfall
in revenue. This will again reduce C into the economy. All these reflect
a fall/ leftward shift of AD</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">g) Whether currency appreciation/ depreciation is more desirable</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">h)
Whether fixed exchange rate system is reliable. Yes as this may promote
international trade, encourage investment and avoid speculation which
may destabilise local financial market. No, as it requires huge amount
of foreign reserves, speculations will always be there and interest
rates can no longer be altered to achieve certain macroeconomic aims </span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">i)
Which category of spending that has the greatest impact onto price
index. Here you need to watch out for largest price change or/ and
component with biggest weighting assigned</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Easy-to-follow tips which may increase your ability to score:</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">a)
If you cannot finish the 'discuss' question in Section A, list out all
the points and evaluations. You may still gain 2 marks for listing.
Obviously, this is better than nothing</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">b)
Before you hand up your paper, please check all the diagrams and ensure
that they are in satisfactory condition e.g. label of axes, label of
curves, whether you <i><u><b>accidentally put price and quantity instead of price level and real output</b></u></i>
(most common mistake). Ignoring this may cause you to lose up to 4
marks, depending on how many diagram questions are there in the paper</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">c)
Write concisely. Do not provide evaluations or/ and conclusion for an
8-marker. It is a pure waste of time as the instruction is '<i><u><b>EXPLAIN</b></u></i>'.
There is no provision of marks for these two, no matter how well you
have written them. While it is not wrong to do so, do bear in mind that
they will certainly take away some precious time from other sections/
parts. Inability to finish the paper = lower marks</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">d)
Use lots of paragraph to distinguish your ideas/ evaluations, one from
another (especially for candidates whose writing skills are still in the
development/ formation stage). It also gives the examiner a pleasant
marking experience which may translate into higher marks (how
significant I wouldn't know, but it does bear some weight. More so in A2
essays)</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">e)
Use diagrams wherever possible in case if you do not know how to
explain a particular concept. Perhaps, the diagram may do some 'talking'
on behalf of you</span></span></div>
Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com0tag:blogger.com,1999:blog-4710215856934992447.post-92010606888475985042018-10-06T11:14:00.003-07:002018-10-08T10:09:46.149-07:00Basic Techniques To Elevate Your Marks For Paper 2 CIE (CAIE) Economics<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">1) Regarding diagrams. This is one of the most overlooked areas. Most candidates would just proceed into explanations without having a second look/ thought about the diagram they drew. When I go through my students' work, I often find that the diagrams are either wrongly labelled or unlabelled. For instance, there is a tendency to label 'Price' vs. 'Quantity' instead of 'Price level' vs. 'Real output' for an aggregate demand-aggregate supply analysis. Another problem is the tendency to label 'Price' vs. 'Quantity' instead of 'Price of USD1 (in MYR)' vs. 'Quantity of USD' for an exchange rate diagram. Such mistakes can cost candidates up to 2 marks</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">2) Regarding the 'Discuss' question under data response. I personally find that this is the most poorly-answered question in Section A. The most obvious reason is poor time management. Candidates may feel that they have spent too much time in the first couple of questions and as a result, this particular question has to be rushed through to make way for Section B. Sometimes, they are even being left out. My suggestion is, in the worst case scenario, list out the answers (in a proper sentence). You would still qualify up to 2 marks provided if the points and arguments are sound and relevant. In case if you do not know how to argue/ evaluate, you could still earn up to 4 marks for one-sided answer</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">3) Always remember to ask yourself a question. 'Am I answering the question?'. According to the examiner reports (it's not the first time), very frequently, candidates tend to write very generally about a particular economic theory without even considering whether it answers the question or not. For instance, if a question asks candidates to discuss whether the knowledge of PED would be useful for the government, then by all means, PED must be written with the theme 'government' in mind. Unfortunately, in a large account, many would write 'everything-they-know-about-PED' e.g. when a firm should increase or decrease prices (not even relevant in the first place), factors that influence the value of PED etc. Marks could be significantly increased if one keeps this simple rule in mind</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">If these three are strictly adhered to, it is possible to easily raise your overall Paper 2 marks to as much as 8 (consider 22/40 to 30/40). That could be a three-grades jump!! (assuming your Paper 1 is doing fairly well) </span></span></div>
Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com1tag:blogger.com,1999:blog-4710215856934992447.post-76798715036696201662018-10-01T09:39:00.002-07:002018-10-09T17:16:36.118-07:00Interrelationships Between Inflation Rate, Exchange Rate, Interest Rate and Current Account Balance (AS Economics)<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Question from a student of mine: Can you please explain the interrelationships between inflation rate, exchange rate, interest rate and current account balance?</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<i><b><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">a) Inflation rate and exchange rate</span></span></b></i></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">A country has relatively higher rates of inflation --> home-made goods become less price competitive in both domestic and international markets --> rise in imports and fall in exports --> increase in the supply of local currency & fall in the demand for local currency to facilitate transactions --> excess supply --> currency depreciation</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<i><b><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">b) Exchange rate and inflation rate</span></span></b></i></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Currency depreciation --> imported raw materials, semi-finished goods and finished goods become artificially more expensive --> increase in the costs of production --> leftward shift of SRAS --> an increase in general price level --> rise in cost-push inflation</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Currency depreciation --> local goods become artificially cheaper in international market and foreign goods become artificially more expensive for domestic market --> assuming PEDx > 1 and PEDm > 1, export value would increase while import value fall --> rise in net exports --> rightward shift of AD --> increase in general price level --> higher demand-pull inflation</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<i><b><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">c) Inflation rate and interest rate</span></span></b></i></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">An increase in the rates of inflation --> exceeded the targeted level --> monetary authority would have to intervene pre-emptively --> raise interest rates to slow down economic activities</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<i><b><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">d) Interest rate and inflation rate</span></span></b></i></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Higher interest rates --> cost of borrowing will increase --> households and firms will reduce spending into the economy --> fall in AD --> decline in price level --> reduce demand-pull inflation</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<i><b><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">e) inflation rate and current account balance</span></span></b></i></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Relatively higher inflation rates --> home-made goods become less price competitive in both domestic and international markets --> assuming that PEDx > 1 and PEDm > 1, value of exports would fall while value of imports rise --> worsening of current account balance</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<i><b><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">f) Current account balance and inflation rate </span></span></b></i></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Say, if a country has current account deficit --> value of imports is greater than the value of exports --> a decline in net exports --> lower AD --> fall in average prices --> lower demand-pull inflation</span></span></div>
<div style="text-align: justify;">
<br /></div>
<div style="text-align: justify;">
<i><b><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">g) Exchange rate and interest rate</span></span></b></i></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Currency depreciation --> imported raw materials, semi-finished goods and finished goods would become artificially more expensive --> an increase in costs of production --> fall in SRAS --> rise in general price level --> triggers cost-push inflation --> if this exceeds the targeted inflation rate, then monetary authority may have to intervene by raising interest rates</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Currency depreciation --> local goods would become artificially cheaper in international markets while foreign goods would become artificially more expensive in domestic market --> assuming PEDx > 1 and PEDm > 1, value of exports would increase while imports fall --> higher net exports --> rise in AD --> higher price level --> triggers demand-pull inflation --> if this exceeds targeted rate of inflation, then the central bank may have to raise interest rates</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<i><b><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">h) Interest rate and exchange rate</span></span></b></i></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">An increase in interest rates --> commercial banks and financial institutions offer higher rates of return on savings --> attract very wealthy foreigners and pension funds to deposit/ save money in this said country while at the same time there will be lesser outflows of hot money --> demand for local currency would increase while supply of local currency in money market would fall --> excess demand causes appreciation</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<i><b><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">i) Exchange rate and current account balance</span></span></b></i></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Currency depreciation --> foreign goods become artificially pricier in domestic market while local goods cheaper in international markets --> assuming that the both exports and imports are price elastic in demand --> value of exports would increase while imports fall --> net inflows of money --> improvement in current account balance</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<i><b><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">j) Current account balance and exchange rate</span></span></b></i></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Say, a country has current account deficit --> imports are greater than exports --> supply of local currency would increase while demand for local currency to facilitate transactions would fall --> excess supply causes depreciation</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><i><b>k) Interest rate and current account balance</b></i> (has two possibilities where one can become the evaluation of the other)</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Rise in interest rates --> higher cost of borrowing --> spending by households and firms into the economy would fall including buying imports --> lesser outflows of money --> improvement in current account balance</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Rise in interest rates --> rise in inflows of hot money while a fall in outflows of hot money --> demand for local currency increases while its supply falls --> excess demand leads to appreciation --> foreign goods eventually become more price competitive --> buy more imports --> worsening of current account balance (assuming imports are price elastic in demand)</span></span></div>
<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="text-align: justify;">
<i><b><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">l) Current account balance and interest rate</span></span></b></i></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Say, a country has large and persistent current account deficit --> value of imports is greater than value of exports --> fall in net exports --> leftward shift of AD --> fall in general price level --> lower demand-pull inflation --> may fall below targeted rate of inflation --> monetary authority may be forced to cut interest rates pre-emptively</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">This should be a comprehensive guide. Do use it wisely and please refrain yourself from memorising them at all costs! Think logically :)</span></span></div>
Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com0tag:blogger.com,1999:blog-4710215856934992447.post-54399740938561334002018-06-27T17:08:00.001-07:002018-06-29T14:42:57.004-07:00Tariffs and How Do They Affect Us?<div class="separator" style="clear: both; text-align: center;">
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<br />Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com2tag:blogger.com,1999:blog-4710215856934992447.post-43672562464059151462018-06-27T05:11:00.002-07:002018-06-28T03:52:04.840-07:00Pareto efficiency vs. Pareto improvement<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">What is Pareto efficiency?</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">It is also known as Pareto optimality or otherwise, social efficiency or economic efficiency. It is a state where the welfare of the people is said to have been maximised. There is no way that the society can be further better-off. The economy is already operating on the boundary of its frontier. The only way for a person or entity to become better-off is by having another person or entity becoming worse-off</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">What is Pareto improvement?</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">It is a process in which an economy is trying to further improve the overall well-being of its people. More technically, it is when an economic action leads to a further increase in overall utility whilst at the same time, no one is being made worse-off</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">Source: economicshelp</span></span> </div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">Point D illustrates the idea of economic inefficiency/ Pareto inefficiency. This is because the welfare of the people/ society can actually be further increased when point D moves to point A or B. Members of the society are able to consume a greater combination of both goods and services. There is no opportunity cost between the two. The higher is the level consumption, the greater is the utility or satisfaction or well-being of the community in this case</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">Some practical examples of Pareto improvement:</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">a. Charitable activities can be considered as one. When Bill Gates gave away, say, $5 billion of his wealth to a charity fund or a very poor Sub-Saharan African (SSA) nation, he may get a joy and pride of doing so. At the same time, the recipient(s) may also get to benefit in the form of new roads, new houses, new schools, new hospitals and others</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">b. Instructing prisoners to carry out community service e.g. graffiti art and picking up litters is another good example. In the process, inmates may gain some self-esteem by being able to express their thoughts or show their soft-side. Members of the society gain in the form of cleaner environment and more beautiful sights. Taxpayers' money can also be utilised more meaningfully in this case</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">However, it is also worth noting that not all movements to the boundary of PPC can be treated as Pareto improvement. For instance:</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">a. The construction of new roads, railroads, schools and hospitals have tremendous economic benefits to the society e.g. higher actual and potential growth, more job opportunities, more tax revenue for the government and many more. However, this is not a Pareto improvement because in that process, some people will be inevitably made worse-off e.g. families and firms that have to be evacuated, loss of biodiversity, vocal environmentalists and others</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">b. The establishment of a free trade area/ trading bloc may lead to long-term efficiency gain. Regional growth and income will increase, people will have more choice, there will be more jobs with better pay, government finances improve, firms exposed to competition will become more competitive in future, free movements of labour will improve allocation of resources and many more. All these are the net economic benefits that no one can deny. However, this still cannot be classified as Pareto improvement. There are plenty of costs to be considered too e.g. demise of local firms/ industries that are unable to compete, more cases of structural unemployment, problems associated with migrants like lowering wages and 'stealing' jobs, worsening deficit and many more</span></span></div>
Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com0tag:blogger.com,1999:blog-4710215856934992447.post-27166106919048671702018-06-27T05:11:00.000-07:002018-06-28T01:09:05.933-07:00Economist Dilemma Between Efficiency and Equity<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">What is economic efficiency?</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">Resources are finite or scarce. In fact, many of them are irreplaceable or non-renewable. Once they deplete, they will be gone for good. Therefore, there is an urge by policymakers and economists to utilise these resources in the best possible way to ensure that wastages can be avoided or at least minimised</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">To achieve efficiency (although this may be very difficult), we must ensure that the highest level of output is being produced from a given amount of input, and eventually, the final output must be in the best interest of society or individuals. The first condition is known as productive efficiency. If it is achieved, costs of production would be at its lowest. The second part of the definition refers to allocative efficiency. In order for efficiency to take place, both conditions must be present. Resources are still wasted if only either one condition is attained. For instance, a car company may brag about its ability to lower the costs of production over the years. However, if it finds great difficulty in selling them off each time, then it would be equivalent to resources wasted. Factors of production like land, labour and capital that went into making those cars could have been utilised elsewhere more meaningfully</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">It is also worth noting that once efficiency is fully attained, an economy would be operating along the boundary of its PPC. Society's welfare is said to have been maximised (hence the condition of MSB = MSC, which is also known as social efficiency). It is impossible to further increase social welfare. No one can be made better-off without making another person worse-off, and hence the condition of Pareto efficiency</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">What is equity?</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">Equity is concerned with the final outcome and it can only happen when the result is the same or fair for everyone</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">In practice, it can be quite difficult to achieve both simultaneously:</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">a. An increase in income tax rates will reduce the incentive to work hard. In other words, it causes inefficiency. However, equity may increase because of the benefits pay out</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">b. A poll tax (a levy that a voter has to pay in order to be able to cast a vote) can be considered as efficient as it doesn't reduce the incentive to work. However, it can be considered as inequitable as the rich pay the same amount as the poor</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">c. An indirect tax onto cigarettes obviously improves the allocation of resources. Production and consumption of a demerit good are reduced to a socially optimal/ desirable/ efficient level. However, the outcome may not be entirely fair to low-income smokers who happen to be the group that finds it hardest to quit the habit. There will be a regressive effect as they now have to spend a bigger portion of their disposable income to purchase cigarettes</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">d. Bailing out troubled banks is morally wrong. However, that seems to be the most sensible action to take especially when there is a major financial crisis. If major banks collapse, so is the entire economy. There are costs in doing so e.g. higher taxes, poorer credit rating, rise in budget deficit and national debt and many more. However, the economic benefits are perceived to be far greater e.g. preventing other firms from going bankrupt, save tens of millions of jobs, avoiding capital flight, preventing value of currency from nose-diving, lowering the number of poverty cases and many more. Having said so, some will not be happy. Their marginal tax rates may be adjusted upward, fewer low income/ jobless people qualify for benefits and spending onto healthcare and education per capita will decrease. This is inequitable</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">e. Construction of new roads may improve overall economic efficiency/ well-being. However, not everyone will be equally pleased e.g. affected families, evacuated firms and environmental activists </span></span></div>
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Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com0tag:blogger.com,1999:blog-4710215856934992447.post-20710852589405022202018-06-24T23:43:00.001-07:002018-06-27T10:42:09.889-07:00Economist Dilemma Between Equality and Equity <div class="separator" style="clear: both; text-align: justify;">
<span style="font-family: "arial" , "helvetica" , sans-serif; font-size: large;">What is equality?</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; font-size: large;">In economics, equality may imply:</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; font-size: large;">a. evenness</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; font-size: large;">b. fair division</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; font-size: large;">c. equal access to resources </span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; font-size: large;">d. same number of identical tools to work with</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; font-size: large;">e. everyone is being given a similar opportunity</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; font-size: large;">What is equity then?</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; font-size: large;">In economics, equity is whether the final outcome is the same or fair for everyone. Equality does not automatically result in fairness. Everyone may be given the same access but the final result may be unfavourable for some. One can happen without the other. To illustrate, consider the following scenarios:</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; font-size: large;">a. A family dinner of four, consisting of parents and two young kids. Equality means everyone is being served with the same portion of, say, chicken. However, this is inequitable. Adults have bigger appetite and therefore should be given a bigger portion. On the other hand, children have smaller appetite and therefore should be served with a smaller portion</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; font-size: large;">b. An economics class with 20 students. Equality is when everyone gets the same teacher. However, different students have different needs, different academic capabilities and also different learning styles. The teaching technique employed by the teacher may not necessarily work for everyone in the class. This explains why some students may score better than their friends although being in the same class</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; font-size: large;">c. An economics exam with 2 hours. Equality is when every candidate is being given the same amount of time to sit for a particular paper. However, the outcome may be unfair for certain students. Some may suffer from problems like minor dyslexic, hand injury and vision problem. To compensate or ensure equity, students with such problems must be given some leniency in the form of extra time, say, 30 minutes</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; font-size: large;">Hurdle race. Equality is when everyone begins from the same starting line. However, we know that it is going inequitable. Runners in the inside lanes have distinct advantage over those runners in the outer lanes because the distance that they have to cover is shorter. To create an equitable outcome and to ensure that the result is fair, those who are running in the outside lanes must be positioned ahead of those who are in the inside lanes</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; font-size: large;">e. Scouts with backpack. Equality happens when every scout member carries the same amount of weight. However, this could be very unfair/ inequitable as the scout leader does not consider the ability of each member. To achieve fairness, bigger and taller/ adult scout members must carry more weights while the rest shoulder lighter weights</span><br />
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Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com1tag:blogger.com,1999:blog-4710215856934992447.post-69525923908203201382018-06-11T00:38:00.000-07:002018-06-11T05:00:11.934-07:00Key Concepts That Are Frequently Being Tested in Paper 3 of Economics 9708/32 (CIE) (CAIE)<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">Popular economic concepts tested in Paper 3:</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">1. Outcomes due to unanticipated/ unexpected increase in money supply (according to Monetarist)</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">a. Unemployment will fall in the short-run. In the long-run, it will return to its initial level. Expansionary demand-side policies will not be effective in addressing supply-side unemployment</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">b. Price level will continue to increase, both short-run and long-run</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">c. SRPCs (short-run Phillips curves) will continue to shift upwards and to the right due to expectation of higher inflation rates by workers</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">2. Allocative efficiency/ overall economic welfare can be improved if one person can be made better-off without making another person worse-off (Pareto efficiency criterion). This will involve a horizontal or vertical movement between two points</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">3. Under monopsony labour market:</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">a. The dominant employer will use MCL = MRPL to determine the profit-maximising number of workers to be hired. The pay will be based on the ACL which is also the supply curve of labour</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">b. The pay that these workers get is even lower than what they would have otherwise received under competitive equilibrium of MRPL = ACL or DL = SL</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">c. An intervention by trade union will increase their current pay close to the competitive equilibrium. There will also be an increase in the number of workers hired</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">4. An increase in savings is crucial as banks will have more funds to generate lending. This will boost an increase in AD as well as LRAS, especially in the context of developing countries</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">5. When revenue is maximised:</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">a. MR = 0 (gradient at the peak of TR curve would be zero)</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">b. PED = -1</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">c. Profit would be lower than the one under MC = MR</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">6. Economies of scale corresponds with INCREASING returns to scale (% of change in output > % of change in input). As output increases faster than input, costs can be spread over a large number of output, thereby reducing unit costs. By contrast, diseconomies of scale corresponds with DECREASING returns to scale (% of change in input > % of change in output). As input increases faster than output, costs will be spread over a smaller number of output and this results in rising costs per unit. Please take note that you may be asked to CALCULATE % of change of both. It is <i><u><b>PERCENTAGE of CHANGE NOT DIFFERENCE</b></u></i></span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">7. Government incurring a budget/ fiscal deficit:</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">a. Is also equivalent to expansionary/ reflationary fiscal policy</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">b. <i><u><b>Money supply will increase</b></u></i> if the borrowing is from central bank or overseas</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">c. <i><u><b>Money supply may not increase</b></u></i>/ stays unchanged if the borrowing is from domestic banks/ non-banks private sector/ members of the public. This is believed to be related to crowding-out effect e.g. banks have less money to lend, firms have less money to invest and households have less to spend. It also implies more competition for money which causes interest rates to increase. Since cost of financing increases, both firms and households cut down their spending. This results in 'neutralising' effect of aggregate demand</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">8. Expansionary monetary policy:</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">a. The most common ones are cut in interest rates and an increase in money supply</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">b. It also includes relaxation of lending policies as well reduction in cash ratio/ reserve requirement so that more loans/ credit can be created</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">c. May also include currency devaluations </span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">d. Happens when the central bank buys bonds/ securities/ treasury bills from banks. This will result in an increase in money supply. Also known as OMO (open market operation)</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">9. Labour mobility can be increased if national minimum wage is abolished. Reason is, there is no point moving from impoverished areas with high unemployment into prosperous areas with job opportunities. After all, the wage is the same and yet costs of living are higher. Unemployed people are better-off staying at where they are now despite vacancies are hard to come about</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">10. Kuznet curve:</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">a. Initially, as income rises, quality of environment degrades. However, beyond certain level, as income continues to increase, quality of environment will improve. This is commonly seen everywhere in developed nations and even emerging economies like China and Malaysia. When people have lower income, they care less about the environment. Once people have reached certain level of income they would want to care for the environment they live in</span></span></div>
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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">b. Another Kuznet curve shows how income inequality changes over time as income rises. Initially as income rises, income inequality will worsen. However, after reaching certain level of income, income distribution will improve. This model is true considering the circumstance that one sees in developed nations. Reason being, income tax rates will become more progressive while benefits more generous</span></span></div>
Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com0tag:blogger.com,1999:blog-4710215856934992447.post-23202407234031122342018-06-10T10:29:00.002-07:002018-06-10T10:39:55.062-07:00Common Errors/ Misperceptions in Paper 1 of 9708/12 Economics (CIE) (CAIE) <div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">1. <b>Money is NOT one of the factors of production</b>. Resources/ inputs are strictly four only and they are none other than land, labour, capital and enterprise. To be considered as a factor of production, it must possess the feature of ready-to-be-use. Consider airline industry as an example. Pilots can be instructed to fly the airplane. Airplane itself enables the airline company to be able to provide flight services to its customers. However, money e.g. bank notes and coins cannot be instantly used to produce goods and services. They have to be converted into land, labour, capital and enterprise before any production process can commence</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">2. <b>Enterprise must be a business-starter or owner</b>. This is not true. Enterprise is someone who is willing to undertake business risks. It must also manage the other three factors of production. In this case, key/ management people like CEOs, CFOs, COOs and even division managers are completely fit to be known as enterprise as they fulfill the definition. It is worth noting that they are not business founders</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">3. <b>Public transport is a public good</b>. Just because the term 'public' is being used, that does not automatically imply that public transport is a public good. Do not classify a good/ service based on its name, instead, group it according to the features that it has. In this case, public transport is a merit good. It has economic benefits not just to the users but also to people around them e.g. reducing congestion and air pollution</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">4. <b>Change in demand and change in quantity demanded are similar</b>. No, they are not. Economists attempt to segregate the most important determinant (price) away from other 'not-so-important' determinants (advertisements, taste/ fashion, income, price of substitutes and price of complements). For the most important determinant, we give it a special name which is 'change in quantity demanded'. It involves movements along the same demand curve. It either contracts or expands</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">5. <b>Change in supply and change in quantity supplied are similar</b>. Again, they are not. Change in quantity supplied is due to the most influential determinant and that is 'price'. change in supply is due to 'less important' determinants such as indirect tax, subsidy, technology and wage costs. For a change in price, we say quantity supplied rises or falls. It will be a movement along the same supply curve. It either expands or contracts. There will be no shift, contrary to what some may think</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">6. <b>Total revenue (TR) is different from total expenditure (TE) by households (P x Q)</b>. No, they are the same. What you pay is what the firms will get. If you pay more, the firms will receive more and likewise is true. If PED < 1, an increase in price will lead to an increase in TR and TE. Likewise, if PED > 1, a rise in price will lead to a fall in TR and TE</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">7. <b>Elasticity is gradient</b>. No, it is not and will never be. Gradient is the same along the same demand/ supply curve. However, elasticity varies from one pair of price and quantity to another</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">8. <b>Flipping the formula of PED and PES</b>. Instead of (% of change in QD/ % of change in price) and (% of change in QS/ % of change in price), they become (% of change in price/ % of change in QD) and (% of change in price/ % of change in QS). Do take note that, according to the definition, it is how sensitive is QD/ QS to a change in price. Whatever that is being 'to' will always be at the bottom. If you still think that they are difficult, then think of 'having <i><u><b>D</b></u></i>inner on <i><u><b>P</b></u></i>late' and 'having <i><u><b>S</b></u></i>upper on <b><i><u>P</u></i></b>late'</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">9. <b>Underestimating the importance of unity/ unitary PED</b>. This concept is EXTREMELY important in our syllabus of Economics. Every time if you are given a hyperbola demand curve, you must be pre-informed that the total revenue/ expenditure will be unchanged regardless of whether the price increases or falls. It is also the case where total revenue/ expenditure is maximised when PED = 1</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">10. <b>Ignoring the term 'effective' for both maximum and minimum price</b>. For maximum price to be effective, the new price has to be set below the equilibrium. If, due to information failure, the price is accidentally set above equilibrium, then everything will be back to normal e.g. follow existing equilibrium price and quantity. There will be no effects at all. The same for effective minimum price where the line must be above the equilibrium price. After all, the aim is to protect producers from lower prices. If it were to be accidentally set below the equilibrium, then obviously producers will be disappointed as that will not be helpful to them. The market will revert back to the original equilibrium price and quantity</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">11. <b>Only tax can be progressive</b>. This is not true. Benefits can be progressive too. For income tax, the richer is an individual, the bigger will be the proportion of their income being paid out as tax. The concept works the same for benefits too. The poorer is the person, the greater is the amount of benefits that he/ she will receive. This would eventually cause the amount of benefits received to increase expressed as a percentage of income</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">12. <b>Confuse between marginal tax rates and average tax rates</b>. This results in being unable to perform calculations/ interpretations involving these two. Bear in mind that marginal tax rate is the additional rate of tax that will be applicable when income increases from one range to another. In the UK, there are three marginal tax rates, 20%, 40% and 45%. Average tax rate = amount of tax paid/ income</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">13. <b>Free trade area means that there will be no trade barriers at all</b>. In case if you think that member countries are free to export to one another, then you may be misinformed. Yes, according to TEXTBOOK definition, but NO in the real world. In ASEAN alone (which is a free trade area), there are about 6000 goods that are being subjected to various trade barriers. Check the link below:</span></span><br />
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">(https://www.thestar.com.my/news/nation/2017/04/28/najib-remove-trade-barriers-within-asean/) </span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">14. <b>Government spending, direct taxes and investment can only affect AD</b>. This is true in the short-run. However, in the long run, they can have impact onto LRAS too. For instance, government spending onto healthcare will improve public health and as a result, there will be fewer absenteeism from workplace. This will reduce wage costs for firms. Lower direct tax e.g. income tax may increase one's incentive to work knowing that he/ she may get to keep a larger proportionate of disposable income. Investment will keep operational costs low as new technology tends to be more efficient. LRAS/ PPC will shift rightward</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">15. <b>Depreciation affects only exports</b>. This is untrue. It also affects imports. When the value of a currency falls, imports will become pricier. Ceteris paribus, less imports will be purchased</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">16. <b>Unaware that an exchange rate may affect both demand-pull and cost-push inflation</b>. My observation tells me that most candidates will only mention about cost-push inflation e.g. increasing/ reducing costs of import. What majority aren't aware of is, it can also increase or decrease (X - M) and hence AD</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">17. <b>A country does not have to be paid in its own currency</b>. In answering, we say that if we trade with another country, we must honour the transactions by paying that country their respective currency. However, the country that we trade with may request to be paid in another valuable currency e.g. dollar, pound, euro etc. Do watch out as this element/ idea has been tested several times in MCQ (sorry I can't remember which question but I have seen it before)</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">18. <b>Unaware that trading possibility curve (TPC) is part of syllabus</b>. It is the a frontier that both countries can achieve shall they choose to specialise and trade goods in which they have comparative advantge</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">19. <b>Flipping between expenditure-dampening and expenditure - switching policies</b> (This is usually due to rote-learning). How to remember then? The key lies in these two terms itself. To dampen/ reduce expenditure, income must be reduced and that is only possible through contractionary fiscal (cut government spending and raise taxes) and monetary policie (reduce money supply and increase interest rates). With lower income, less imports that can be purchased. Expenditure switching means measures to switch spending away from imports through methods like currency devaluations, subsidies, tariffs and quotas. All of them will increase price of imports relative to home-made goods </span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">20. <b>Thinking that monetary policy involves only money supply and interest rates</b>. In reality, it also involves currency devaluation/ revaluation, reducing/ increasing reserve requirements (amount of money that commercial banks must keep with them and cannot be lent out) and loose/ tight bank lending policies</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Mistakes are always found on these areas:</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">1. Unable to perform calculations involving elasticity e.g. either flipping the formula, using the wrong formula or unable to interpret the information given</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">2. Unfortunately, elementary mistakes still seen in questions involving shifts of demand or/ and supply curves. Another one includes movements along the same demand/ supply curves</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">3. Unaware that total revenue/ expenditure will be unchanged if PED = -1</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">4. Unable to perform calculations involving consumer or/ and producer surplus e.g. problems with interpreting the areas</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">5.Unable to determine areas of tax revenue, tax incidence for consumers and firms and total subsidy payout by government. Therefore candidates have problems in calculations too</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">6. Lack of understanding especially with the terms of trade e.g. 1 apple < 1 banana < 4 apples involving the theory of comparative advantage</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">7. Difficulty to match the options given (A to D) to the diagram involving shifts in demand and supply of an exchange rate</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">8. Lack of understanding in terms of macroeconomic logic e.g. which macroeconomic parameters that can affect AD or/ and SRAS/ LRAS</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">9. Unable to satisfactorily interpret/ perform calculations involving CPI. Rate of inflation = (CPI2 - CPI1) / CPI1</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">10. Thought that deflation and disinflation are the same. The former means falling CPI and therefore negative rate of inflation. Disinflation is where prices are still increasing albeit at a slower pace. CPI is still rising</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">All da best to all of you </span></span></div>
Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com0tag:blogger.com,1999:blog-4710215856934992447.post-8776044251289042112018-06-03T18:36:00.001-07:002018-06-04T09:46:29.188-07:00'Confusing' Economic Terms That Are Often Being Used in Paper 3 (9708/32) (CIE) (CAIE)<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Economic terms that have the same meaning:</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">1. <i><u><b>Capital formation/ capital stock/ investment</b></u></i> - rise in capital goods such as buildings, equipment and machines</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">2. <i><u><b>Budget deficit/ fiscal deficit/ public sector borrowing requirement (PSBR, used in the UK in the past)/ public sector net cash requirement (PSNCR, currently being used in the UK)</b></u></i> - where government spending exceeds tax revenue and hence there is a need to borrow</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">3. <i><u><b>Reflationary policy/ expansionary policy</b></u></i> - measures to increase the aggregate demand</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">4. <i><u><b>Law of diminishing marginal return/ law of variable proportions</b></u></i> - a situation in which output will begin to increase at a slower/ diminishing rate as more workers are being added to a fixed capital </span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">5. <i><u><b>Withdrawals/ leakages</b></u></i> - outflows of money from the circular flow of income such as savings (S), taxation (T) and imports (M) </span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">6. <i><u><b>Managed float/ dirty float</b></u></i> - an exchange rate system in which the value of a particular currency is allowed to fluctuate against another but within a predetermined range</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">7. <i><u><b>GST (Goods and services tax)/ VAT (Value added tax)</b></u></i> - a charge which is levied by the government on each stage of production process</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">8. <i><u><b>NRU (Natural rate of unemployment)/ supply-side unemployment</b></u></i> - refers to structural, real-wage, seasonal and frictional unemployment</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">9. <i><u><b>price control/ maximum price</b></u></i> - the highest legal price for a particular good or service above which it cannot increase</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">10. <i><u><b>MFC (marginal factor cost)/ MCL (marginal cost of labour)</b></u></i> - wage costs incurred when one extra worker is hired </span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">11. <i><u><b>AFC (average factor cost)/ ACL (average cost of labour)</b></u></i> - total wage costs per worker</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">12. <i><u><b>GDP at market value/ GDP at current price/ nominal GDP </b></u></i>- value of all final output within an economy which is calculated using prices of that reporting year</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">13.<i><u><b> MV/ PT/ GDP</b></u></i> - M is money supply while V is velocity of circulation of money, the number of times in which the money exchanges hand from one person to another. Multiply both and you will get total expenditure. P is price level and T is number of transactions. Multiply both together and you will get total value of output. Since total expenditure = total value of output, they must also equal to total income and hence GDP</span></span><br />
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Economic terms that are often thought to be the same but they aren't:</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">1. <i><u><b>natural monopoly vs. monopoly</b></u></i> - Natural monopoly is when the ideal number of firm in an industry is one. Usually, such industries have very high fixed costs and therefore cannot possibly tolerate competition. Otherwise, costs per unit will increase as it cannot sufficiently enjoy economies of scale. Monopoly has two possible definitions. It is the sole producer for a good or service. As such it owns 100% of the market share (traditional definition). Another definition is that, when a firm controls at least 25% of the market share (legal definition that is widely used)</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">2. <i><u><b>budget deficit vs. national debt</b></u></i> - One is when government spending exceeds tax revenue. National debt on the other hand implies accumulated deficit over the years. While budget deficit is probably a couple of percent of GDP, national debt could be as large as 200% (probably more) of GDP</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">3. <i><u><b>means-tested benefits vs. universal benefits</b></u></i> - Benefits that are available for those whose income falls below certain level e.g. cash aid. Universal benefits refer to benefits that are available for everyone, regardless of age, gender and socioeconomic status</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">4. <i><u><b>mpc (marginal propensity to consume) vs. apc (average propensity to consume)</b></u></i> - Former means, how much of an increase in a dollar of income that will be spent away. For example, mpc = 0.64 means, of every $1 dollar increase in disposable income, 64 cents will be consumed. Latter refers to the percentage of income that is being spent. So, if apc = 0.64, it means 64% of disposable income is being spent</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">5. <i><u><b>mps (marginal propensity to save) vs. aps (average propensity to save)</b></u></i> - In the same fashion, mps means, how much of a dollar increase in disposable income which will be saved. So, if mps = 0.36, that means, of every $1 increase in disposable income, 36 cents will set aside as savings. On the other hand, aps is defined as, percentage of income which will be saved. So, if aps = 0.36, it simply means, 36 percent of disposable income will be saved</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">6. <i><u><b>NRU (natural rate of unemployment) vs. NAIRU (Non-accelerated inflation rate of unemployment)</b></u></i>. Both are not quite the same although they are related. If NRU = 4%, then this is the rate of unemployment in which the inflation rate will not accelerate. Any efforts e.g. expansionary fiscal or monetary policy to reduce NRU will eventually cause inflation rate to accelerate (and hence the name)</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">7. <i><u><b>Law of diminishing marginal return vs. returns to scale</b></u></i> - One refers to production in the short-run and the other into the long-run. In the short-run, capital is fixed, The only way to increase output is by hiring more workers. So, as more workers are being added to a fixed capital, we can observe how the output changes. It initially increases with a faster rate. Eventually the rate in which it increases will diminish, and hence the name. Returns to scale is the observation on how the output changes as both capital and labour are increased proportionately. If output increases faster than inputs, we get increasing returns to scale for instance</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">8. <i><u><b>multiplier vs. credit/ money multiplier</b></u></i> - Multiplier means, the number of times that the national income will increase from an initial amount of injection. Credit multiplier is, how an initial deposit can lead to a bigger final increase in money supply</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">9. <i><u><b>GDP vs. GNP</b></u></i> - value of all final goods and services that are being produced within the borders of an economy over a period of time. GNP is the value of all final goods and services that are being produced by factors of production which belong to an economy over a period of time. GDP may include output/ earnings by foreign workers but GNP does not</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">10. <i><u><b>Government failure vs. market failure</b></u></i> - One is when government interventions lead to misallocation of resources. The other is, when operations of market forces lead to misallocation of resources</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">11. <i><u><b>terms of trade vs. balance of trade</b></u></i> - Former is, average export prices/ average import prices x 100. Latter refers to the value of exports of goods and services minus the value of imports of goods and services</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">12. <i><u><b>trade deficit vs. budget deficit</b></u></i> - One is a withdrawal (W) because M > X. The other is an injection (J) because G > T </span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"> All da best peeps!!!</span></span></div>
Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com1tag:blogger.com,1999:blog-4710215856934992447.post-50650505721232973362018-06-03T18:35:00.001-07:002018-06-04T02:11:03.967-07:00MCQ Review for Winter 2016 (9708/32) (CIE) (CAIE) <br />
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" 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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">F to G represents substitution effect and G to H represents income effect. Answer is C</span></span></div>
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" width="400" /></span><span style="clear: left; float: left; font-family: "arial" , "helvetica" , sans-serif; margin-bottom: 1em; margin-right: 1em;"><span style="font-size: large;">Vertical integration refers to the merger between two firms from the same industry but at different stage of production process. Backward vertical is a cooperation/ merger between a manufacturer and a firm which is close to the source of inputs. Forward vertical is a cooperation/ merger between a manufacturer and a firm which is close to the customers. A is incorrect as it is equally applicable to horizontal integration. B may or may not be true unless stated as forward vertical. D may or may not happen. Larger firms/ firms with bigger market share may or may not be productively and allocatively efficient. Answer is B. Through backward vertical integration, a manufacturer is able to secure a steady supply of raw materials. Through forward vertical integration, a firm will be able to expand its market share easily without the need to incur high spending on advertisements and R&Ds</span></span><img alt="" height="106" 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" 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<span style="clear: left; float: left; font-family: "arial" , "helvetica" , sans-serif; margin-bottom: 1em; margin-right: 1em;"><span style="font-size: large;">A contestable market is one where the barriers to entry and exit are low. Perfectly contestable implies that there are no barriers to entry and exit. Answer is therefore D. One common mistake is to always assume that a contestable/ perfectly contestable market is necessarily perfect market. That is not true. In fact, even a monopoly or an oligopoly can be contestable. Otherwise, we won't have so many options of banks, airlines, cars, smartphones and others to choose from. A big firm can even become contestable if the government were to intervene into their operations. Answer is D</span></span><span style="clear: left; float: left; font-family: "arial" , "helvetica" , sans-serif; margin-bottom: 1em; margin-right: 1em;"><span style="font-size: large;"><img alt="" src="data:image/png;base64,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" /> </span></span><span style="clear: left; float: left; font-family: "arial" , "helvetica" , sans-serif; margin-bottom: 1em; margin-right: 1em;"><span style="font-size: large;">B is the answer. Income inequality is NOT A MARKET FAILURE. It cannot be considered as one, as wage/ pay differentials may be due to factors like academic qualification, experience and skills which correctly justify as to why one person earns more than the other. A, C and D are market failures. Asymmetric information causes transactions not to settle at the socially efficient/ optimal e.g. consumers buying when they shouldn't and consumers aren't buying when they should. Monopoly will cause market output to settle below socially desirable level. Non-excludability is related to public goods. They are goods that are high in demand and therefore should be made available. Unfortunately, in free market, none of them that will be provided</span></span><span style="clear: left; float: left; font-family: "arial" , "helvetica" , sans-serif; margin-bottom: 1em; margin-right: 1em;"><span style="clear: left; float: left; font-size: large; margin-bottom: 1em; margin-right: 1em;"><img alt="" height="110" 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" width="400" /> </span><span style="clear: left; float: left; font-size: large; margin-bottom: 1em; margin-right: 1em;">Poverty trap is a situation in which a person has no incentive to take up a better paying job. The reason is, that particular individual may realise that he/ she is not really well-off after being promoted. He/ she will start to pay higher rates of income tax, benefits will be significantly reduced or withdrawn altogether and there are also more job commitments. A is therefore the answer</span><img alt="" height="138" 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" width="400" /><span style="clear: left; float: left; font-size: large; margin-bottom: 1em; margin-right: 1em;"> </span></span><span style="clear: left; float: left; font-family: "arial" , "helvetica" , sans-serif; margin-bottom: 1em; margin-right: 1em;"><span style="clear: left; float: left; font-size: large; margin-bottom: 1em; margin-right: 1em;">Net leakages imply that there are greater outflows of money than inflows from the circular flow of income. Trade surplus is where X > M and this is a net injection. Budget deficit is when G > T and this is another net injection. Private sector surplus means S > I. Answer is D. The first two are net injections. Only the last one is a net leakage </span><span style="clear: left; float: left; font-size: large; margin-bottom: 1em; margin-right: 1em;"><img alt="" height="104" 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" width="400" /> </span><span style="clear: left; float: left; font-size: large; margin-bottom: 1em; margin-right: 1em;">Most candidates thought that there is only one type of time lag. In fact there are four e.g. recognition lag, decision lag, implementation lag and finally effect lag, all in their own sequence. The question asks for the first stage and therefore the answer is C </span><span style="clear: left; float: left; font-size: large; margin-bottom: 1em; margin-right: 1em;"><img alt="" height="98" 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" width="400" /> </span><span style="clear: left; float: left; font-size: large; margin-bottom: 1em; margin-right: 1em;">Contractionary monetary policy involves measures like reduction in money supply, higher interest rates, higher cash reserve ratio/ reserve requirement and stricter bank lending. A will allow commercial banks to pass on the cheaper cost of funding in the form of lower interest rates. B will allow commercial banks to be able to generate more lending. Purchase of foreign currency using local currency will cause foreign currency to appreciate while local currency to depreciate. This will cause X to increase while M to fall. The economy will expand. Answer is D. Sale of government bonds in an open market a.k.a. open market operations (OMO) will cause commercial banks to have lesser money to lend out. So it is a contractionary policy</span></span><span style="clear: left; float: left; font-family: "arial" , "helvetica" , sans-serif; margin-bottom: 1em; margin-right: 1em;"><span style="font-size: large;"> </span></span> </div>
<br />Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com0tag:blogger.com,1999:blog-4710215856934992447.post-71922506214386473342018-06-01T19:45:00.000-07:002018-06-03T18:27:55.571-07:00MCQ Review of 9708/32 of Summer 2016<br /><br />
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" 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<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">When there is a fall in the price of a good, its quantity demanded will usually increase. For the case of normal goods, both substitution and income effects are positive. As for inferior goods, substitution effect is positive but income effect is negative. However, since substitution effect is stronger, there will still be an overall increase in quantity demanded. Giffen goods e.g. mud cakes in Haiti have positive substitution effect but negative income effect (just like the case of inferior goods). However, because negative income effect is more dominant, this results in an overall decline in quantity demanded when there is a fall in its price. M to N is positive substitution effect. N to A is negative income effect. Answer is therefore A</span></span></div>
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" width="400" /> </span><span style="font-size: large;"><span style="clear: left; float: left; font-family: Arial, Helvetica, sans-serif; margin-bottom: 1em; margin-right: 1em;">A, B and D are correct. The only incorrect option is C. One biggest limitation of the kinked demand curve theory is that it does not explicitly explain how oligopoly firms 'agree'/ ended up setting the price and output at the kinked part of the demand/ AR curve</span></span></div>
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" width="400" /> </span><span style="clear: left; float: left; font-family: Arial, Helvetica, sans-serif; margin-bottom: 1em; margin-right: 1em;"><span style="font-size: large;">Profit maximisation happens when output is at the level where MC = MR. What this means is that, when the gradient of the TC curve and TR curve is equal, the gap between the TC and TR curves will be at its greatest and hence profits are said to be maximised. Revenue maximisation is when output settles where MR = 0. When TR curve reaches its peak/ the turning point, its gradient which is MR will be equivalent to 0. This is why we say MR = 0. Sales maximisation is the highest level of output that a firm will sell without incurring a loss. Therefore it will sell up to TC = TR where normal profit is earned. But if TC/Q = TR/Q, we will get AC = AR, hence the condition of sales maximisation (don't get them mixed up again!). Initial profit area = P1HGF (MC = MR, must minus cost). New profit area = P2KLF (MR = 0, again must minus cost). Answer is C</span></span><span style="clear: left; float: left; font-family: Arial, Helvetica, sans-serif; margin-bottom: 1em; margin-right: 1em;"><span style="clear: left; float: left; font-size: large; margin-bottom: 1em; margin-right: 1em;"><img alt="" height="102" 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" width="400" /> </span><span style="clear: left; float: left; font-size: large; margin-bottom: 1em; margin-right: 1em;">It cannot be A. Rising influence of trade unions may create labour market inflexibility. If firms find it difficult to fire, they will not hire as well. Unemployment may persist into the long-run. B is incorrect either. Import duties imposed may most likely cause trade retaliations. Manufacturing jobs will be lost and it is the low income people that suffer the most. C will cause some jobs to be lost too. The more sensible and effective way to create income equality is through progressive income taxes. Answer is D</span><span style="clear: left; float: left; font-size: large; margin-bottom: 1em; margin-right: 1em;"><img alt="" height="123" 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ohrH7udVPgle09oOtTt+Q4TQtaDI3XIOhxIE0Lwd57u+k73/HbC50CHbF3tqurlJ99sInDZznMIIYTq2i98kZAxoVZRwaplE0RJFgXeane8chghrkm4l60oHJu+ophw4z4Hn++pLAo8Onra0c4hhFCd7Y2PPvvwtXqEEOJ4+9XQag5LM56BtrwgxJ8YCzzMT96FH678Iew521L4Z8S1vPHpYoYwDUjrgupHa8vAJ3NSrkpTFy3ATi2VvdhQFSsbZIfeKTm3suOJ6bK5BFFm9FfhQYQQQkOTT/ITVmZ6tLGuwzW7Ra1ItbPSQQ7HSVrU2Ya8kbyd9UNd0TXDUJFFgUctJ04e5Zhd45qE4FKlGviRf6DRarLLzEFRKmAYZsV2mX2nFDbsvioM6Droqq3wWhmHL2E8b1T+q254VAb5yIcf9DdZBvwreR23592dfN7+qQfLxSz6OHjhKNfrSzy/e2L7llosLcPXF6WcvOwfarC2uWYVQf00NGrjen0JjLOi0IQQahLELMYxbw930h3dUFbH6emx1ro212yuGAR42ddnaR289q2Ec9Lsh6csjQP+R5haRaEdu1Zp2Ftahr33wl+JD9YrC/f2v3KImVosLec/T8i5dOhyK+IaBn/7Jyknx671Whr6/bGk/yxX9/PAWo7gVVGw53tafCiOZcR3W5FdEFcxIVj6SmivO+wM5xgGlGld2Iy6uy3HL9x8KBMsJ6cEe32rcDdTnakNU0uushehKXqu3Zl31KmlInLKawi8xeivwoP/fuPdn1gtg/4VmRCcCV1q5M54Y1l6RVagllosKrYVdXdztvOTcZlgOfHFhfaGDuf9jHGoa1KLTqgsy6LAo7qOsVsrMsaSOE7p2p1p/7s0NXJPJs+Z7bJiTFALrLPCrLJdet8x1VZpo+4rbUWPIl21M4SxajGeN4r+NR0eFaIaXv7Jib/gznhjm4TgrchEB3fas6hYzeC1Ofdr9Vy3cO/J85tZ9i+1lPbWlY+0ebbTgbes1rcC6UzUfdJ6vKuTO+mOSiv+QUubK5LLV28bDa2pqhdkriX9Z7lDY6EsJoQQ/Dh6595MXMLUKuUWc+xapWHf7YpkWIVF7zl2ajnmDK+TQq+bhwOpojV4h+9BOviLBu5I7xXP51PfpkpPXqWZC0vx+YcSxnJqQQz++rzNWlhVUAx4J0Hpwsqcqxu1jvjuiqIoimLIP9qFSmXMmtowtWxX9kKmr1p07KzjHU1qqYiccmrJRBj9VXkwfXukoWnA/wjnM2uPN4YZFZc+pQeqNrWsRFzdit2M7JLnVZR/CjAIdY2FdUIlLosCj171LOWnpK24ty/fhKJrGaYa5rtcjg1qgYufXvsZPcwq241T+05XUrxj0H2FrRhjXE/tsVAW66YWnXmj6F+z4UEL8vn/d6W1/iXPwjaRws4urscbK+eQzKL39fr6vvHp5Zq+wDxwHITUQkg6MGxtHfky5OluHbxx093Z1Ou78/lg8xHnN5us6oUffwg7j6Fuz5Im+xu0uK5fSz1RUgozZlL170odSsGN1yLXLp5stiKEENc24JmRsGLmkh8GhNPNHEKI423HbDyHHL4EvTu3REoXJFGwaTcBuLP+pOK52ZypDd61VPRi9R7VIAZ2ZsaD2dTC7K9a7TVROMb1eGNrgWFr/oGXUfGba+ZSy/eiYCu4hhBC5ISvH1nenHySqzK16IWKLAq89a1AervcRN3F4DpWVJSYapjvcjk2qAX+avDsUXqYVbY7S7UevbD/95cMRkr5d8YY11P7rD+Z000t+vPG99WEBzXI1yOul1HHRGT9a+eRpj6fIrPkws7Dh+zu+ec7r5CDklrID5ODzUfefPOM5VXP0tOIq9v6iuMVa5czLBFW9cKPTxO+fsXDlxT1T4xPLm4ZtCjr11JPTJTC7w4eR6UC+IH31CFzqeWBFJ+ZEv+8QbCcigTcQy35x8/CzLWw6DnNWc9MfL0iF9Vmp5ZQnNKFP36jekLEGw/uT4kLKdXGtClT62+IVfbC6fo5TzGIgZ2Z8VDVqoXWX7XaeDM8foRzvPfBYHGbiFExtotVS75obVML6vPGt8pNtLkiOWWM0RYEhfZMd1lWr1q0BSLhf/5rozArtmt+1cILoZDRQ1j5d8YY11N7ISXrr1r0542VasKDHuTZRc9L3PFLzvNNBfuXzCy6zpzzRNbJ884BSS3yin/QghDqdEe38XrwYh1C6Mh4eBMTVnX1numQPyYTLC/7hxrqe7xL2KhF/Vqa+bSy8F/9z3N/xTUN+B7IJJu8+/4pCzKXWhYWPae5hnP+5SwhOUm82p5PLevBkbo6u/vuPecx1PhOMJ0jRbHs1CJuUbqwmJ2b6ORsw9ejEiZYCk+cqrf0+ZZVz1OmTK2bWrKVvXj/s3/soRlkZ94xSC0Fc83LBG8y+qtVe3ve3WlFqHhsgVVxmaFYqcWiPvnqjHctNUwth+zCVFLG8sqtsY5CE4qKmKmG+S6XY4Ne4NEjZpjR3rVU9p2uZNpwfa/4nR5FumovY1PvWliRWVV40EXhmK+vASFUPk+RVzcVvuH7Q7j6c7LPHAcktRAc8/Zw+eNYhDyZHLRwjaPThUGim1qMTnqwWjQ6IaaaTysKbyVDwsnCQRHbT8+ebDC5IaY6W1XaEMNx/+vNCCF04n+80V6X/ze+a2ikvw11TES2WN0xPLrD8fbLgYT2NKQZU1dxQqzQixTVIDv0jn5qKZrr0Ggoy+hvhdqbMe8ZDrWNBB/TfFqsyFKs1OLJk/+9UGB98bO32wsm0JwQq2FqOXy8q4VTN6HZraWrYb7LzEFRKkANM1q7zL5TChtvHat+N39CTNEv3dRSzQkxo/Cgq5d/hiu+QyoiiwK/g0/unkGelz/0srMvOaqqpS2M5dSC2Q871ILk1IKo3afKSQ9jKRkTkk1Fw1VIZX6FcH8nqlVBZS/YBtn1dzYVlMxVkr+j/lZRUd1inqo+KKmS4uS7norOGDRR9Xctul2mFqjiu5ZaKMlUTP8blOpjoIYytaJyTybPWRsvhTLP8SkwPZ6X1AIAzxd78ncQgP0AZ6K3fuMdH7Q1drsjz/H39vpAagGAg8ie/PU2YF/IRT9+mW+0X/AvbrygSxYCqQUAAACoOZBaAAAAgBoDqQUAAACoMZBaAAAAgBoDqQUAAACoMZBaAAAAgBoDqQUAAACoMZBaAAAAgBoDqQUAAACoMZBaAAAAgBoDqQUAAACoMZBaAAAAgBoDqQUAAACoMZBaAAAAgBoDqQUAAACoMZBaAAAAgBqz16llKzF5qdfhcLz+f8I7v8gzGRQGHJX0Xg3+6ZbQe94b3ailys8YWE6GpyJr+yJBUXI1uIeW3zvhe6o2cPA4EDeq7Sjq9kDz3c8VVbDHqWV73t1pRQgh1DYSfLxTKU/DXqcgCIIwOtjFI0vX4GVBEARB+G04+hsHsgmiVEudny1Wbw7X1zt88f2QoCyZ8O2h5fcuAeyp2sDB40DcA72jeK695rufK6phT1ML3gyPH0EFLAP+ld3e5imJgg3xgliydnGmkFML96MprROwFJ8JR1NZpn5SfEZcSMkVasmpqPiNTkWDJuRUdCYulaVimnpYTn1XKoWl+Iyqio7yamkJnwPxjHDJSfFZUSO2UrJWAqOWpuTuLE9ITorPaRvR2o0tzVg+gx2ordHKsGksxWdEsVI4vSRNlLJFhjR66BrqVm1fjCVTY7taIXoFKEPDoAmVudQTNDu2i/VNjEqacxWGZc4qqlYqjGaguaYkLUopU5a6v3pzRe3Z09TyNDRqQ8ja8Ytf/MyKEHfGG9vcnUBqajlk62rnEUIIce1jt5P5f8smApftPIcQQsjaMvDJnKReV+K1Oc/Zlvy/17/sONFQlKqsWGcb8kb+M+YfaLQOTT7JuyczPdpY1+Ga3aI1IYsCb7U7XjmMENck3MsmfA501NFvV6oniwKPjp52tHP5Jt746LMPX6tHCCGOt18NreaYyldKS0wLfCFzK61CCMHSjGegjSv824mxwMOK3llbBj6ZW72jkkCvRQgpRHq55E4tL4sCj1pOnDzKGdgtv7ZQuaP9whcJecPAs9l7QtOhbs93mBCyHhypQ9bhQJoQgr/zdNd3nvvbHtNqa7WqKqgQ4lre+HQxQ/AjWvzc/TNNlKrFK5NipTRm6Jowu35fqolzejQWYrs0G8Z9Dp42rGimoxZQ9JRrefW14iClt0I1vqIwY0Qow1J3VOrIp7pMOauU4plmND3J2tRSORwwZcqScpQZYPLaLxlzxR6xl6klfXukgUPcac/io+BIG0LWDtfs1q4kUlOLpWX4+qKUw+npsda6NtdsjuCtqLvbcvzCzYcywXJySrDXtwp3M2U5eHNuotNiH7udkEk2eff9U5a8VLwVdXdztvOTcZlgOfHFhfaGDudX8clzVsugf0UmBGdClxq5M95YltpEWhR4ZGkZ9t4LfyU+WFeqJy/7hxqsba7ZbL7M+c8Tci4dutyKuIbB3/5Jysmxa72Whn7/I6byNGk5+pNILuk/y9X9PLCWI3hVFOyoSRCzDLOUJdBrlaVqVy07sHx+wNR1jN1akTGWxHGm3WyCKOFlX5+ldfDatxLOSbMfnrL8hePtN+268vMPNFyvL4FxVhSaEMr3Ase8PdxJ902PebXVWkmGQZUR321FdkFcxYRg6Suhve6wM5wjuSfa+On7+PfvUUXJ5RbvfPnJWzRp1NC991+mzK7fl2nzcc6Kxiw9tRiPR2qBtai7m+u4EFiWSTY5fdXOIXZquZumG79UOKsf27LRqGQ4V+Wyf/vdJdqsokktGqP9UTLQvJwFKoZD44D/0SZlyrqfoY7lB58+H6uW3JPJc1aEuB5vDOdHHUKt74o7f5lPGKmlbTSUfzFVCuVMxNWNWkd8d0VRFEUx5B/tQofGQuVIykRc3ajbs1T44YfJwaZyxU53dDv/e3bJ8yo67Ayv3h5paBrwP8L5aavHG8P0JoJTV3jU7YpkFOqVdvYL6m2IAo+OOcPrxQLNw4EUIflQ4h2+eabyNGkyPbVsp4O/aOCO9F7xfD71bXFtzjDLUingqLUUaFPLDiyfHzCvepbyK/etuLcPHXaKdwSa3daS/rNcqTp+HL1zy/3XDfryCdlOB96yWt8KpDNR90nr8a5O7qQ7Kq34By1trsjDKtRWe9O4awRL8fmHEsZyakEM/vq8zVpYMKU18fOPn71PFyWLCjvQpVFD98uwKbMb9SVpNs5Z0bhBTy3mxqO2wN85BXt5MOKYr7ded9VCN36x8KZ+bMsGozLOcq7CsKxZRZNaKoawgealyS5XMRzuzcRX5qhTVo42lp+TDTEc8/U1IC27eZlPdN61EEIUoSyJgk3bMnfWn8yp5Dh8CcX/liuWf5cTvn5keXPyyRNROMb1eGNrgWFr44D/EWY08bvPxlTRYDj8lAUKQRxhKl9FaiEEr0WuXTzZbEUIIa5twDMjYYZZvrlWlkCppZBJe9dSpeXzGwhvBdLbZQvXXQzcukyz2w9h5zHFWC06Tlc+IYSkA8PW1pEvQ57u1sEbN92dTb2+O58PNh9xfrNZjdpqb5poWn4YEE43cwghjrcds/FcMZbW1PEzf48hSjWb0KVRQzcQMmN2476YjXNWNDJSi7nxqC1wov+1FtogZaQWhvHLhXVjWzYYlXGWcxUVWbOKUWoxlpxnvWI4kIpGS1NWjtLf5yO14Ji3h9NGC9rty3yTqUWz+MAbD+5PqV6sqZ8vyg9EtFULL4gy3gyPH+Ec730wWNwxoDfx/fSVXaeWeabyVaSWnBSfmRL/vEGwnIoE3EMtqNsVeUyXHCutWqi1FPsWxqnF0PL5AdPnjW+VLdzmCt8RaHZ7mvD1Kx5vpaj/8l8ipC+fEELID5ODzUfefPOM5VXP0tOIq9v6iuMVa5czzBjbprxp2LXsouc0Zz0z8fWKXBReHPOa+EmzRClmE5Y0auh+GTZlduO+mIxzVjSqYhs/8J46VMV41BaYCX5wQvFjeXIjg3MAACAASURBVBEgU1qZijKMX9oQ049to9SywHKuoiJrVtFPLYaal9/rVwyHifHJP35Dn7JoY/nzj56D1LIecb2sSSSFZLOrl/kmUwvenJvo5GzD16MSJlgKT5yqt/T5lhVHtvLvVIavRyWcXvRfbC9s4xYqVmxclk9RF7Y4GE3E7lKnyKpSS4ypPLWz68GRujq7e179Xi676DnNNZzzL2cJyUni1XbU7Ypk6JKlkgR6LYVXFW3t0PL5AXPILkwlZSyv3BrraOhw3k+LdLvlN5eH/DGZYHnZP9TAH3/tJ3+pKz/fyIp/0FJIQng9eLEOIXRkPLzJSM+mvGnYtfWw8xhqfCeYzpHiVnv5cVIVP0xRitmEJY0auvcypsxuoi/m4pwVjVsxbw/XNOB7oHmFaTgeaQU+ffDdJz2W/GDMv1ooDH1MaeWWyDB+sePr+rFtlFr+g+VcRUXWrKKfWgw1175rUQyH+h7vYpY+ZdHG8p3fl8cvToZvXL8RTu720C6bvUktm984j1hQab8yD37kH2jc3ct8k6mFqE9NcLz9ciChOZZXKsDx9j7HUWux4vriZ2+3F9Zb5eMWhGzGvGc41YYepQltNOwktcSZytM3auP+15sRQodGQ8oeqs6HlJf/NMkKCRv0WiWhirZ2anlZFHh0+HhXC6ewMNtu+ifEqJ4lpDD75I9CEfJkctDCNY5OZ0h1AVMxtvW7lh/YdYV/7Roa6W9DHRORLUyLH7oo5TzFlkYNXTNmN9MXU3HOjsZUSDhZOP5k++nZk9SDl/rjUVlA8WN9m+2wpSCN0sq9DYa56CfEqt4Qi7HcoTYsY1bRSy3GmjOsVDohRp+yKP3dVoxfWRT4vT0q9lz/oRcsxWfu006xb0vhf3FfD6cKS9fvPN18m2tWsTNd1Xct1CZ2TRWSc9LDGO0cPZZTCyL96weNZKUERi2DtswqX3qKTEVnzH6YQv+uZQ/MbkasQZlsKho2q5hxc5XSdEO3WrOYL1+FZCynFujfjhgKoRaQU9H7Cyk5pngOYLViaHz92DZEX77RrLJzyWqq+K6lsr/mxm8teK5TC5P8t5xH+l03QuL05K/esFlOuebgC+394EB8Hf0M88KGblydWg4gL6xr6LyYqYUQnF6cHB+0N3Ncc9dr73wi/nCAQ/a54kD8Tadnmhc0dJNB4fWfeaMHOm5eUNfQeVFTCwAAALBnQGoBAAAAagykFgAAAKDGQGoBAAAAagykFgAAAKDGQGoBAAAAagykFgAAAKDGQGoBAAAAagykFgAAAKDGQGoBAAAAagykFgAAAKDGQGoBAAAAagykFgAAAKDG7FlqWQ0KvQ4FA8Nj//h/o2s7uiggGRQGHJX0Xg3+6ZbQe94b3ai19s8QWE6GpyJr+yJBUXI1uIeW3zvhe6r2nrIjzffg70wzosWcelXpA38k2wS7H/57xZ6lloTPgSrgdnaBwdOw1ykIgiCMDnbxyNI1eFkQBEEQfhuO/kZxa9sLyerN4fr6Xd13bV6CsqTqvrxas3cJYE/V3lN2ZJPa347DihZz6lWlD1ztY8zuh/+esceppXh3D5ai14dtih92BvMCYzm1cD+a0kqmXsem+XfqlXPV3TJJu/FNdWMcpqmH5dR3pVJYis9oLpljKq+WlvA5EM+IrZwUn6Xc96eRrJXAqKUpuTvLE5KT4nOU+wSZtxNW3jKpL5/BDtTWaGXctBnPimJl64qGmJGpaqWiCxWSmbNzFTcVquNBL94YVZQtFPTJUrxfoZVWefOjkgrL7PSSNBcrI4Ehje44w5jZW3f8OOxTaiFkPeJ6GSFrp3t+e+dCqanlkK2rvXBRdvvY7aTmkmqEkLVl4JM5Sb2sxmtznrP5+9lR/cuOE9RLvOtsQ97If8b8A43WockneV9mpkcb6zpcs1u0JmRR4K12xyuHEeKahHvZhM+Bjjr67Ur1ZFHg0dHTjvbC5fBvfPTZh6/VF64EvxpazTGVr5SWmBb4woJQk7NVN2PzJ8YCDyt6Z20Z+GRu9Y5KAr0WIaQw0Msld2p5WRR41HLi5FHOwG75tUXlZeAbBp7N3hOaDnV7vsOEkPXgSB2yDgfSJH+hbH3nub/tMa22VitTXdP1rDLqEOJa3vh0MVOoWGroyqRIjUzV/eraoNKTbOp+9Yqwr7xfnT8xNnntl4x4K6nHCDyqiZQ2ZNi/oDxNPX1HK+cZqnHwI9q4vvtnmouZDlKYmjGlGE1Ee+SOA8B+bohx9b0fVVi2KqipxdIyfH1RyuH09FhrXZtrNkfwVtTdbTl+4eZDmWA5OSXY61uFu5myHLw5N9FpsY/dTsgkm7z7/ilLXireirq7Odv5ybhMsJz44kJ7Q4fzq/jkOatl0L8iE4IzoUuN3BlvLEttIi0KPLK0DHvvhb8SH6wr1ZOX/UMN1jbXbDZf5vznCTmXDl1uRVzD4G//JOXk2LVeS0O//xFTeZq0HP2xJZf0n+Xqfh5YyxG8Kgp21CSIWYZZyhLotdQ+Va5admD5/ORS1zF2a0XGWBLHmXazCaKEl319ltbBa99KOCfNfnjK8heOt9+068on5Glo1Mb1+hIYZ0WhCaF8L3DM28OddN/0mFdbrZVkrmt6ns2I77YiuyCuYkKw9JXQXnfYGc6VKg5774Xv/NvvLtEiU5NaNGHwR0lPsiq1VJi0ccD/aJMS9vcz1Hh48Cn9Mbmg3pp+COW9n59AFTbUsX+/LyHTRuX9jL6jy1tzmGH23BPtuO77+PfvUV2sdNCXn7xFk0adUu79l1HM7JU7DgD7/K4lb+UdQ00tbaOh/Fus0u3ZmYirG7WO+O6KoiiKYsg/2oUOjYXKIZ6JuLpRt2ep8MMPk4NN5Yqd7mjhgSe75HkVHXaGV2+PNDQN+B/hfDT3eGOY3kRw6gqPul2RjEK90s5+Qb0NUeDRMWd4vVigeTiQIiQfv7zDN89UniZNpqeW7XTwFw3ckd4rns+nvi0uzxlmWSpFJ7WWxqfK1LIDy+dH6auepfwyfyvu7UOHneIdgWa3taT/LFeqjh9H79xy/3WDvnxCttOBt6zWtwLpTNR90nq8q5M76Y5KK/5BS5sr8rAKtdXeNNk1Hc/GCZbi8w8ljOXUghj89XmbNf+gLYul7rMiU5NaKsJAT7IyteQqTHpvJr4yRw37HC0eWDswBa3S+iFE9X44p2P/fl8iTR+VOV1HK59gGcYhac24/sfP3qe7WOEgljSq474MG8TMnrnjALBvG2LZlcA7rQgh61uB9I63xJjvWgghiplCEgVbRVY760/mVHIcvoTif8sVy7/LCV8/srw5+eSJKBzjeryxtcCwtXHA/wgzmvjdZ2OqkcxMLcUyygKFCSjCVL6K1EIIXotcu3iy2YoQQlzbgGdGwgyzfHOtLIFSS+NT7buWKi2f31soxYCc8PWjuouBW5dpdvsh7DymGK5Fx+nKJ4SQdGDY2jryZcjT3Tp446a7s6nXd+fzweYjzm82q1Fb7U1zXdPzbJzIDwPC6WYOIcTxtmM2nssHm6IiKzKNUoux5DzrFSYlFY2Wwj5HiQeD1CLph5BaHznh60fWtwLptK79nzLV03G0UjeGcQhZU4/r+XsMF6vUpkujOi4QMoiZPXPHAWDfUgvBS55uhNCujnyYTC2axQfeeHB/SvVuTf2IgWO+3nrmqoUXRBlvhsePcI73PhgsrqDpTXw/fWXXqWWeqXwVqSUnxWemxD9vECynIgH3UAvqdkUe0yXHSqsWai3F8t04tRhaPj+59HnjW2ULt7nCdwSa3Z4mfP2Kpzwp6r/8lwjpyyeEEPLD5GDzkTffPGN51bP0NOLqtr7ieMXa5Qwz5mVT3jTZNR3PLix6TnPWMxNfr8jF1isSACsy9VPLVNRYckHHCpNOjE/+8Rt62NPi4fOP9DfE9ENIvWopPY/r25+2aikYhe3oMlmW2QnRjOs0y8XKtz4MaVTHfRk2iJk9c8cBYI9TC9fcdTr/EcoJG88hhCyveGM7f49vMrXgzbmJTs42fD0qYYKl8MSpekufb1lxZCu/ezt8PSrh9KL/YjuHlBUrdjkJ2Z53d1oRKr4qZDQRu0udIqtKLTGm8tTOrgdH6urs7nl1us4uek5zDef8y1lCcpJ4tR11uyIZumSpJIFeqyxV2dYOLZ+fXA7ZhamkjOWVW2MdDR3O+2mRbrf8TvSQPyYTLC/7hxr446/95C915ecbWfEPWgpJCK8HL9YhhI6MhzcZ6dmUN012Tcez/xF2HkON7wTTOVLcjq9IAKzI1E8tt0RjycXQ15q0vse7mKWHPS0e7vyeFm8l9R7rhxDV+xkj+zNHpY6jFVHLMjshmnHNdLHCjCxpVMfdyxjFTC3dgZPhG9dvhJM7+naw9uznuxZrS+/47cROzw4SYjq1EPURC463Xw5o2y0V4Hh7n+OotVhxffGzt9sLhzDKZzMI2Yx5z3CobST4uEJCuQntSN5Jaokzladvssf9rzcjhA6NhpQ9VB0mKe9L0CQrJGzQa5WEKtraqeVlUeDR4eNdLZzCwmy76Z8Qo3qWEEJwzNvD5Y91EfJkctDCNY5OZ0h1AVMxL5vpmt5Dg5z44kJ7XaF619BIfxvqmIhsYXVDjMjUSy33NkxJruxF6UgSPewpUbRNjzf6CTH6hpjW+yzbKid0xqhkO1oRCyyzE0IqxjXdxcrcz5ZGdZz5iWjX7pBFgT9AR8We6z/0gqX4zH3a8fptKfwv7uvhVGH1+p2nm29zzSp2zav6roXaxK6pQnJOehijfQOB5dSCSD9lr5GslMCoZdCWWeWLo3Q9FZ0x+40C/buWPTC7GbG7bTqbiobZ1Y0ic+eS1VTxIUVlPBjGgH4IsVXVt+2uvmup1jj6Lq6Upus4Q4F7644fh+c6tTDBm+HxI+hIv+tGSJye/NUbNsvO/kwAUDXwibUuEJnPKOA4LS9maiEEpxcnxwftzRzX3PXaO5+IP8BUtz/AH4YyACLzGQUcp+ZFTS0AAADAngGpBQAAAKgxkFoAAACAGgOpBQAAAKgxkFoAAACAGgOpBQAAAKgxkFoAAACAGgOpBQAAAKgxkFoAAACAGgOpBQAAAKgxkFoAAACAGgOpBQAAAKgxkFoAAACAGgOpBQAAAKgxe5pasJwIeUYHT9nqEd/uOP/e/42u7ejCmmRQGHBU0ns1+KdbQu95b3SjapGrQaOKWE6GpyJrO9F3JyiaM9ZtX1H8GXzTNtmHLhwwK1H4ETRMBoXXf+aNPis3FsANC88xe5dactLcR731nOoKY65rbDpVfXZ5GvY6BUEQhNHBLh5ZugYvC4IgCMJvw9HfKC5zrQbDYb96c7i+3uGLVy15ZyibO2CTZvnyLvM2gdRCfhQNlVcyPwPAvXDPMXuWWrYi7u5DCNWfGg8lZUzkxO0xO4cQOjIe3tzxXZuSKNhUtz8Xb+SWUwv3oylthFKvBaWDtRISPgfiy9MoS5Sciupfi8rUQd2ipjlNE4x7TCldZilGUSMnxWdFE3e6lse/Skmz1U1pi6X4jChqCxjVMizMuhe2pDbLOxR9GP3dTYxpyUnxOYpFlQozLvHFUnxmJi5hc6mFqrOhrVR6mne9Roiqj+ZSS5XNAQeDvUotubDzMEKo8VIoU4gIvPr19V/fCIZ3EyLU1HLI1tXO5xdF7WO3k/l/yyYCl+18fs1kbRn4ZE5SL7qLOYkkfA501NFvV0mQRYEvLLR4YSpGEyWLAm+1O145XCg3NPkk36/M9GhjXYdrdoulQ2WLiWlFc6Jc0k0loc425I1IObrCChSKcU3CvSxNDSzNeAbaCitK/sRY4KGsHeflSarwezxUUvLQuXF3RfUqzKsEr815zrYUF7dcyxufLmaMaxk3oTJd+4UvEjJWWya4RPUOTR+quXYbYxqXoZYTJ49yzBjTKFwMBrXCXMux44ctvCBuMFxJNQu1IxVRVHRXtZFTFFKHEKroY6kiSwLD8sAzwB6lFjnh60cIIYcvUUux1NRiaRm+vijlcHp6rLWuzTWbI3gr6u62HL9w86FMsJycEuz1rcLdjFKSatgXJMjL/qEGa5trNkdKy4gYS5QsCjyytAx774X//ca7P7FaBv0rMiE4E7rUyJ3xxrJMHagtKhcERd22ou5uznZ+Mi4TLCe+uNDe0OG8n2EpXDJ9WbGvxAcSTY3pB/6zXN3PA2s5gldFwY6aBDGLDVJLedWylKRVJ1WZtwDOiO+2IrsgrmJCsPSV0F532BnOGfXRsAl52ddnaR289q2Ec9Lsh6csjQP+RwrL3Jn2v0vzDlUfMUHrbw1iTOWyuo6xWysyxpI4TomxO9P+dynBQPDm3ESnxT52OyGTbHL6qp1DOqkF08yySetIWhVF60VNc1TX60ZOQUjok/OVfUwbpBZ6c0azBHAgeA5SS9toKP9iuRSRmYirG7WO+O6KoiiKYsg/2oUOjYWUQaka9qW3NYrnu8I0Os8SJYsCj7pdkQwhhKRvjzQ0DfgfYfI0NGrjerwxzNaB2iIltaxEXN2o0x3dzmucXfK8ig47w3GGwiXTKxWjm+Lvf/+Hiw3ckd4rns+nvk3JWFHRTGp5kA7+orK6CkPzlsBSfP6hhLGcWhCDvz5vs1qHA2nDWgZN3En4z3Ilj+PH0Tv3ZuKSwjJs71D0+SJO6W8tYkzlslc9S/m1wVbc24cOO8M5olW4MhhymYirG3V7lgr7ew+8pw6xU0suSTHLyhytI8GpK4ooKrFNdb1u5BSEUPso3tFPLfTmgGeCPUot2+nAW1aEFIOBkK2lwK+v/2ukcmvDPMx3LYQQRURKomBDGriz/qTiSdFsaomwRKkHw5ooHON6vLG1wLC1ccD/COvoYDa1fC8KNkVulhO+fmR5c3L2mol5qqQYQ42Vx5FrF082WxFCiGsb8MxI2HxqiRO8VlldhfnUIj8MCKebOYQQx9uO2XgOOXyJ3aaWW6LzWHnCpViG7R2qPpT+1iLGlIpZ3wqkt8uOrrsYXMdahSuD4cma+ve10GgbO7WshylmoXfkd5+N0d+C0FxvHDmMPgZuXdbfEDOONOCgslfvWvCKf8CCEOocC+XfQeTSocutCKGGXwTT20a1WZhMLZpHPLzx4P6UuKB66qlq1UITpR4MeDM8foRzvPfBYHFnjK3DblYtvCCaWrWUFKOqMb+0GJ4S/7xBsJyKBNxDLajbFcmoKhaff6mrFik+U1ld5Sizs2p20XOas56Z+HpFLhaoRWoJxX39ijWEFPVPjE8u/le5gyzvbND0uRal9PdxDWJM5bI+b3yr7Og2VySndCVt1cILoqz+nbpqKbtSTlDM8sdvaB35fvoKLbXkqK43jhxGH8PUVUtZAr05AjwL7N3hYynq6a9HCHFHHG//rytvO1o4hFB9jye6tQuZ5lIL3pyb6ORsw9ejEiZYCk+cqrf0+ZaVzzuGw349OFJXZ3f/xzpDlPZwy/a8u9OKELIOB9KEEB0dqC0WmpuXFbrlJdDetZhPLVQ1/unWx6e5hnP+5SwhOUm82o66XZEMjnl7uKYB3wOZZJN33z9lQdoJoqDk1996KNVVjjI7q66HncdQ4zvBdI4UG61FahG3ln19ltYhf0wmWF72DzXU93iXtsqWYXmHqs8/3ab1twYxpnLZIbswlZSxvHJrrCP/HkXpSkwPhvxrxcLvOSn8fv5dyxbDlZhilsUsrSOxu9SzW9lFmimMI4fRx9K7FoYEenMEJ8M3rt8IJ2EBc5DZy08m8Vrk2s+7+NJpm7Z+178ldrVhajK1EPWhF463Xw4k1KcqDYc9jvtfb0YIHRr91yWaqIpzk5sx7xkOtY0EHxd/YehAbbHcXChbLrC++Nnb7QX7KU+ImU8tdDVUB29K+ww4FRJOFk4x2X569mSDdoIoKln3N+9OVFavyrwF8rNkXUG3rqGR/jbUMRGJfbrL1CKzToiVLUP1Dl2fuSc0c+0+xlQuO3y8K3/Oq3z6S60wLRjyHbn5y8Lv9W22wxZeEGWGK02cECt0hHUseIeRw+ijIrToEujNyaLAI0pIAAeJvf9DL/lPBDR7BfsDluIz93dxID4nPYwV1N6xqCoqKppTwviUYddqYDm1UOEXLKcWdL8hKClJrb4zsqloeE++WzD86ITuHao+jP7uNsYIKU/B66nojIGjWcEgp6L3TbuS+V2LyY7sJHJM9JEloYaRBuwf8DfEAOBH5kX4KP1F6COgBFILAPzIvAh/SutF6COgBFILAAAAUGMgtQAAAAA1BlILAAAAUGMgtQAAAAA1BlILAAAAUGMgtQAAAAA1BlILAAAAUGMgtQAAAAA1BlILAAAAUGMgtQAAAAA1BlILAAAAUGMgtQAAAAA1BlILAAAAUGP2LLWsBoVeR5He/uFRp+fWkrSzv3uaDAoDjkp6rwb/dEvoPe+NbuxIPf2KWE6GpyJrO1J4ByiaM9ZtX1H8zVrTNtnvLiSDwus/80bZ4bXP3iSE6BrhgLkYAGrOnqWWhM+BNHB893tiegfZ5WnY6xQEQRBGB7t4ZOkavCwIgiAIvw1Hf6O4v68aDMf26s3h+vrCZfX7gLK5AzbvlG/aMG+T/e4C4ybKsj77681Co5BagBeXPU4theGeTUVuCCfrEbK0CnczhnWZMC8wllML96OpyttWDS4ZVBTVSkj4HIgvT0YsUXIqqn8zH1MHdYua5jRNUC4WrFBYXzGKGjkpPqt7oWRRUim1qJQ0W92UtiQnxee0woy7QLAUn5mJS7giteTvNtUxr851jVXcGWlCbZVKrGik2wdL8Rm4XRF4Ntmf1EIIwZnQpUaE0KGxUHbHQ4WaWg7ZutoLt2q3j91OVt58bm0Z+GROsxenurf8qKPfrpIgiwJfWGrxwlSMJkoWBd5qd7xyuFBuaPJJvluZ6dHGug7X7BZLh8oWE9OK5kS5fJW66ibzwnXoVIUVKBTjmoR7WZoaqivH+RNjgYey9h7A8mRd+D0eKil56Ny4u6J6FebVaItaTpw8yinUM9MFgtfmPGfzN61zLceO5++EJ0T5O0KIa3nj0+iXKvNSrVrp0AH/St6h2/PuTr7DNbtVrdoMP7Zf+CIR+9TAPspe1L/sONEAV8EDzxb7llpKW2S7ucSUmlosLcPXF6UcTk+Ptda1uWZzBG9F3d2W4xduPpQJlpNTgr1eu1pSzX0FCfKyf6jB2uaazZHSc26MJUoWBR5ZWoa998L/fuPdn1gtg/4VuZBBuTPeWJapA7VF5WN1UbetqLubs52fjMsEy4kvLrQ3dDjvZ1gKF1Eo9pX4QKKpMf3Af5ar+3lgLUfwqijYUZMgZrFBaimvWpaStOoV3tc1r0rbuo6xWysyxpI4bq9vFe6mjbtw9+ncRKfFPnY7IZNscvqqncvHBc6I77YiuyCuYkKw9JXQXnfYGVaYF9OtqrLbnVv/+28buTPe2CYheCsy0cGd9iyqVhsm1F4vGQEv+/osrYPXvpVwTpr98JSlccD5v07r2QdvKnt39/1TFgSpBXi2eA5SS9toKP96tjQbZiKubtQ64rsriqIoiiH/aJd2taSa+0pvaxT7KoXJaJ4lShYFHnW7IhlCCEnfHmloGvA/wuRpaNTG9XhjmK0DtUVKalmJuLpRpzu6ndc4u+R5FR12huMMhYuoFKOb4u9//4eLDdyR3iuez6e+Le23mE4tD9LBX1RWV2FoXpW2r3qW8hP3Vtzbhw47xTuGXfg7p2BH3Z6lfOP4gffUoeKqRYrPP5QwllMLYvDX521W63AgXTZvhm7VnNpumbtCa/1LnoVtIoWdXVyPN6bupQm1S0ZYS/rPcqXww4+jd+7NTP/qtJ59MhFXd7l35IfJwSZILcCzxf6lFrzk6UYIWd6cfLLj+7GZ71oIIYqRKYmCreIMwVl/UtGu2dQSYYlST8RronCM6/HG1gLD1sYB/yOso4PZ1PK9KNiQw5coaCwnfP3I8ubk7DUTk3VJMYYaK48j1y6ebLYihBDXNuCZkbD51BIneK2yeoX3TacW61uB9Ha5j3UXA7cuG3XhRP9rLQrjrIVG2wqS5YcB4XQzhxDieNsxG88hhy9RNq9Et+oTjUPXI66XUcdEZP1r55GmPp8ms5hRu2SEH8LOY4o8YcY+GiUlUbBBagGeLfYttWSi7lc4hCx9vuWdv5U0mVo0T6Z448H9Kc3r0KpWLTRR6pkIb4bHj3CO9z4YLO6MsXXYzaqFF0RTq5aSYlQ15pcWw1PinzcIllORgHuoBXW7IhlVRcU6oHLVIsVnKqurHFXdqqXPG98q97HNFb5j2IVvAv9gL/9Y1ja76DnNWc9MfL0iF1tUpxbaqoUXRFljN7K96HmJO37Jeb6p4FAVJtQuGeFpwtevWDRLUf/EuOt/vmx+1YJjvt56SC3As8Uepxauueu0w+FwnO7KP0e+5AyndyHUZGrBm3MTnZxt+HpUwgRL4YlT9dqUZjj3rQdH6urs7v9YZ4jSzERke97daUUIWYcDaUKIjg7UFgvNzcsK3fISaO9azKcWqhr/dOvj01zDOf9ylpCcJF5tR92uSAbHvD1c04DvgWZ/vyywoOTX33oo1Su8bz61HLILU0kZyyu3xjoaOpz308Zd+PTBfOmVSU4Kv19817Iedh5Dje8E0zlS7AVy+BJl82K6VbV2IwTHfH0NCCFr6YBGdWqXjZB/1zLkj8kEy8v+oYb6nl++/aqefQovhIavRyWcXvRfbM/3DifDN67fCCfhxBhw8Nm371o4vuutT8QfdvfkZTK1EPWZHI63Xw4k1Ic+Dec+HPe/3owQOjT6r0s0UdqZiGzGvGc41DYSfFz8haEDtcVycyHFyaL1xc/ebi8cdlKeEDOfWuhqqE6IlXa0cCoknCwcVbL99OzJBm1qKSpZ9zfvTlRWr8q8Km0PH+/KH4Yq9NFMFwjJJm7+smCc+jZb4YRYPlvUFUNuaKS/DXVMRDZjZfNSrUqxm7ziljHqJAAAAVtJREFUH7Sg5uFAqjIQTalt9oSYfgBzvL3PcdTKC6IsiwIP7/OBZ4Pn+g+9YCk+c7+KrxS05KSHscI22o5FVVFR0ZwS1hcYu1UDy6kFUfvZBJZTC7pfq5SUpFavmuJ0vJ6Kzhj0kWpJORW9X6lDNhUNV3RCbV5jq+aeTJ6zNl4KZSgdrEJtlf4mv7LalsL/4r4eThU2xL7zdPOak3UAcMB5rlMLcOCpWCscBHAmeus33vFBW2O3O7JFK7HHauPN8PgRdKTfdSMkTk/+6g2b5ZRrrvo/OQEAPx6QWoAfE8UfKDtA5KIfv8w32i/4Fzfoa7I9VxunFyfHB+3NHNfc9do7u95JBoD9BlILAAAAUGMgtQAAAAA1BlILAAAAUGMgtQAAAAA1BlILAAAAUGMgtQAAAAA1BlILAAAAUGMgtQAAAAA1BlILAAAAUGMgtQAAAAA1BlILAAAAUGP+P4cpQ16ZwwdcAAAAAElFTkSuQmCCAA==" width="400" /> </span><span style="clear: left; float: left; font-size: large; margin-bottom: 1em; margin-right: 1em;">In microeconomics, economics efficiency is attained when MC = AC (producing at the lowest cost possible) and MC = AR (marginal cost pricing, since AR = P). Answer is A</span><span style="clear: left; float: left; font-size: large; margin-bottom: 1em; margin-right: 1em;"><img alt="" height="146" 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PkuOG1hhj1xjNMc24YQamO5NMZR91lm0Km39UHdqSMS99iRoXPi1hqfwcnFma6mHseTDCkY7v7yfL/BOnMvLpD01oP3zxhQznBppfSJXrVrVMBwj4ec4SbDDhvqd0bEKWt63fUaap8NZQ6T/stG42V/MhVxDhpPDfQzg84Iv+kdN/Q4wnobvrpTRyTusaOe6eAuIYSQmMduMrGcQPKGuxl22JDNtS6uJXzjG2/LGS6tlD7Rq3aNChju8ZAz3O841oLsnnju47hnFBku+bYzJOmfMHZN3Q26bF3jn9529rcNe+5/Nt7RPft4/1gjPwK6U0ek6PFXueF+Xawdz7GWnOHSSukTvWrXqIDhHg+VZrjiAP3GN97RfenSOcNrrvXvwg6b8VX7q8aB2ZD+Hn/rTh2RKoZbPMPFUc+wGQwXqAwY7vGQX8PdX57vp6zhEkKETe+4ASHU74wc4r3A1SaEUPdcaB9Xq7vh0J06IlUMl8+uv0/civA4uea92ssgMFygMmC4x4Nkl8Le2idv92afdOd3KRBCCMFR91mGaWMfpgkh275xA9M6vZg61rCPhu7UEalmuJIdJozJOmI/YQTDBSoDhtsYwD5c/XHIh37nvBVKiEsKX7lsJl1vSKDyPdXu2ADDBTTne6oO3g/NdaPuUcenQW7R96s3LYYzjmX9rbBX5nuq3bEBhgtozvdWHZxc882NWzsYpmPg9WsfcN/od+lAju+tdscEGC6gOaCOfgHt1AUMF9AcUEe/gHbqAoYLaA6oo19AO3UBwwU0B9TRL6CdumhuuAAA6BpNLeKHBsxwAc0BdfQLaKcuYLiA5oA6+gW0UxcwXEBzQB39AtqpCxguoDmgjn4B7dQFDBfQHFBHv4B26gKGC2gOqKNfQDt1AcMFNAfU0S+gnbqA4QKaA+roF9BOXcBwAc0BdfQLaKcuYLiA5oA6+gW0UxcwXEBzQB39AtqpS0MZ7kHcd33Ybref/9+hVG1HJdbpttgJsMOT7sgLQrCwFVoI78pdmIm43xi+GdhR67yVKs2pWqqsbKHXR0Svg/alO64ANfOsBXrVrlFpJMM9XHH2GxFCCPVMBb7VsKEjkx8SO7cnzGa7JyZ3oeSMSFXardKcmqXKy4LhatiEmnnWAr1q16g0juFmT4gSMYx5N2uZ49bQEOZjS6HS4xoxH1viuEiizCAzfGx5KcaXxhL32JGpyMuKa1BquArPjixvTi6wKqWKm86XL+9+hbK1n3d5rIM2w8eecOWZklW8AlhIrD4qLoL52BK3mhDkdZDmubxdVfOsBWC46tI4hvtdcNqCkLHvnXfeMCLEnHNH99VuKH+oNUKoqffK53EBE7y77LrQKZ5SjpjONz9eSxHRMTtPD55gEELI2Dn2wTKfEc/HDvpZk3i9ieUEWg2lhitwrAkVH5ddFEz2dPTiUrkTtgVO2twLWmCUgtPstDRISRYEjjUZrfZX2xFi2m74uPLuF7coUE4FRyUnuquhjvpgfsk11iN2znR6xr8hEEJR/C+r3rFW40XfdtYWU4vTrU19jicH+Y7HPXZ0wj5qzWaF6Z25tyUU1WN+xX66pVKe2Yfp8nYjd9XNsxaA4apLwxhu8t5UC4OYIdfas8BUD0LGPseTA1Ubws89I4au8Y/+zOMM/+SXZwytY96NFPdeF7Ky3A4mBPNfsL1N7bOhjOiQTX0zdzYFjHluzmruYh+kikZgdmKCqTWkSwwXb4U+vfVpaCs30cEHEaeNsUz6YgLBQvzzK70tfbOPklTDJUXzIGpg9IIysyeBY03I0Dnhfhi6f/eDy9TuF828cr2mxpxSSR0NyGx5LzBNP/bvZgje4VgramO59CFNL27T95bRMO7dFAjBqeD11uz3fZHchs6JW2t8Rnjuvdhi7HE8+fvyfL/BOnMvLpD01oP3zxhoX2xinr/gnvL0O03VPGsBGK66NIjhZrZ9bxkRYs66ozhrYQh1vccpfnSmoKHMlvcC0zwTTGNCCMHfRu4/XIrxGPOxlQ0eYyGxygU+nLQYjRP+pDhaXnOtZ3/QHcTcI6h9NhQrN1xCaDVsV1lSSIUdNtTvjBxm/5led72G2me5+woNtzQwesFKhmtzhFNywScJ1XA3qTGHFMy9jmnQHiYD77Qw3cM3XJ8t/Lnwq5/a5eS9qZa2Me8zTL4LTluYs+4oJsWGm517klx674YcNmRzrYu1fuMbb6MZbi7Pcu2qmmctAMNVl8YwXBz1jLSgUmp4dKagob3Q7EnJCMkhbPjZoQ4GIcSYLCctJgbZPXHx9+BlfzJ71wtxzyhquhpY/ZhiuLQaYlUMl+dYS7ahQv2GS94/XFdkuGWB+e+8W6Ph5i6W6T7NcL+mxuzbru4ExzZo8W74o6uDHUaEEGJ6xlxLPJbr8i7HnmTOuqO7/glj65j3GSaVDdcfLMoGz7EWmuFKl5Vo7aqaZy0Aw1WXhjBcHHWfZcr8tpZHZwoaEuKeUZSf4RI+4p2f84VXXEOM8dz8l5sCIdmxVDBcNOKOZVc10uuu11CPI7xRPsNNr9FqqGa4tBmuiQ0GJaXwU/eZZpkZbmlgofu0gtUNlx68jOHSZl4lHiPDcS0p8LGlBe6vLwgWEmG/82InsjnCOzJdxvuhuW7G/rOfj+fWFmqZ4eKoZ9hc0XBlUq1qnrUADFddGsFw98KOV0rsVbRgxY/OlK/hXvRGBYKF596LLeaz7qXHsydR67VAMkNyK3ESw222sgtbAhY278z0tfTNPiqs4e4FppqarM4VITtxLquh1HDL1nD3l+f7y9bp9qLus0zbmOdp6bJgoTl6YPSCklJSJEZADz5e3GLebqgxN/AabnrNNcS0vOV9niYkw3M3e5HNEd6S7XJuV6K4qEIqG+7Dv0ecNsYycSvC4+Sa92ovQ13Dzd8DMqlWNc9aAIarLg1guPuPZ7sNCHVM+BOFD/Ez71ir8kdnym4Lyi4FIf75ld6m7HNj08DFqdEe1DcfPsACx5pQ+6mB7FPl3JPi/MDDMe/5DoRQ8/QiT6shtHij2i6FvbVP3u4V5/W5+nEiyA6Kj8ItP7owmHvwXWguuEcNjFpQUkq6t0hiBLLdl7aYLtgNLWbV1FGfol0K4pKCfJfJftR9jpEuZFUyXE4o3E6MyTpiP2GsaLgy7e5HVcyzFoDhqksDGG6dG6Lsw00nIqGSnZq50bKXiCzJ7IXM8BvR3KMYSg2KoOy1xEJilbJvNNecfGDUgtIg5ZALXqaszvbhYiGxypVulT2qXgUO+dDvnLdCCXFJ4SuXzdTjeFLNF6ntqpZnLQDDVZcfnuEqQ+U/FVOPhg2sAt/HQZv9O53uUcenQW7R96s3LYYzjmX+uKNSn++jdscJGC4dtV+GoBoNG1gFvp+DFifXfHPj1g6G6Rh4/doH3Dd6+g5UzPdTu+MDDBfQHFBHv4B26gKGC2gOqKNfQDt1AcMFNAfU0S+gnbqA4QKaA+roF9BOXcBwAc0BdfQLaKcuYLiA5oA6+gW0UxcwXEBzQB39AtqpCxguoDmgjn4B7dQFDBfQHFBHv4B26gKGC2gOqKNfQDt1AcMFNAfU0S+gnbqA4QKaA+roF9BOXRrDcHcC7LBdwtjEzC9+H9lV/va8hrktsLAVWgjvql6vgnfWbAXY82+4I3JXyNSgVcBSjkednQA7POmOvKjaR7XfB3S0lL6MEJKyhV6rQ8OMrO8JjWG4cY8dlcHU8L67Rrktdm5PmM3lp9q8PAreyig5A015DZoFLOWYDbdaH1V+4+XRUvoyQkjLguE2No1kuDm3wHzk1oRF8oF6DR0ZymvLaZQcIyZXSkhECq+hxkJi9VEkUdpTzMeWOC73eQVTwHxsaSnG42LDLWs6V0Oajy0XGpc590xdjq4ONYHFmZGQKepanvI+Ks5tEQrfCF7anExUVYMsaTpfRXn35cqq8QpzMFx1aUTDzZ1yZux3rhyq29BRkB7MY+wc+2CZzxC8+2R+yGAe90RfEJJac583G4bmH//xhkmcnZvYhWh5KfHMXav91XaEmDb7kBWdsI9axaNxemfubWW/cHaXXRc6c6dqMp1vfryWopuC5Eqm8+SpdkPx0S9lTaMTQ/bs0S3GzrEPlnfus4WANTyl8EjqUM5DomaGiF3rPD14gpF2OXtiTdBf1EcluaWch1QUTPbMm+JSuW87gcs3hxBC5VGV+nvMYzeZptlpGSGKbpgbPq68+5IWcyeHWlju2/KAj6IcGK7aNJLhFi8omId/vaz4LtHstsAHEafNcOrK7Q2BYGFrgbWau9gHKULIwap7pMM89vFfVlxnDe0j7tUDkp9rROVKCRxrQobOCffD0BfcgtOODJ0Tt9b4jPDce7HF2ON4kiE4xb3Xhawst4MJwfwXbG9T+2woTTFcvL8832+wztyLCyS9tXjTyiDxcEPZpnMnueU/b9QZbvbEz/GP/szjDP/kl2cMrWPeDWpmMrmu9c3c2RQw5rm5QtdKjlhWltuyEz8PIk5b2amOSarhksJ8kx4V1XCrHLGcvWHu3/3gMrX7ZUcsn7j2K7Y84KMdQwmGqy4Na7gIMVnXULWhmkmFHTbUNeV5wHEcx3FB7/RA7qx1LEQ9Y+Zmk8loHvNEs2dSibf+ilwpgWNNyOYIp3IXlx9NSAjmYysbPMZCYpULfDhpMRon/NsUw02Fi07qzp6OfjdUqenXXOvZH5gHMfcIap8NxRrTcDNb3gtM/kx7/G3k/sOlGI9pmUmKrkTtWonhKs+tFNqZ9u2z3H0lhlsWVeYIhpu7YWS6X2a4xo6O/1YecOhIc1wwXHVpJMMt/JpKb/qvdSGEjJf9SUWLCprdFjzHWsq+CS54tzKEEII3/ZPdCHVP+jeLl0TDcqWKBpuc4Qobfnaog0EIMSbLSYuJoZy7no8te8Q3IYTsBqd7TKw/qKRpIsQ9o8h42b/y24Y03L3Q7MnCd0keWmbEM+0Lt4oQ94yipquB1Y8phqs0t1JK8izEPaPIcMn7h+vVDbc8qj1cu+HmLpbpfpnhIoRQecC+7aM4LhiuujSm4RK87rIhhBQ/O9Z2hluYLOAXTx8tiEfAZpIPb/YxLRZLG9N382EyQ0jxDJdWSoHhptdcQ4zx3PyXm0LucxlTKI5NOsOVbTo/4crNehp0hivEPaMoP8MlfMQ7P+cLr9AyIxouGnHHDgghYtd6HOGN8hmu8txKoc1wTWwwKCklJr98hlsWVckMN1+wuuHSg6cZLm2Ge9RFejBcdWkkw2U6Boay+3BPW0wMQsjwqjuq7KmZdmu4+8vz/Yxl4laExwTzofkzZsOI5zkmeOfulc6mzit3t7fvXuk09c4s7GBC9gJTTU1W53/tyZRSYLh7odmTqPVaIJkhJL314P0zBiRjCtK1xQwfej+7hpuq1HSzlV3YErCweWemr6Vv9lFKDHhF0wMQj7yGe9EbFQgWnnsvtpjPupce0zKTM9yyruXTW+ijstyWreFm74GSJdG9qPss0zbmeSrkqhI9LdfcC2pUhGBqQRkhJDcMPfi4pMWc3Z945+cz5QHDGm4j0EiGW4Sxc3juXlzpjhYtbwvpE2rGZH3XH08TIeabtOQmttmprmXSFxNwzHu+AyHUPP2n9fJSRInhZkdIk1hw4OLUaA/qmw8t3qDNwtLx2z/JbjtA5h4LZZdCSdPtpwayT7lzT64LAQdfavdQRY6kDmWXAjUz4QNM71o+vYU+LvJKckvZpbC39snbYp4LqUsE2UFxh4nlRxcGW3JL8GJzCCFUHhUh9IIyQkhuGNnuF4ko9vprSsD10w6QpTEMt/Ebwnxs6VH13ZSEEJLhN6KJ7DO0GkqVkE5EQkoLConIo1WxxeoBl9csCVgbjq4OZR8uJTM5V9pLRJZktp1K+1hLbqVQtrViIbHKUerK8BvRr0Ufp0ZFLahECLngaWVhH27jAYYLaI7W6qj8p2Iq0ZhR1QqMLHUBwwU0R2t11H4Zgjo0ZlS1AiNLXcBwAc0BdfQLaKcuYLiA5oA6+gW0UxcwXEJqqXgAABAiSURBVEBzQB39AtqpCxguoDmgjn4B7dQFDBfQHFBHv4B26gKGC2gOqKNfQDt1AcMFNAfU0S+gnbqA4QKaA+roF9BOXcBwAc0BdfQLaKcuYLiA5oA6+gW0UxcwXEBzQB39AtqpCxguoDmgjn4B7dQFDBfQHFBHv4B26tI4houFeNA1PX7GYkamXvvkz34f2VX+xtLGuS0UvCMKC1uhhfAu2Qmww5PuyIv6BaeUXISEqBJk46hTjKSbqqLgHtgKsOffcEfkrpCpQauAK9Co2umVBjHcDL/862Ezg6QwAzOLCYWe2zi3RfW3oO7cnjCb7Z5Y4xpuPkJScizFEWkcdYqQdlNVFLwJV3LopPIaNAu4Ag2qnW5pDMM9CDttzQiZz8wFtwRMhPi9GSuDEOqeC+0rstyj3hYZPrZMeX8+/VX5MheXFC09IIuPLXFcJFEYOjLHBcq/nx8LidVH0hpK/puPLXFlJz5kK8yHW9PL/0sPJbSwHF85hsrUe9BSzomgUSKEXClpGuW0KFa5guFiPra0FONxseGWNZ2rIV10y8ndOVoChqsuDWG4mdBsO0Ko9Xowlbuvd7689eGngZDSg1BqvS0EjjWhztODJxiEEDJ2jn2wLB76VHSUVvYwKLmLqeddv8h/iHeXXRc6c7N2pvPNj9dS2TJZTHb7oDh5pDRKiHggoH3UKp5/1Ttzb6t4DEubML9iPy0eqyVwrMlotb/ajhDTxgbWSyr/9j7b1mxzfYVJ9vxBZJzwJwkh+CuXzdzv+MVP8xGKp8k2WwZ6ZWPQQJ2XQJrJnFJ498n8kME87om+ICS15j5vNgzNP/7jjUI3F6LlpUrSaB+yUrWgqUw3XMmVTOfJU5QD6EpurRND9t7CLbdzn5XqUq+EguGqSyMYrhD3jCKUO4JUw4YkTXKsCTX1zdzZFDDmuTmruYt9kCo6B7dw3GmSfnFlwz1Ice91ISvL7WBCMP8F29vUPhvKEMk8JTd5pDaaEq80dE7cWuMzwnPvxRZjj+OJZFUP7y/P9xusM/fiJQfHChxrQobOCffD0P1F73tllX/+n9MWZtgTxzjNsW0IoTaWS2McdZ9lBp2RF2UzXDEGnFyc6WoqjkETdY4KPog4bYZTV25vCAQLWwtsTilysOoe6TCPffyXFddZQ/uIe/WA5IWIypWSpPELbsFJ0wJTVU7TjlguEmvxZvaI5b9Xajp3dGb+c5jh6p8fsuG+5lrP/og7iLlHUPtsKJMKO2yo3xkRz2ZPr7teQ+2z3H3qxVVnuHxsZYPHWEiscoEPJy1GcSJZarib1EZDGbljffOkwg4bsrnWxR8B3/jG2ySGa3OEU+I1pZX/650/XjYaL/uTqYhz0HhqoJ8ZdEb4Te+4occRzpQvKfRMB3dlYlBEvQZtKuywoa4pzwOO4ziOC3qnB1DzTDCNCcFC1DNmbjaZjOYxTzS7/CJ2c0WulCSN8lrQVN6mGG6xWPip+0yzib0bqtR02S0XA8PVPY1guIdJ/2UjQhJfIORg3f/hrT+Flf58PYrhGi/7k9n2hLhnFDVdDez9jWMtEt8X4p5RZLjk/cN12sW4iuEKG352qINBCDEmy0mLiRFrLjXcr6mN+rYz1QyXLy7Ic6xFYrjZwHh65eufTxi7pu4GXbau8U9vO/vbhj33Pxvv6J59vE/oa7gyMSiiXoOW51gLKoG54N3KHk6+6Z/sRqh70r9ZvCQaliul4Ex7QlU5RjHcEiF2g9M9JtYfVNJ0VjXjZf/Kb8Fw9U4jGC7Bm94xA0Kofya4jQkhJJMMvtuFEGp5J5A8rFa6hobyCBxrQiPu2AEhRJz39TjC1BmuiQ0GqRcXz3DFOUvecPfWXEOM8dz8l5sCIdkhKmO4tBludjTXNMPFUc+wucxw6T3ihG984x3dly6dM7zmWv8u7LAZX7W/ahyYDfGE6NdwSzqLXzx9tCA+TswkH97sY1osljam7+bDZH6JPDfDpZVSYLhpqso0wy2OTTrDlW06P8PN/eiBGa7+aQjDJYSPuEbNCCGm2/72T2+8be9kEELms67IgcoNiQgca0LNVnZhS8DC5p2ZvuyyKd5fnu+nr+GWX0xw1H2WaRvzPJUuoeYMdzc0exK1XgskMyT3v6Lh7gWmmpqszhUhN4apjebWcCuYnbjiPHErwuPkmvdqL4PKDJfeoxQRNr3jBvFXBd4LXG1Ckj0h+Qirx6CJOkdF7OzErQiPCeZD82fMhhHPc0zwzt0rnU2dV+5ub9+90mnqnVnYwflu/teeTCkFhrtHVZlmuNLHAxk+9H52DTdVqemyW06qS70Aw1WXBjFcQvBu+KMfD5jyj3t7Rh3/N16+1enlGyKEiJbUfmog+9BYsjGA7K198navGIV0lwLtYpwIsoPiY2vLjy4MtkiXFIT451d6m7L/aRq4ODXag/rmwweY4Jj3fAdCqHlw8B/EMUxplBAlZpd/xs2YrCP2E8Yyw6X3iIjfFkwb+zBNCNn2jRuY1unFlKhFLsLpYFpPhkuKdykwJuu7/niaCDHfpCU3sc1OdS2TvphQ6Oaf1stLESWGi6kqhxZv0LaFpeO3fyIKYe6xUHYplDRddstJdalXQsFw1aVhDDdLdj8jdVepqg3lxtJeIrJE33op2bVa8WIsJFY52d256UQkRPvPDL8RLe1jTVtlCSHkkA/9znkrJP5xCP7KZTPJbiGouXJahEel3oMW87GlR1V3TBNCirpZQ6kS5FSmISQij8pub9mmy2tWUxclgOGqS4MZbr0aUvC3QEe8uI7g/dBcN+oedXwa5BZ9v3rTYjjjWH6pPwnTCBi0+gW0U5cfqOEq+Gv3I15cV3ByzTc3bu1gmI6B1699wH3TaN8JWWDQ6hfQTl1+oIYL1BNQR7+AduoChgtoDqijX0A7dQHDBTQH1NEvoJ26gOECmgPq6BfQTl3AcAHNAXX0C2inLmC4gOaAOvoFtFMXMFxAc0Ad/QLaqQsYLqA5oI5+Ae3UBQwX0BxQR7+AduoChgtoDqijX0A7dQHDBTQH1NEvoJ26gOECmgPq6BfQTl0aw3B3AuywPcfw6MT0rOvOOl/Dy2J0c1vsBNjhSXfkhZZtYGErtBDerVdz1WlYdRS8liiXzMbIJA1t5W5Y7XRKYxhu3GNHJTAm28+4pFLP1c1tUYdxu3N7wmwWD2JpDJtoWHWqv3gzn8zGyCQFqdxFb0lXh4bVTqc0kuGKZwmkE+FP2UEzQgbxjGsVG1KHDB97QnnpePbt6ZFELe9IxEJi9VFxEczHliq/gl1IRKStl7Rb4TDtml9Drg4qqZPhY8uUt3TTOyVzcUnREsMtV1AumbKZpAha9N9UcUsErUkm2gF0lWOoCTBcdWlAwyWE4FTweitCuTOu1WvopcH8kmusRzywxnR6xr8hEELw7rLrQmf+eKDONz/+y6p3rNV40Zc9FJOkFqdbm/ocTw7yc5C4x45O2Eet4gk9vTP3toSiesyv2E+3lJxnI3CsyWi1v9qOENPGPkyXtxu5y5rEf5pYTihMeaRHuUiPFKoHL6mOwLEm1Hl68ASDEELGzrEPlsXgKZ2Su7jamfZlmVxLZcuIybTbBytnkiqoFJq4L0oELa/82/tsW7PN9RUm2UPYkHHCnyTZAz7M/Y5f/LRU7mbLQK9sDLUDhqsujWm4+UUGpecs1Ou2yGx5LzBNP/bvZgje4VgramO59GGKe68LWVluBxOC+S/Y3qb2WW7T95bRMO7dFMTvD+acO7pPigzX0Dlxa43PCM+9F1uMPY4nf1+e7zdYZ+7FpadSlhouMnROuB+GvuCe8rR2QxnalEdygmHxOZV1QQ3DbeqbubMpYMxzc1ZzF/sgVXQsY8mJn+UXVzbcA3omSfkRy/KZpAkq+U7D+zRxXxQLSqv88/+ctjDDnjjGaY5tQwi1sVwa46j7LDPojLwom+GKMeDk4kxXk+yRS4oBw1UXMNyaOEwG3mlhuodvuD5b+HPhhyHmYysbPMZCYpULfDhpMRon/MnkvamWtjHvM0y+C05bmLPuKCbFhltyKOHdkPTYc/KNb7yNZrg2RzhVqV2K4dJOYhcdpR6oYbj5M8MPYu4R1D4bop5p3z7L3adeXHWGS8skUXamfTaTNZ1pnxP3RZGg1B79650/XjYaL/uTqYhz0HhqoJ8ZdEb4Te+4occRzpQvKfRMB3dlYjgKYLjq0qCGi9ddNoSQ4ZJvW5Er1O+2wLvhj64OdhgRQojpGXMt8ZgQYcPPDnUwCCHGZDlpMTHI7omTXY49yZx1R3f9E8bWMe8zTCobrj/IWsSj1AkhhOdYC81wJV9C1HYphvs1V1SzEPeMKs/ty6OC4Rov+5NZHxLinlHUdDWw9zdqp7x/uE67GFcxXLqC5YYrn8kqhstzNHFfFEXF0ytf/3zC2DV1N+iydY1/etvZ3zbsuf/ZeEf37ON9Ql/DlYnhKIDhqktjGm4q4nyVQcgw4nmu7HzSui0p8LGlBe6vLwgWEmG/82InsjnCO2uuIcZ4bv7LTYGQ7I2O7J549pBHxv6zn4/n1hZqmeHiqGfYXNFw0/R2Fc5wX34sKkaNGe6IO3ZACBGD73GEqTNcExsMUi8uTh1+6j7TLPG7PRkFlc1ws5msaYabE7fYcOk94oRvfOMd3ZcunTO85lr/LuywGV+1v2ocmA3xhIDh6oxGMlymY2DIbrfbhwayU41/nA0lVW7oZUmvuYaYlre8z9OEZHjuZi+yOcJbodmTqPVaIJkhueU5cbgerjj7jQjlHnSQyob78O8Rp42xTNyK8Di55r3ay1DXcPPjc4/e7l5gqqnJ6lwRJM3tL8/363sNt9nKLmwJWNi8M9OXDR5TO5WkX0xw1H2WaRvzPC1bQh31xHdlFcwns2omq5iduOJcIm6x4dJ7lCLCpnfcgBDqd0YO8V7gahNCqHsutI+JNMLqMRwFMFx1aSTDLcCYBi7XdAbt8exSEJcUsmOjKRf5xanRHtQ3Hz7AhOxH3ecY1DMV+FYsX8lwOaHwkJoxWUfsJ4wVDVem3f2o93wHQqh5OpgutLK39snbvWLcetyl0H5qIPuEXxo8pVOyF+NEkB0UH99bfnRhsEXqd7IK4piYzMHBf6icyepmRxH3RckakUzlOOo+y2S3MRCy7Rs3MK3Ti+L3ZT7CIrnlYqgZMFx1aQzD1U9DhJDsXkuudDdlOhEJVd34WZFDPvQ7561QQvzV+ZXLZlLwlJnabobfiFJ28upzH27ua2YvEVmiBF/cqYoXYyGxStlALSKnIC2ZNWeyFnFrrlxGbjUAw1UXMNzGAe+H5rpR96jj0yC36PvVmxbDGceymn81dFyoZLiK5mo1XVxH9Cru92JkNRBguI0ETq755satHQzTMfD6tZoWVRqZl1RHwRsPjnhxXdGnuN+TkdUwgOECmgPq6BfQTl3AcAHNAXX0C2inLpobLgAAukZTi/ihATNcQHNAHf0C2qkLZBMAAKBOgOECAADUCTBcAACAOgGGCwAAUCfAcAEAAOrE/wdYLTm3s3/7WAAAAABJRU5ErkJgggA=" width="400" /></span><span style="clear: left; float: left; font-size: large; margin-bottom: 1em; margin-right: 1em;">A is incorrect. In poor countries, people spend most of their income onto food and other basic necessities. They barely save. So savings ratio is low. B is incorrect too. External debt is usually very high, which explains why many of them are placed under the HIPC (Highly Indebted Poor Countries) initiative. C is obviously wrong. Population growth is high. Answer is D</span><span style="clear: left; float: left; font-size: large; margin-bottom: 1em; margin-right: 1em;"><img alt="" height="140" 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" width="400" /> </span><span style="clear: left; float: left; font-size: large; margin-bottom: 1em; margin-right: 1em;">The answer is B. For equilibrium to exist, injections must be equal to leakages. The initial equation is {C + I + G + (X - M)} = Y. If you equate it to {C + S + T}, you would get {C + I + G + (X - M)} = {C + S + T}. By cancelling out the C on both sides and bringing M from left to the right, you would get injections = withdrawal</span></span><span style="clear: left; float: left; font-family: Arial, Helvetica, sans-serif; margin-bottom: 1em; margin-right: 1em;"><br /></span><span style="font-size: large;"></span></div>
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Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com0tag:blogger.com,1999:blog-4710215856934992447.post-68977592925946794242018-05-31T19:01:00.001-07:002018-06-01T22:26:35.559-07:00MCQ Review of 9708/31 of Winter 2015 <div style="text-align: justify;">
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" /><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">With every dollar, this particular individual is able to purchase 3 units of marginal utility. Therefore, with $4, this individual will be able to purchase 12 units of marginal utility. The consumption of third to fourth unit gives the marginal utility of 12 units. So, the maximum quantity would be 4 units which is C</span></span><br />
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" />Law of diminishing return is applicable to production in the short run. It explains what will eventually happen to total output when more and more workers are being added to a fixed capital. Initially, there will be 1 capital: 1 worker, then 1 capital: 2 workers, then 1 capital: 3 workers and so forth. As you noticed, the ratio falls from 1 to 0.5 then to 0.33 and so forth. The answer is therefore B</span></span></div>
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" /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Demand for labour can also be mathematically written as DL = MRPL = MPL x P. In this case, the demand for labour declines. Therefore, either MPL or P or both must have fallen. Answer is D </span></span></div>
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" /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">It is a close call between limit pricing and predatory pricing. Limit pricing is a pricing strategy to deter new entrants. Predatory pricing is a pricing strategy to eliminate big/ small firms from the industry. However, because of the phrase 'to drive out', the answer is therefore B. </span></span><br />
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" />The diagram shows that, in an ideal situation, social efficiency (MSB = MSC) has been attained in a free market. Government intervention in this case with an indirect tax will only contribute towards misallocation of resources. Welfare loss is given by the area of (v+w) since there would be underproduction and underconsumption. Bear in mind that market failure/ government failure takes place when the quantity is not settling at the socially desirable level</span></span></div>
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" /> </span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">GDP is reduced since wages earned are lower than it should. Effects on national welfare is uncertain. Those who undertake community service may feel worse-off but those who get the benefit of the service may feel better-off. We do not know which one outweighs which. Answer is B</span></span></div>
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" /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">I felt that this question is simpler to be approached with a numerical example. Recall that GDP = MV = PT. Say, M = $10,000 and V = 2, PT must be $20,000. So, if M = $30,000 and given that V must be constant which is still 2, PT = $60,000 = GDP. So there is an increase in the money value of GDP/ national income. Answer is D</span></span></div>
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" /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">The diagram shows two savings functions. When S1 becomes S2, it must be noted that the gradient which is mps (marginal propensity to save) has fallen in value. Given that mps + mpc = 1, a fall in mps indicates a rise in mpc. With an increase in mpc, the value of multiplier will also increase. The logic is, as more income is being spent back into the economy rather than leaked away, the income generation process can be extended/ prolonged therefore raising the overall level of national income. Answer is D</span></span></div>
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" />Reduction in bank lending means that there will be a fall in the supply of money. More people deciding to hold more money for precautionary purposes indicates that the demand for money will increase. Answer is A</span></span></div>
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" /> </span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Inheritance tax, property tax and income tax are all progressive taxes. Sales tax such as GST/ VAT hurts poor people the most as a larger percentage of their income is paid out as tax. Answer is C </span></span><br />
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" />In most cases, developing economies (imagine Sub Saharan African countries) do not export their agricultural goods/ crops to neighbouring countries given that all/ most of them are largely in primary sector too. Therefore, the most sensible strategy is to exports crops to developed nations given that they are net food importers. However, in practice, there are some obstacles too. For instance, in Europe they have CAP (Common Agricultural Policy) which heavily protects their own local farmers using subsidies. Therefore, to help poor developing countries in exporting themselves out of poverty, such subsidies must be abolished or reduced. Answer is D</span></span></div>
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" 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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">B is definitely incorrect as VAT is regressive in nature and it hurts low income people the most. C is not sensible as prices of goods and services will increase. Consumption will fall and less jobs would be created. D is wrong too as that would increase cost-push inflation. The answer is therefore A. VAT in the UK was increased in early 2010s as part of a strategy to overcome ballooning deficit </span></span> </div>
Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com0tag:blogger.com,1999:blog-4710215856934992447.post-10652897524861466262018-05-31T10:41:00.001-07:002018-05-31T10:42:22.588-07:00MCQ Review 9708/31 Summer 2015 <div style="margin-left: 1em; margin-right: 1em;">
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" width="400" /> </div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Consumer
equilibrium is achieved when all budgeted income is spent and marginal
utility per dollar for both bananas and apples is the same (MUb/ Pb =
MUa/ Pa). If however, MUb/ Pb > MUa/ Pa, then according to the law of
diminishing marginal utility, more bananas would have to be consumed
and the consumption of apples would have to be reduced. By contrast, if
MUb/ Pb < MUa/ Pa, then the consumer must consume less of bananas and
more of apples. </span></span></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">In
this case, if you have substituted correctly, you would get 2MUb/ 2.5 =
0.8MUb. For apples, it would be 1MUa. According to what we have
discussed, therefore the solution would be to consume less of bananas
and more of apples. So A is the answer</span></span></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<br /></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<img alt="" height="255" 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" 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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Demand
for labour is also known as MRPL. Mathematically, it can also be
written as DL = MRPL = MPL x P. In this case, P = $1, and so, MRPL = MPL
(the MPL curve automatically represents the demand curve for labour).
Also would be KL which is C. JK is too short to represent the demand
curve for labour</span></span></div>
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" /></span></span></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<br /></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Since
AVC is constant for all the quantities ($10,$10,$10,$10 etc), therefore
TVC must be an upward-sloping linear line that starts from the origin
($10,$20,$30, $40 etc) (hope you can imagine that!!). It is also stated
that TFC is incurred, which is the usual/ typical horizontal line for
all the quantities (say $2,$2,$2,$2 etc). Putting these two together,
you will get an upward sloping line which now starts from the vertical
cost axis ($12, $22, $32, $42 etc). ATC or AC would therefore be $12,
$11, $10.67, $10.50 etc. Answer is D</span></span></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><img alt="" height="232" 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" width="400" /></span></span></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">MR
= change in TR/ change in output. Initial TR = (v+z). New TR = (z+w).
Therefore, MR = {(z+w) - (v+z)} / {(x+1) - x} = (w-v) only. Answer is C</span></span></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<br /></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><img alt="" height="309" 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" width="400" /> </span></span></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">The
diagram shows a monopolistically competitive firm operating in the
long-run where normal profit is attained. The idea is, any short-run
supernormal profits will attract new entrants, and therefore, existing
customers will be competed away by new rivals. Monopolistic firms will
be left with relatively too many workers and under-utilised capital
relative to the level of output by then. Excess capacity is building up.
Since it serves fewer customers than before, it can no longer enjoy
economies of scale as it used to. Answer is D</span></span></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><img alt="" height="123" 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" width="400" /></span></span></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Real
income = nominal income (or money income) - inflation rate = 5% - 4% =
1%. However, population increases at a faster rate which is 2%. Looking
at it, income rises but it will be shared by more people, and so, real
income would ideally decrease. Answer is A</span></span></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<br /></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><img alt="" height="186" 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" width="400" /> </span></span></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Increase
in business confidence means that there will be a rise in the demand
for loanable funds. Reduction in propensity to save will reduce the
supply of loanable funds. Answer is B (not to worry cos this has been
recently taken out of syllabus)</span></span></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><img alt="" height="240" 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" width="400" /></span></span></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">JK
and FG are both SRPCs. Usually, it shifts upward and to the right as it
reflects expectation of higher inflation rate. Workers (supply-side
unemployment) who initially took up the job offers suffered from money
illusion. Soon, they will realise that they are not better-off in real
term. They will start asking for higher pay and this causes some of them
to be made redundant. This is why, in the long-run, unemployment will
not decrease and national output/ income will always remain the same (I
wish I can draw a LRPC/ NAIRU curve here). In this question, it is the
exact opposite since it shifts downward and to the left. Answer is B</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><img alt="" height="202" 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" width="400" /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">For
financial year 2012/13, there was a budget deficit of US$ 370, 300. For
financial year 2013/14, there was another fiscal deficit of US$ 40,000.
A is incorrect as budget deficit fell. B is incorrect either as both
years showed budget deficit. C is incorrect as national debt aka
accumulated annual deficit rose. This means answer is D</span></span></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><img alt="" height="125" 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" width="400" /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">This
question is related to crowding-out effect. There are two ways in which
it can happen. First, when the government sells bonds to private
sector, private firms would have less money themselves to invest upon
lending to the government. Another way is that, rise in government
spending would create competition for money which will cause interest
rates to increase (interest rate is the price of money). Eventually,
costs of borrowing will increase, and in the same way, private firms
would cut investment. Either way, a rise in G causes I to fall. AD may
or may not increase. Answer is A </span></span></div>
Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com0tag:blogger.com,1999:blog-4710215856934992447.post-64799225991999836302018-05-31T10:03:00.002-07:002018-05-31T10:06:04.133-07:00MCQ Review of 9708/31 Summer 2015<div class="separator" style="clear: both; text-align: center;">
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" /> </div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Consumer equilibrium is achieved when all budgeted income is spent and marginal utility per dollar for both bananas and apples is the same (MUb/ Pb = MUa/ Pa). If however, MUb/ Pb > MUa/ Pa, then according to the law of diminishing marginal utility, more bananas would have to be consumed and the consumption of apples would have to be reduced. By contrast, if MUb/ Pb < MUa/ Pa, then the consumer must consume less of bananas and more of apples. </span></span></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">In this case, if you have substituted correctly, you would get 2MUb/ 2.5 = 0.8MUb. For apples, it would be 1MUa. According to what we have discussed, therefore the solution would be to consume less of bananas and more of apples. So A is the answer</span></span></div>
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<img alt="" 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" 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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Demand for labour is also known as MRPL. Mathematically, it can also be written as DL = MRPL = MPL x P. In this case, P = $1, and so, MRPL = MPL (the MPL curve automatically represents the demand curve for labour). Also would be KL which is C. JK is too short to represent the demand curve for labour</span></span></div>
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surqsqYopq9e2tLy9ZV6JcWbTZdmV/8PGs1MAU6himteKSM0ejre5zczHB7rZ4pe2RTRSnD6AoEzc5vN/2qnNEUla1v6fvgJaZAx5SUV22q0Bfo63ucHCHcpMVQWaKveLRmU4W+oKT2L6Y/Bz/fP+mXWE7Vrva2ZxjGYGVnRrt2FJXu7Z9k5789trFwneGCh5v/9t3frCkqe6RmU4W+6JGX+q9xM8Pttcv1FY9uqlhexCyVOJOGvlJVxhTVtdu9nHeofevKwEKKN7VemPAJKvD2ZdNiIVlx9UbsI8EGtg97rQZGxzAFGk3x8/03HMICR5ZOruZFJRfvVhe/hODq+npfDvy3pvSRqjLheql1xZu7eGDF8l19bkKmh43rNIVP900tkLmLB1as3jdwM1DOsL08HyqVZIFFTUJm11A2sKiiem3xigMX5wgh5EZ/48pl+yzT4iYRvneE+/oGR6SqOpYmTWTXKFnJoe0St5YZqeMrfJ+e+e5TiQYW/ViOsfEHK0R8uuBfobWZiF28ZO1zZ65JHKRJrF7RiWJgILL9R68Zznv9mtcvdQqVPaLfeN+0tURJq5Pfa5I7mrKxNKlIHfZ6z44lq48Mz3NzttYVS+q7rs7zJ4JAAk0PmV76U59zUvTKrHQzKqhtvzJDuO9M63WF9T3XOcI5Tes1deGXuqzVwGg2ttmnCZkdaX9MU9NpMT1eWPvWKMsRzjPw4hqJU5Wrqya0kIJHw77b5SKs6+Seys1v2Oc5Quadps2ade0jVwOfF25u+HL4wrMjXVuXl+5s3lu5bLXh3BQ3f7WrvnD9sSssR4jfc3Jn4fI9fz1au4R/hbve9z8rRMVbmOp7unB508CUn5Ap24Gq+wxnvjI9vmRdm32eI2R2vGt74Yo9bX+sFFRgqDBSFT4btnyJDbSfD1Y1ERf4Fet0RLuKXvPHLwtL/tlUtJNyYHWh/56SWu/sqOlx2boKmbIaVi9t7L/NfdO+bqlGs9pgnfIPG+9b9tLANCfey8EzlLiqP5uSaBIyu4a6gQtT/c8X83U41ber8AGD1S1bw3Ojwn3dapvjRFUdU5OW36dzkpUc3Mvi1vKnU29KHF9hmyzbwKSO5Rgbf7BCpFNHenOEDXhJnWl0JlAbK5rf6dwq3+YTqF7R1/nUEbZ/+ZqJ9Yh+7fMzilqd7F6T3NEKNlZWClKHGzFtZJZU7GgyGAx768oKdA+1Oxb4oC4q0DBr6p499NYFFyvxiuwfL8TZVRP8T9GJXvTFA227Vqxpu7xACCHc7f7nlsofoqJTBiGzE7b32g40Ne7YWMYUaBiD1ak4dQjhrvfUF2o05a22GY4QT3/j8gJ9xaaampqampqqMkajLysrCn7WP9GzXXgpRrxWQ5lu30BYs/L0Ny5f7Ex2ddVotrxx6i+CCgxLHYnqjSTcwIGBUPnFBd5scs6Hfzl6zbd1CUsusVtdES+G/ltyvf8I23DJulpsedMDLy1b0Wr77kStrq7x92vWtH1+uW39sn2WabmmJa5q6QJH3zX0DSTTln3LyvcNeKb6ni5c0Wqbk69h8b6Waahh5D6pfI2LlRy2HEFrqdu1Q+L4ivzBQ6aBSRzLYZuhpPFLb6YzrCHJtxnWamDWtY9woQXeV1Fxl3ybT6B6Jb4eVhvh9SZTMzEf0dYpRa1Odq9J7mgFGysr+amzYG9bU1Bet7fZYDAYDM1768oLgmMKOO/fz33QebixprTgvsb+G+JXkpo6pSUHbH5CAn86xXaIzrt6flNUtL7xz6aevrN9BzbGmDr+qQv7VxdoNEU7ukZn+GNm6Y72c9aQ/vYdetmj4rbtwANLG/tvE0IC/def9zyzeOCF/g4SVmlkSxVXeJDEBgpSJ7LAwt7b6DX/l3eFJXfevBBD6ojW6xnYd5+y1CHkdn/j0odeNvyXbsd73/U9vXTT75+pLGvs9xC51BFXtXSBo+8a+gYS4rUdqFy2t7Nzq3618dI8pYYjTrLiK/u4Uyf6Gm9JVnJwOeLWUrdrh8TxFbZe+QYmnzpKG3/0fSq9OcIGHEwdzmlar7mvouIu+TafQPVKfD321OFrI4Yj2soqanWye01yRyvYWFlJTx2v7UBFwUbTaGi8wNWuzUvK9g2MWg2rA5eH3Dft60pqu764IHxllLUamMKdJz1+wo72PLU8gdQxXTy5q2j5nr7rs6FFSR2igqgPtSGv1VAWaPf81wOpIxXposJwk588W1q6+a+Ws4aHijebrszPXe2qXxLoMZi92rOzeNlzJ97+XVH5fqvXH6V4fJ9M08CUn3CTVkPlkq0nBk/UL+G/QmZGTXWFa/Ycfv7fBBXIuUKFnBJV+GjYNbDEBoYdBvOiAr80INPDFlF7xy8LS95z9YJwt0ZJHcn1zk+c3CVRV4tjB8K5+3YtZ5hAVdQWaAK/7siljriqe67KpU6Uz8tuICHc/PCR1TqGKahqs8/Qanj+apdgXx/5UqpDKZYmLb9GVrKSg8sRt5Z97/ZIHF9h65VvYPLnViWNP1gh0qcL6c0RNuBAD9vMqKmu8KH/PX2c0uYTqN7Q1xNJnZiPaCurqNXJ7jXJHa1gY2UlO3WmzxuW/3BzeHVw4z1blxU+9cE/rn70bPnSAv2atfqlRbWvf+n1sy7hK2RmuL22RKPRaDQlj9ZUFsafOl0udvyM4bEijUZTUFqxtkTiEPWeM5Qv1WiqjG2Nojbk9375em3RUn1FVUVp+Zadm0uXPtd/bYD/fJt9JmI5gsLMOE/+T3nR1q5RluOmzhlWl6w/YvPOj/W9+AhToF+7Vl/APPJi3xjLjp16dm0Bs6JMv0yvZySKx/JfKSlbWVRQvveUazbilbKdpuGb8+IKDG5Um31GonoXSWxg3+mmxbMkKyqwoHRyNS8quWi3RkmdKOuVrCtXV42mzGAV3Ibh95z87yX8Plq43LamsHBX31RkgSUuo0UFppzfY99AQghZcLQ/pFv8g0y+hoX7+pbkj+exNGn6GsWVHFyj1OFwyyk+vsIv92UbGOUvegWN/1ZwmEmU0wXt+GKtBqZkTcXyFWvX6peUbm//8hZHa/MJVS9JQg9brEd0/21OSauT32uSO5q+sbJUnpsgMIxV9hW/1/lNHKPxIi14bSdae/h8mB1pf6ygrmdC4mNzt25Gz2jWbR8UDOuU/TxN5FBdQgjHuq84Irad+hXCeccuCwdrCiowvJDid8NIbCBl7cqJvhvDbpVar7iupqyGJ43D0/EUTulKY/p8PO1WfqWifa0EpYnKrlG2QUa0FmXHF62ByVPQ+IlstdOPL8K67cJVyDeDRKo3KRI6onmUQire0XFvbK7OiMNN21pXLymvaz5kNOyoKKp80eJOYUsA9U0PvXX0jCveMxokBsdXnkjJjs7V1CGE+L0jZ7vaDhnb3/10ZAqHBEBS4fjKE8nf0TmcOgAAkHFSkTryE1DKvZu82QZVmgQzleSmGkzrtIwc6zr/lrHFYGht+5ttAn1cABCLFKSO/ASUsu8mNmuh4jJkBdmpBtM4LSPnere+qGT9vtdOmFp3lBWXv/jpJHIHABRLduoIJqAUTNgn/e7iNHNRUifRSTAll5PyGRvjnn0vsqIkpxqMmHxTajZA6ox+scyXGl7g2ZH2x4IDMbnZgRd1wRtiAACUSHbqhM2Rd2b0c+GEfeHvftsvnGZOMnUSnQTTH205KZ+x8fzFd2Offa+fP4PTphpkrQaGaTrzZdTZACkz+hHF86XKbfLseNf2wvuMw9kzEz4ApF0KetgCNzdNS85gGHx3RmJ6TU6cOolPghltOSrM2NjyyUfPxTj7nrgaJaca5CuqwXgg6myA8vMwBqqaPl+qzDR/s65Te8uLt7R9eQsdbACgXOpS57rkhH1heSCaq44Vp07ik2BGW44qMzZ+cyb22fcE1Sg9+9bitU6U2QDl52GMMnNdDNP8LVxpf2hJVavtJiIHAGKiUuosztodeNcnNVedOHWSMwlm+mZsvBnj7HviapRJHYOVjToboPw8jIrnS422yayrq04TmrIXAECxFKXOZpNzWnIGw+C7k1Jz1Un1sCU6CWa05ag0Y2OMs++Jq1FyqkG+nP9t2Bd1NkD5eRgVz5cabZP9Xuclq+DxrAAACqQgdUITUH7pkJiwL/BuZfNfD4rnqpM4/yY8CWbU5agyY2OMs+9JVKPkVIOs1cAwzZbRqLMBUmb0uy01gbHkfKnSm+y1GsqiP10NACCqFM1NsDhHntSEfcF3FU8OmPAkmNGWk54ZGxXPmqdkslHZ2QBD6FWdkmn+AAAEMCMO8DCfIwCoAakDIZjPEQBSDqkDAADqQeoAAIB6kDoAAKAepA4AAKgHqQMAAOpB6gAAgHqQOgAAoB6kDgAAqAepAwAA6kHqAACAepA6AACgHqQOAACoB6kDAADqQeoAAIB6kDpAZ7PZ0l0EAMgRSB2ga25qSncRACBHIHWAwufzMVpduksBADkCqQMUNpuN0erQyQYASYHUAQrjYSOj1R3r6Eh3QQAgFyB1gGJDdTWj1W2ork53QQAgFyB1QI7D4WC0Ov7f+Ph4uosDAFkPqQNy+O41/h862QAgcUgdiMrn85WvWhVKnfJVq9JdIgDIekgdiMrj8XSbzd1mM6PV8f/h8XjEH3M4HLgMAgCFkDpAJ3+/Dn9Dj2QgAQAIIHWAjnqXqPGwsdtsVqcwAJDVkDpAR00dh8OBX30AQAmkDtApmRFnd0ODxWJRoTAAkNWQOkCnJHUsFgvuJAUAKqQO0Cmc/XNDdTWmawMAeUgdoFOYOhaLZXdDQ6oLAwBZDakDdApTh7+r1OFwpLo8AJC9kDpAp/z5Ot1mMy53AEAGUgfolKcOLncAQB5SB+hiepZot9mMJ14DQDRIHaCLKXX4yx1MkAMAkpA6QBdT6hBCus1m42FjigoDAFkNqQN0saYOf7mDp8ABgBhSB+hiTR2CwWwAEAVSB+jiSB0MZgMASUgdoIsjdQgudwBAClIH6OJLHVzuAIAYUgfo4ksdQkhvby8udwAgHFIH6OJOHULIhupqPHcHAEKQOkCXSOrguTsAEA6pA3SJpA4hZFt9fW9vb7IKAwBZDakDdAmmjsPhKF+1yufzJas8AJC9kDpAl2DqEEJ2NzR0m81JKQwAZDWkDtAlnjoej4fR6jAlKAAgdYAu8dQhhBzr6MATEAAAqQN0SUkd3DQKAASpA0okJXUIIb29vdvq65OyKADIUkgdoEtW6hBCNlRXYxQ1QD5D6gBdElMHo6gB8hxSB+iSmDqEkOamJjxpFCBvIXWALrmp4/F4MKwgB3HXP2tv3b//zc8m2HQXBTIaUgfokps6hJBusxnDCnLMguO1h7Q6RntX5dEv59NdGMhkSB2gS3rqEAwryDXeLw4+zGh1jFbH3P/qoI9Ld3kgcyF1gC4VqYNhBTll+lzTjxjmJ3uPNv+M0a7ZcxaTUEBUSB2gS0XqEEKMh42YrSAnLEydfvZu7V2VRy9Nf/W/lVpd8fb3JnC1A1EgdYAuptTpNpsDPS34l9P/Fp8Sy119f/uPGO2PtrSYurtatvyTjrlj69vOuZS0Rch+SB2gY1JzrUOCz3xDP1tW45zHa+8QZBLGFEBUSB2gS13qEEJ2NzQc6+hI3fIhxWYcrz3GaEtqj4/wnWrcxHs7foAxBRAVUgfoUpo6uH0nu83ZDv2kiPnB795fvE3HfXr3Skb7k8bT1xE7IIbUAbqUpg7BrKAA+QSpA3SpTh1CyLb6ejxsFCAfIHWAToXUGR8fZ7S68fHxVK8IANILqQN0KqQOwTQ5APkBqQN06qQOQT8bQB5A6gCdaqkzPj5evmoV+tkAchhSB+hUSx1CSG9vL+4bBchhSB2gUzN1CO4bzRgLY6ePtLTsb2nZ37L/0Gtvdb/T98XEbLoLBVkPqQN0KqcO7hvNEOxgi14w/dq92zvt3nSXC7IbUgfoVE4dQojFYsFzENKOTx19yyBLCCGzV82/vVvLrDw45E93wSCrIXWATv3UIYQ0NzXhOQjptemFfDgAABM4SURBVJg6nHfsi/N9BzcXa1c+9d4Y5rmBRCB1gC4tqePz+fC80fQS97Dd+eAfz03iUgcSgtQBurSkDgk+bxQDqdOFT527f9nyf2Zzt7mr8w+1pVqm9Nd/c+FiBxKA1AG6dKUOCU5YgB94VOPz+YyHjXyFR/6uQ8jsuaZ/1jH3hP4fIB5IHaBLY+oQDKRWEX9xKUid4od/98eWlv0tLS27HyvV6u78xXEnrnUgAUgdoEtv6vADqW02WxrLkA+6zebyVassFkvoFdHvOoy+6pXTLtyyAwlB6gBdelOHEGKz2cpXrfJ4POktRq7y+Xy7Gxq21dfjJzRQAVIH6NKeOoSQYx0dmJE6FQS9agCphtQBukxIHULItvp642FjukuRU8S9agCphtQBugxJHZ/Ph1NksqBXDdIFqQN0GZI6BHfwJAl61SCNkDpAlzmpQwjpNpvxKIRE9Pb24pIR0gipA3QZlToEU7TFy+fzNTc1baiuxsUipBFSB+gyLXV8Ph+edR2r8fHxDdXVzU1NuEyE9ELqAF2mpQ4JPusat44q1Nvby2h1mEoVMgFSB+gyMHVI8NZRdBbJQ68aZBqkDtBlZuoQjCygQa8aZCCkDtBlbOoQQoyHjbsbGtJdikyEXjXITEgdoMvk1OFHFmDOgnDoVYNMhtQBukxOHRKcswB/1PPQqwYZDqkDdBmeOgRD2oLQqwaZD6kDdJmfOiTvh7ShVw2yBVIH6LIidQghFoslPx/Dg141yCJIHaDLltQhhBgPG7fV1+fVyRe9apBdkDpAl0WpQ4LBk+5SqMHn8xkPG9GrBtkFqQN02ZU6eTKWenx8fFt9/e6Ghry6sIMcgNQBuuxKHZIHwcP/goX5TyEbIXWALutShxDi8Xhy8iYevletfNUqh8OR7rIAxAOpA3TZmDokeBNPLj2+DL1qkAOQOkCXpalDcit40KsGuQGpA3TZmzqEEIfDwWh1WT1tAXrVIJcgdYAuq1OHBK8SsnR4MXrVIMcgdYAu21OHZG3woFcNcg9SB+hyIHVItgUPetUgVyF1gC43UodkT/CgVw1yGFIH6HImdUg2BA961SC3IXXyBMfeuH6D5eL7ci6lDsng4EGvGuQDpE5+mPz4mXt/3X2Nje/bOZY6JCODx+PxoFcN8gFSJ+vMuh22wcHhMa8/+iuE8459MTg4+MWYlyOE8459sv/n2o37e792s1zEW8rkXuqQDAse/pF0xzo60l0QgJRD6mSV+St/2/UfxT9++FePrdXfu73T7uW8lzq3rwm8cs+jzWf/wRFuxv5m3b+s+vnjv/zPB0pLn3jTcfvrt+sf1Gv1D9a8+pGlI+KtGUXJk5OpQzImeI51dODx25A/kDpZxD/50e+L73/ls+/9hNwePvqLn7Z8evn41jsfbB30+gmZvWr+7d33vzrom/7qaPXdOz/ycIT4hjr3Hjk9Nkuumbdot3df+17iLQVyNXVIuoOH71XbVl+fh88/hbyF1Mki3sGWtSV/OBcWFO7Tu1fqWwYDP9dcM2/Rbu4cmZmxv1l3L8PcU/nrPUdOWF1s4K3t3dfmJd5SIIdThwSDR/0f8NGrBvkJqZNFvIMta3/4wtlpQgjhWPc3n39x8f3n7xelziwhhPOOfvah6egLvyq/Y82es55g6rASbymQ26lDCLFYLIxWp+YkoVnVq+b3jpx9+2jr/paWV4+eODvyfZxDIQEIIUidrLLw/dl9/8r3sHGTg/ur7t794WXzjmCf24zz+Pbi+18d9E0NtlSu2PPpFEcI921ndemGzm+5a+Yt2rq3xzwSbylYcc6nDgleeagQPNnWqzbr+vjlf79Dx2iD/+7d9sbwLQQPxA2pk1XY8dNNj+rv+enPH9Df+eDLp12zEa+s+m3n8C2OcKzr1N4Hl93548qHf7xMX20c/N5PvOf3P7iM0VYd/LBb+JYC+ZA6JPhYhJQ+CC7retW4iQ933csw/7LrxJXvOe77kXcay7W6O9d3jiyku2SQtZA6WYfvWwsf98yx7m8+d7gjf6SZdTuGooyOlnlLWp6kDgkGT4oefZ1VvWo8/+RHvy/WFq05aJvjX+A8jvMOd7y3GwMQpA4okT+pQ4I9YMkNnmzrVQvxfXW0mtGWbDGPpbskkDuQOkCXV6lDCPH5fHxIJGWagKzrVQsz+13n5ojU4aZv3ZpLa5Eg6yF1gC7fUocEp0RL/OokC3vVwnHT55pXaHWBe7wI4Sbe2/GDu1Zt7foOv+tAvJA6QJeHqcPj5+KM7x7SrO1VizTv6PyFntGu+M8X/vy2ub2pZgWj/eGG176aT3e5IHshdYAub1OHBO8hjXVEtcPhyNpeNQGOnTj/+vY1dwZGTpdWN33swmgCSABSB+jyOXVI8IcZ5Q+86Tab1bn1J6V8Pl/YJnOs+5vPI2eYBYgPUgfokp46vb292TWf//j4+IbqauNho3yxfT7f7oaGbfX1aZ9RNEH8eIoUjSCHPIfUAbqkp87uhoasO6OFEiVa8PC9atRkynx85OxuaEh3QSA3IXWALump4/P5srQPKtr4gtzoVSPJHjUOIIbUAbpU/K7jcDgYrS4be6IEU4XmTK8aQeSAKpA6QJei0QT88LBsPMGFJs7hBxrkQK8aCetYy4FtgUyG1AG61I1h4+/EzMbTHN9JyGh1yse2ZTIMHwDVIHWALqUjp3c3NDQ3NaVu+akQ6lXjf+bJ2qkHAsbHxxE5oBqkDtClNHWy7q9swVi1bJ5mjZAUT7MNIIbUAbpU3yWaRcEjOVYteye/4RM0pY8UAhBA6gCdCnMT8H9xZ/LIY+pYNX6iz0zeBAH1n9sNQJA6oIQ6M+JkcvAovAM0i24U5TPS4XCkuyCQd5A6QKfaPGyZGTy9vb3KS8VfEm2ors7YEzr/EIcN1dU5cIMRZCOkDtCpOftnRgWPz+drbmqK4wTNB1UGDqoO/QSV+VdjkKuQOkCn8pzTGRI8/IyfzU1N8Z2g+eHIGTVnQagDMN0FgbyG1AE69Z90kPbhvL29vYxWl/jgrm6zOUPuJOW3KO1ZDoDUAbq0PF8nXbcuxt2rFk3aL3r4LYr7oagAyYXUAbp0PdWNv48n7j6uOCTYqyYjXRc9fOZhdjXIHEgdoEvjs0SpT7VJomT1qkUTuuhRbXhbxg5qgHyG1AG6tD/BOtpTbZIl6b1qMvgkONbRkdIcDfWqZewAbshbSB2gS3vqkOBjEVLxY3jqetWi8Xg8fCSk6Ld9fqyamlsEoBxSB+gyIXVI8GSa3Hk2U92rJsNms22ort7d0JDE2dt8Ph8/6QCmVoOMhdQBugxJHZLUeTbV7FWTKQM/yiApHW4OhyPpMQaQdEgdoMuc1OHxf84n8lQb9XvVZHg8nt0NDYl0uOESB7IIUgfoMi11SPCpNvHNs5nGXjUZ/JVKHCPc+KrAJQ5kC6QO0GVg6pC45tnkJ77M5Psl+RFuCiMk8YskAPUhdYAuM1OHp3wgcrbcLxn6scd42Bgte5L7gxCAmpA6QJfJqUOCf/JvqK6W+aWHH3idRfdLejwe/rKs22wW5Aq/LbsbGjL2ig1ABlIH6DI8dXjRBiKHetWy8X7J0J09fPbwv/3I5ytAhkPqAF1WpA6R6nfKll41eXzYMFpdBg6CAIgVUgfosiV1eKHrg1APVbpLlBCHw8EPGTjW0cH/h7jPDSCLIHWALrtShwSHtzFaXVafoy0Wy7b6+g3V1eGbEAqh7N0uyHNIHaDLrtQJ71ULP0dny+0sfD8h//tNtCHR4+PjxsNG+XFuAJkJqQN0WZQ6kmPVHA5H6BydyWMKQuVsbmpSUk5+nJvyzwNkAqQO0GVF6lDHqnk8nm6zuXzVqm319b29vZnTPcUXjL+4ieOajL824rcLt4tC5kPqAF3mp05MY9UsFktzUxN/iWCxWNIVPx6Pp7e3d1t9PT/wIfHB0PzvQNnVnQh5CKkDdBmeOvHdAerz+ULxs7uhobe3V4WbLn0+n81mO9bRsaG6OllhIxDeTYfbeiADIXWALpNTJ/E7QPn4MR428knQ3NTUbTY7HI5kXQONj49bLJZjHR3b6usZrW5bfT2//KQsPBqfz9fb2xt3rx1A6iB1gC4zUyf0rJ0kdpF5PB4+IfiB1/xkB8c6OrrNZpvN5nA4ZNKCHzLncDgsFku32dzc1BS+kOQmmXLhlz741QcyAVIH6DIwdfjp/ZP7XFGx8fFxh8PRbTZ3m827Gxp2NzTw1yvR/vGf4a+WLBZLWmJGEn89l8TfkADihtQBukxLncSf6pa3PB4P/6vShurqYx0dmD8U1IfUAbrMSZ0kPsE6z42PjyN+IC2QOkCXIamjTq9avgnFDzrfQB1IHaDLhNRBr1qqjY+Pd5vN/A9X/NADXFBCKiB1gC69qYNeNZXxA/n4ebv5/jebzZYhwyIgByB1gC6NqYNetfRyOByhO41C47/TXSjIbkgdoEtX6qBXLXOEZlUI3evKXwPhAhRihdQBOvVTB71qmYxPIP4eJv422CRO6LAwdvpIS8v+lpb9LYdeP25+/5Ov3CyXlGJDhkDqAJ3KqYNetezCT/ljPGzkL4NCIRTflRA72KKPuPeWKX2iY9jrT0XJIS2QOkCnZuqgVy3bhead45+nx/8gFMoh6s9CfOroWwZZwrHuS90v/OxO7Q83vPbVvDqlh9RD6gCdOqnj8/nQq5Z7+Onpent7+R45/nqofNWqUBTxXXOhnR6WOoQQwrnMdXfomNVHv8LVTq5A6gCdCqnjcDj4uxRTvSLIBB6PJzRNqvGwcXdDQ2hmUkHqEHZw/z065p7Q/0PWQ+oAXapTh38UJmZEBiJOndlzTf+M1MkpSB2gS13q+Hw+vtcF84ABLzJ1uPmv/rdSq7vzCbMLA9lyBVIH6FKUOqFeNdz3DiF86hQ//Ls/trTs/+OzW1bdxWgf3Ht2AqGTM5A6QJeK1EGvGkgSjJy+88ebm9752ovMySFIHaBLbuqgVw0gnyF1gC6JqYNeNYA8h9QBumSlDnrVAACpA3SJpw561QCAh9QBugRTB71qABCC1AG6BFPnWEcHetUAgIfUAbpMeII1AOQGpA7QIXUAIFmQOkCH1AGAZEHqAB1SBwCSBakDdEgdAEgWpA7QIXUAIFmQOkCH1AGAZEHqAB1SBwCSBakDdEgdAEgWpA7QIXUAIFmQOkCH1AGAZEHqAB1SBwCSBakDdEgdAEgWpA7QIXUAIFmQOkCH1AF1GA8b8dy/nIfUATqkDqiD0eoYrW5bfX1vb6/H40l3cSAlkDpAh9QBdfCpE/q3obr6WEeHzWZDAuUSpA7QCc4F+Id/qv3bVl/PBw8ef54zkDoAkClCYWM8bLRYLEianITUAYBMsa2+HmGT85A6AACgHqQOEEI4dmLo/dcP7W9pefXoibMj33PpLhAA5CqkDvgnrUd+ce+Pfv67lw8d/dPB539V/oM1O976eibdxQKAnITUyXfc5MeN//KjuuNX2MALs66PXii/o/Z1+3RaywUAuQmpk+cWpk4/e/eyvWenwzrVFr5+vfKHPz067E9fsQAgVyF18tzsd52bmerO7yJ+yZk8+8L9dz753kS6CgUAuQupk+fmx47XMauPfhVxXeM+vXvl3btPT6WrUACQu5A6eY6bGzq05gc7ul3zi6/5rPvvL609PoKRbACQdEidvMeNvf/rVaVPtA1OzBJCOO8377/ws+L/aB38Hj/rAEDyIXWAcN6v39mzUR+YjOSu8icOf+qaTXehcg/H3rh+g1V+ARnr5wGyA1IHAjjv2BeDNocbeZMakx8/c++vu6+x9E/G93mALIHUAUjcrNthGxwcHvP6CZ/fX4x5OUIIx7q/+dzhZjnv2Cf7f67duL/3a/dN5yXHhM/9zedhGS/8in1kJPR5XO5AbkHqACSE817q3L6m+McP/+qxtfp7Hm0++4/5wRb9PS2DLCGEvWbezvzSfM3veLv+Qb1W/2BN6+kPm/X/76f//uCG/9q2cdUPfrbv039whLCCr9Q8/Yfg589O4gc2yClIHYBEzDmPb73zwdZBr5+Q2avm3959/6uf9b8iTB1CyDXzFu327mssO9iiv+OJzpEZQvyejxru/smhL+Y4Yer80nwt+Pk0bx9AsiF1ABLhPr17pZ7PC8JHy+bXO/dSUqfyNcdC6PPBF5E6kB+QOgCJmDz7wv1xpw43dvwXSB3IM0gdgETMu8w7iu9/5bPv/YTMOI9vL+Z72P6p4SOPn7B/796+Iix16t4em2cHW/SByVVnnMe3372+c2SBsIMtwq8EP5/uDQRIMqQOQGLY8dNNj+rv+enPH9Dfueq3ncO3uJmvOp+4j9HqGO19m39ZdTefOt7z+x9cxmirDx19Tn/HD/X3rHr4ZyuL+c8TQsRfCX7+6Fd4sCbkFKQOQOKCI6QXX5l1Oy5J3vwU6EybcTsu8UOl6V8ByCVIHQBVhf2EA5CPkDoAquLcQx98MOTGrZ+Qr5A6AACgHqQOAACoB6kDAADqQeoAAIB6kDoAAKAepA4AAKgHqQMAAOpB6gAAgHqQOgAAoB6kDgAAqAepAwAA6kHqAACAepA6AACgnv8Pw0Vl0IEoD9sAAAAASUVORK5CYIIA" /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Since AVC is constant for all the quantities ($10,$10,$10,$10 etc), therefore TVC must be an upward-sloping linear line that starts from the origin ($10,$20,$30, $40 etc) (hope you can imagine that!!). It is also stated that TFC is incurred, which is the usual/ typical horizontal line for all the quantities (say $2,$2,$2,$2 etc). Putting these two together, you will get an upward sloping line which now starts from the vertical cost axis ($12, $22, $32, $42 etc). ATC or AC would therefore be $12, $11, $10.67, $10.50 etc. Answer is D</span></span></div>
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" /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">MR = change in TR/ change in output. Initial TR = (v+z). New TR = (z+w). Therefore, MR = {(z+w) - (v+z)} / {(x+1) - x} = (w-v) only. Answer is C</span></span></div>
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" /> </span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">The diagram shows a monopolistically competitive firm operating in the long-run where normal profit is attained. The idea is, any short-run supernormal profits will attract new entrants, and therefore, existing customers will be competed away by new rivals. Monopolistic firms will be left with relatively too many workers and under-utilised capital relative to the level of output by then. Excess capacity is building up. Since it serves fewer customers than before, it can no longer enjoy economies of scale as it used to. Answer is D</span></span></div>
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" /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Real income = nominal income (or money income) - inflation rate = 5% - 4% = 1%. However, population increases at a faster rate which is 2%. Looking at it, income rises but it will be shared by more people, and so, real income would ideally decrease. Answer is A</span></span></div>
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" /> </span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Increase in business confidence means that there will be a rise in the demand for loanable funds. Reduction in propensity to save will reduce the supply of loanable funds. Answer is B (not to worry cos this has been recently taken out of syllabus)</span></span></div>
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" /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">JK and FG are both SRPCs. Usually, it shifts upward and to the right as it reflects expectation of higher inflation rate. Workers (supply-side unemployment) who initially took up the job offers suffered from money illusion. Soon, they will realise that they are not better-off in real term. They will start asking for higher pay and this causes some of them to be made redundant. This is why, in the long-run, unemployment will not decrease and national output/ income will always remain the same (I wish I can draw a LRPC/ NAIRU curve here). In this question, it is the exact opposite since it shifts downward and to the left. Answer is B</span></span></div>
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" /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">For financial year 2012/13, there was a budget deficit of US$ 370, 300. For financial year 2013/14, there was another fiscal deficit of US$ 40,000. A is incorrect as budget deficit fell. B is incorrect either as both years showed budget deficit. C is incorrect as national debt aka accumulated annual deficit rose. This means answer is D</span></span></div>
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" /></span></span></div>
<div style="margin-left: 1em; margin-right: 1em; text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">This question is related to crowding-out effect. There are two ways in which it can happen. First, when the government sells bonds to private sector, private firms would have less money themselves to invest upon lending to the government. Another way is that, rise in government spending would create competition for money which will cause interest rates to increase (interest rate is the price of money). Eventually, costs of borrowing will increase, and in the same way, private firms would cut investment. Either way, a rise in G causes I to fall. AD may or may not increase. Answer is A </span></span></div>
<br />
<span style="font-size: large;"><span style="font-family: Arial, Helvetica, sans-serif;">Note: I just realised that the diagrams/ some information are 'cut-off' and am not too sure how to edit it. You can counter check with 9708/31 from May June 2015 examination. Thanks</span></span>Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com0tag:blogger.com,1999:blog-4710215856934992447.post-69232526371056240092018-05-22T18:16:00.000-07:002018-05-24T20:09:09.832-07:00Popular Questions for Section A of 9708/22 (CIE) (CAIE) A-Level Economics<div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Important updates:</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">1. Do not evaluate/ provide conclusion just because the question is an 8-marker (Section B, part (a) of each essay). <i><u><b>High
marks do not automatically indicate that the question is evaluative in
nature. By contrast, low marks also do not necessarily imply that there
won't be any evaluation</b></u></i>. In A2, there were instances where a
question is a 5-marker and yet evaluation and conclusion are expected
from students. Instead, interpret/ watch out the keywords that they use
such as:</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">(i) Discuss (most common one) ....</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">(ii) Explain whether ....</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">(iii) How far ....</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">(iv) To what extent ....</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">(v) Do you agree ....</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">(vi) Is this the most important feature ....</span></span><br />
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">2. <i><u><b>Evaluations
and conclusion come in a package. You can only have something to
conclude or weigh upon after considering both advantages and
disadvantages/ pros and cons. It is somewhat illogical to provide
conclusion where no arguments/ discussions prior take place </b></u></i>(to conclude against what?)</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">After a 'chronic' two hours, this is what I found:</span></span></div>
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<b><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Microeconomic questions</span></span></b></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">a) Calculating percentage of change. You may be asked to find the new price or the original price</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">b) Identify one demand reason and one supply reason which may explain for the rise/ fall in the price of a particular commodity</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">c) Using demand and supply diagram to show how equilibrium price and quantity will be affected when an indirect tax/ subsidy is being introduced. It can also be applied to show how an exchange rate has risen or fallen in value. Please take note of the keyword '<u><i><b>show</b></i></u>'. It means that you do not have to provide analysis/ explanation. The diagram on its own is suffice to earn you a full 2 marks. Only provide analysis when the instruction is '<u><i><b>explain</b></i></u>'. Alternatively, watch out for the marks allocated. If it is a 4-marker, then you have to explain</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">d) Maximum/ minimum price. Normally, you will be asked to draw a diagram. Then you need to include analysis e.g. expansion in demand but contraction in supply which leads to shortage. Likely to be a 4-marker</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">e) Production possibility curve e.g. whether it will shift inward or outward based on the information provided e.g. recession, peace talk with rebels, economic recovery and others. There will be analysis marks for this. Usually, it would be a 4-marker </span></span></div>
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<b><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Macroeconomic questions</span></span></b></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">a) Current account balance. Compare between two given years of whether it has improved or worsened. Likely to have minor calculations here</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">b) What other information would be needed to determine the current account balance e.g. you may be given 'balance of trade in goods' and so, you have to state the others like 'net trade in services', ' net investment income' and 'net transfers'</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">c) How a depreciation may cause demand-pull and cost-push inflation</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">d) Conditions necessary for a depreciation to turn a current account deficit into surplus e.g. PEDx > 1 or/ and PEDm > 1, there is no parallel devaluation, inflation rates must not increase by the full extent as depreciation, trading partners do not impose protectionist measures and others (very, very, very popular!)</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">e) Whether protectionism is justified. To some extent e.g. protect sunrise industries, safeguard sunset industries, ensuring survival of strategic industries and prevent dumping. No since it will promote complacency, lead to trade war and cause cost-push inflation</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">f) How components of the aggregate demand are affected when there is a rise/ fall in the price of a particular commodity. Consider the case of falling oil prices. Oil typically has low PED. So, when the price of oil falls, total revenue from oil exports will also decline. Ceteris paribus, (X-M) will fall and so there will be a decline in AD. Second, oil firms will reduce their investment e.g. oil exploration activities. That will also reduce the AD. Then, government revenue from oil exports will also be adversely affected. Spending into the economy e.g. schools, hospitals, roads and bridges is likely to be cut. Again this is a fall in AD. What about C? In an oil-dependent economy, it is safe to assume that many people are employed in the oil and gas sector. In this case, employment will be axed and so C will fall. Alternatively, the government may raise taxes or introduce new ones to cover up shortfall in revenue. This will again reduce C into the economy. All these reflect a fall/ leftward shift of AD</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">g) Whether currency appreciation/ depreciation is more desirable</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">h) Whether fixed exchange rate system is reliable. Yes as this may promote international trade, encourage investment and avoid speculation which may destabilise local financial market. No, as it requires huge amount of foreign reserves, speculations will always be there and interest rates can no longer be altered to achieve certain macroeconomic aims </span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">i) Which category of spending that has the greatest impact onto price index. Here you need to watch out for largest price change or/ and component with biggest weighting assigned</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Easy-to-follow tips which may increase your ability to score tomorrow:</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">a) If you cannot finish the 'discuss' question in Section A, list out all the points and evaluations. You may still gain 2 marks for listing. Obviously, this is better than nothing</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">b) Before you hand up your paper, please check all the diagrams and ensure that they are in satisfactory condition e.g. label of axes, label of curves, whether you <i><u><b>accidentally put price and quantity instead of price level and real output</b></u></i> (most common mistake). Ignoring this may cause you to lose up to 4 marks, depending on how many diagram questions are there in the paper</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">c) Write concisely. Do not provide evaluations or/ and conclusion for an 8-marker. It is a pure waste of time as the instruction is '<i><u><b>EXPLAIN</b></u></i>'. There is no provision of marks for these two, no matter how well you have written them. While it is not wrong to do so, do bear in mind that they will certainly take away some precious time from other sections/ parts. Inability to finish the paper = lower marks</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">d) Use lots of paragraph to distinguish your ideas/ evaluations, one from another (especially for candidates whose writing skills are still in the development/ formation stage). It also gives the examiner a pleasant marking experience which may translate into higher marks (how significant I wouldn't know, but it does bear some weight. More so in A2 essays)</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">e) Use diagrams wherever possible in case if you do not know how to explain a particular concept. Perhaps, the diagram may do some 'talking' on behalf of you</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">All da best peeps!!</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"> </span></span></div>
Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com0tag:blogger.com,1999:blog-4710215856934992447.post-86508936541633257942018-05-16T18:53:00.003-07:002018-10-11T08:15:26.099-07:00Forecast Essay Questions for Section B of 9708/22 (A-Level Economics) (CAIE) (CIE) <div style="text-align: justify;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Highly anticipated essay questions for 9708/22 this coming Wednesday (17th October):</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">1. How a production possibility curve can be used to illustrate economic ideas like opportunity cost, rising opportunity cost (these two are different and the latter is becoming more popular in the recent), unemployment, economic growth and unattainable position</span></span><br />
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">2. Whether market economy or planned economy is more desirable/ likely to improve consumer well-being/ better in making decisions/ better in allocating resources</span></span><br />
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">3. Functions of money and whether money is able to perform all the four functions in an economy that is experiencing high rate of inflation</span></span><br />
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">4. What is meant by equilibrium price and quantity and how a change in demand/ supply would alter both equilibrium </span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">5. The right type of elasticity to determine whether two goods are substitutes or complements/ normal goods or inferior goods</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">6. Whether PED/ XED/ YED would be useful for firms and governments (I won't do these essays if I were you!)</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">7. Whether the problem of demerit goods can be dealt with an indirect tax and banning/ better information/ minimum price</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">8. Whether the problem of merit goods can be dealt with subsidies and maximum price</span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">9. Whether the imposition of maximum price would be able to help low income families </span></span><br />
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">10. Using AD/ AS diagrams, explain how a fall in exchange rate/ depreciation can cause both demand-pull and cost-push inflation</span></span><br />
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">11. Inter-relationships between the inflation rate, exchange rate and balance of payments</span></span><br />
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">12. Whether floating or fixed exchange rate system is more desirable</span></span><br />
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">13. Terms of trade and whether a fall/ increase in terms of trade is beneficial to an economy</span></span><br />
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">14. Comparative advantage and how an economy can consume outside its own PPC. Illustrate with trading possibility curve</span></span><br />
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">15. Fiscal/ monetary/ supply-side policies to achieve macroeconomic objectives like higher growth, lower unemployment and lower inflation</span></span><br />
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">16. Expenditure-dampening vs. expenditure-switching policies in reducing current account deficit</span></span><br />
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Several important observations:</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">a) There is somewhat an observable trend in Paper 2. When the examination board found a new method/ technique or even question to ask, they will 'toy around' with the new concept for several exams/ years before moving on to other new techniques or questions. For instance 'increasing opportunity cost' makes its first appearance in W16 (V3). Then it was asked again in W17 (V3) and now in Feb/ March 2018 (V2)</span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">(b) There is also an indicator that questions may no longer be asked according to chapter/ cluster. This may pose some challenges for candidates that tend to specialise in micro/ macro (which I strongly forbid!!) In W17 (V3), part (a) was about PPC (Chapter 1). However its part (b) was about supply-side policies (Chapter 5). Another one is the recent Feb/ March 2018 paper. Part (a) was about price elasticity of supply (Chapter 2) but its part (b) was regarding supply-side policies (Chapter 5)</span></span><br />
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">(c) Effectiveness of fiscal/ monetary/ supply-side policies to achieve price stability is extremely popular in recent years (let's hope that the trend stays until your exam)</span></span></div>
Lawrence Lowhttp://www.blogger.com/profile/09863709057825133354noreply@blogger.com0