Question 1
Refer to the information provided in Figure 23.11 below to answer the question(s) that follow.
![](data:image/png;base64, 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)
![](data:image/png;base64, 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)
Refer to Figure 23.11. A $20 million decrease in autonomous consumption
◦ changes equilibrium expenditure to $120 million.
◦ changes equilibrium output to $180 million.
◦ will change the
MPC.
◦ will change the
MPS.
Question 2
Refer to the information provided in Figure 23.11 below to answer the question(s) that follow.
![](data:image/png;base64, /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCADkAT4DASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9Q9X1BNH0u7vpkaSG1ieZ1jG52CrngdzxXguuftaLbpaXXh/ws/ijTrPQrbxJ4mu7PU4gmjWcysyhflPnzbUkfyxs+VM7vmAr3zVb7+y9Mu7zyZLj7PC8vlQjLvtGdo9zXxr4I8UDwv8ADf4oX1/pXgU6VfeGNL8XWmjaLpS2tlLcXsl8q2krh911IzWkKbzs3M+NgoGj7YooooEFFFFABRRRQAUUUUAfPf7dHxn/AOFI/s4+JtUtbgQazqaf2RpzK2GE0wILr7ogd/8AgFZ37AHxo/4XT+zd4fnu5ll1rQl/sW/OfmLQqPLc/wC9EUOfXNX/ANrr9lvw3+0X4XgufEus67ZReHbe6u7a00q4hihlkKZ3Sh4nLfcxwV4LVnfsXfsueGvgB4Mj1vw7rGu3j+KdMsru9s9Snhe3jl8vfujVIkI/1jD5ieKrSxWlj6XoooqSQooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACis3V9YsfD2lXmp6neQ2GnWkTTXF1cOEjjQDLMxPQAV8p+F/EPi79s34i2Gv6Rf6p4O+B/hu+Wa0ubZ3tr3xPdRv97IwyWysv4/73+rAPr6iiigAooooAKKKKACiiigDP1b7T/Zt4LRzHdeS3lOI94V8cHbxnntmvjT4dabounaxpHiTxH+y74lHxBieJ73WtL0yzFnLdBubxI2uUCFmLSfc3IWb5j94/Z2omNbG4MrvFEIzvdCQyrjkjHOa+EvEmsfDO60tk8AfE74s+IfGXmI2maSus63Kl7MHVhDLv2gRv9133DCsWz8tUho++qKKKkQUUUUAFFFFABRRRQBgePf8AkR/EX/YOuf8A0W1Z3wf/AOST+Cv+wHY/+iErR8e/8iP4i/7B1z/6Las74P8A/JJ/BX/YDsf/AEQlAHYUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABWbrGs2Ph7SrvU9Tu4bDT7SJpri6uHCRxooyWYnoBRrGs2Ph/SrvU9Tu4dP0+0iaa4urhwkcaKMlmJ6AV8fpHrf7fniYSSC80P9nnSrr5E5huPFc8bdT3S2Vh/wL/e/1YNIEj1v9vzxMJJBeaH+zzpV18icw3HiueNup7pbKw/4F/vf6v7B0rSbPQ9NtdP0+2hstPtY1hgtrdAkcSKMKiqOAAKNK0mz0PTLXT9PtobKwtI1hgtrdAkcaAYCqB0AFaNANhRRRQIKKKKACiiigAooooA5H4lzeIoPBupjwi2m/wDCTNHixj1aV4rd36sGZAzZ2B2GB1UZ4zXz3ouvfHvW/Aem6Je+JPhnot1c6dDbXOrpq9zNqdsTGFeYJs8tpxyfvbN/qK9V+O2keKboaJrHhrR/BWoDRhdXdxdeL5LhDaZh2b4fJR+sbzB93YivmGx+GWuab8PtO+IOofA/4L6doYtodUuFignN3Z2pAdpivlbPkT52Cvn5e54qi0ffQ6UtIOlLUkBRRRQAUUUUAFFFFAGB49/5EfxF/wBg65/9FtWd8H/+ST+Cv+wHY/8AohK0fHv/ACI/iL/sHXP/AKLas74P/wDJJ/BX/YDsf/RCUAdhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAlZ2s61YeHtKu9T1O8hsNPtImmuLq4cJFEgGSzMegpdZ1qx8O6Td6nqd3DYafZxNNcXVw4SKJAMlmY9BXx/HHrX7fnicSyi80P8AZ60q5+SPmG48Vzo3U91tlYf8C+v3AEgjj1r9vzxMJZRd6H+z1pV1lI+YbjxXPG3U91tlZf8AgX+99z7B0vSbPQ9NtdP0+1hsrC0jWGC2gQIkSKMKqgdABRpWk2eh6ba6fYWsVlYWkawwW8CBEiRRgKoHQAVoUDbCiiigQUU0sFGSRivD/ij+2R8LvhdfNpVxr3/CQ+JC/lJ4f8OR/b713/ubE4Q/75WgD3Ks7UtYsNGELX17b2SzzJbxG4lVPMkc4RFz1YngCvmRvGn7SXxuOPC/hfTvgr4cl6ar4o/03VmT+8lovyRt/syfnW14J/Yl8LWHiSy8V+PNe174o+MLSVLiDU/EN2/k20ituUw26nYgDchTuxQOx774m1+y8J+HNT1vUpfI0/TbWW9uZf7kUaF3b8lNfJ/7JXxJu5PiHJp+teJU1m68e6L/AMJhDZLqH2n+zbr7RIZrMLuPlqsM1phOP9U/vX0X8Y/hu3xd+H2o+En1RtKs9SeGO9ljh8x5LZZVeaFfmG3zEVk3c4Dng1j+LPgbpGs+JfBGv6Itl4Z1Twxqn2xZ7OwT/SYHheGa2O0rgOrj5ucFB8poBHiX7J0uia7pWlX2q6T4w1DxS2t6uv8Abkz6g9gdl/chMvv8nCoqJ93buXHWvr+vFPhP8H/Gnwk06y0Gz8a6LfeF4NQurw2s3huUXbpPdSXLp54vNgOZWAbyvTg1yH7PWoi98UeF2g1CS81a78KT3HjWF7x5jBrAuLYRrKGJ2OGOooowPkiUdEWgGfRup3FtaaddTXrRx2ccTvO0v3AgHzZ9sV8O6FpFv4hh0620vwh8ctZ+GE0kdxY6DPPYx6VJBvDxLiSVbn7NjaRG7dMduK+4tSt0u7KeCRlEckbIxdQygEdwetfHnws1HUpdF1a10D9ofWZPDfg60tp557zwjCsLWTmZY3hmkXM0P+jyKJV3Dan3m60Aj7LkkWFGdiERRksx4Aryu8/ag+GdpeS20XiT+1Gify5pdHsbm/hib0aSCN0X869J1bSrPXNLvNN1C3ivbC7he3uLeZNySxuMMhHcEHFeDeP/AIr+J/CHiW8+HPhPQUtddvprG18MMukzNp8FqyD7Tdyun7vZDtl/dZU/Kn98UAj2PwX8QvDXxI0s6j4Y12y1q0RtkklnMrmJ/wC469Ub2bBrpq8o+CCXuoW2tX/iGHTbzxZZahcaJdeIbGxW0bU4oG+SRk5IxuZdu4gFW28GvV6BBRRRQAUUUUAYHj3/AJEfxF/2Drn/ANFtWd8H/wDkk/gr/sB2P/ohK0fHv/Ij+Iv+wdc/+i2rO+D/APySfwV/2A7H/wBEJQB2FFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFZuta1Y+HtJu9T1O7hsNPs4mmuLq4cJFEgGSzMego1nWrHw9pV3qmp3cNhYWcTTXF1cOEjiQDJZiegr5Aij1v9vzxMJZVvND/Z70q5/dxNuhuPFUyHqe62ysP+Bf733AaQRRa3+354nEsq3eh/s96Vc/JE26GfxXMjdT3W2Vh/wL/e+59g6XpNnoem2un2FrFZWFpGsMFvAgRIkUYCqB0AFGlaTZ6Hptrp+n20NlY2sawwW0CBI40AwFUDoBU9zdRWFs81xKkMEY3PLK+1UX1JNANlmivnTxx+3D8O/D+rvoPhY6j8TPFXRdG8HWpvW3f7Uo/dj3+Ykelc6bP9pj43HE9zpHwJ8MS/8ALK2xqetun+9/q4/wwwoCx778QPit4R+FelHUvF/iPTvDtn/DJfXCoz+yL95z7KDXgkv7Yfib4qSPZ/A/4Yat4wTOweJtdH9maOn+2rP88v8Aujaa6j4f/sSfDTwbq413WbO7+IPik4MmueMbg6hOW9VV/kHPT5cj1r32GFLeNY41CRoMBVGABQGh8sf8MufEn4w5m+NPxUu5tPk5bwn4JDafp+P7jyn95Kvs3517b8MPgV4C+DFiLTwX4V07QlI2vPBDuuJP9+Zsu/8AwJq9AooC4UUUUCCiiigAqGKFIi7IgUuctgfePrU1FAFHVdPg1bTbuyuc/Z7mJ4ZNpwdjLhue1fAGi+IBrvjG/wDBj/Evw5P4F1vTNN8Gya7Dol+j3lpayXSiBLhk+x+dMLt4S6ylePkTtX3z4ht4bzQ9QhuAv2eW3kjk3SbBtKEH5v4frXyLrNj8arj9nz/hDLjwh4ATw4NNisG1z/hJ2jiNkoCq6AW+xJNgXbIG2h8Mq8AVSGj7Or5S+LPj+wPxl17QfFPx0f4T2dhaWsum6bZ3Fnbm6SRWLzSSzo+596lfLXGFVW/jr3z4dav4w1fRJ5vGmgad4c1UXDRxWmmak19E8O1cOXMUeDneNu3+Ec815d430zxf8Uvibr+ieGdT8O+FLTw9HbLcX2o6Gmp3l7NNH5igB2VUhVdozySd/TbUgjv/AIJXmlX/AIEgl0bx9L8SLLz5QNenuYbgyNu5TfCqp8vTpXodeafAvxFe654SvbTU7bTbfVtG1O50m+fR4/KtJ5Y2H72Mfw5Vl3Lzh9y5+WvS6BBRXA+Pb/x7ZNJL4Vs/D0llb2zTSHWLiZHmkGf3ahFwi4C/OSev3K8+8O/tEax8UovB9n4G0S0h1fW/DqeJrltelcQ2Nu77Ei/djc7u+8A8ABGb5vu0BY9/or568PftHar8Qo/C2i+GNDtbfxlqkeoPqVtqs7tbaT9hn+zXG8ou6TMxVE+7kHccY216H8HPiVN8TPDmoXF7YJpOtaTqdzo2qWUUvmpFcwPtbY+FJRlKOuVBw4oCx0fj3/kR/EX/AGDrn/0W1Z3wf/5JP4K/7Adj/wCiEqf4iaja23gvxDHLcwxOdNuMI8gU/wCrasv4Q61YL8KPBSm+tww0SyBBlX/n3SgDvaKrT31taKrTXEUIboZHAzUH9t6d/wBBG1/7/L/jQBoUVVl1C2hiSV7iJI3+67OAp/Gof7b07/oI2v8A3+X/ABoA0KKqtfW0cCztcRCE9JS42n8ah/tvTv8AoI2v/f5f8aANCiqovrZrf7QLiIwD/lrvGz86h/tvTv8AoI2v/f5f8aANCiqsV/bTQtMlxE8SdZFcFR+NQ/23p3/QRtf+/wAv+NAGhWbrWtWHh3SbvVNTvIbDT7OJpri7uHCRxIBksxPQVW1nxhofh/R7rVdR1aysdNtULzXc9wiRxAf3mzX5sfFT9prVP2wvid/wivhbwf4m8XfDHSZg50nRYzD/AG9MG+U3dweILbK5x976N9xpFJXPcY4da/b78TrNMLzQ/wBnzSrn93Ed0Nx4qmQ9W7rbKw/4F9fue++P/jh8MP2e9CtrXxB4h0rw7BbRLFa6VCwM2xRhUjt0y+OMcLXjumfCD49/FTT7ew8TeLNM+DHg+ONYYvDPgWNXvEhAwsTXZ4TC8fuvl9q9N+Fv7Inwv+EV2dQ0nw5HqWuk75Nc1x2vr53/AL/myZ2n/cC0xux54f2kfi38ZQYvg98LZtN0uThfFfj0mytcf34rcfvJF9/0qS3/AGMtS+I9xHffG74j638QWyJP7AsXOnaPGfTyosM/+8SDX1RRUk3OX8D/AA58L/DbShpXhXw/p3h+xX/llp9skQb3bHLH3NdRRRQIKKKKACiiigAooooAKKKKACiiigCreki0nKxfaD5bYiz9/j7v418R+Hvgzqsury63FN4X1vTtD1Fb6/8Ag3Y6y76do7P0cPv8v7QpR38t4xDuD7FVvnr7X1a1lvtLvLaC4e0mmheJJ0+9ExGA4+nWvi7Qfhh8QtJHifwFp/wqj0O317wxpXhm58RW17bLpyNBJffadQyrec8jpdo6Bk371+c8ZNIaPs3Wru5sdJvJ7WKO4uo4XeKKebykdwPlVnwdoJ/ixxXy98afBviX4i+IdO1W38D6A98mnQRT6lZ/EC50i7yRvltXaCH95Gjs+0luck7VzX0V8SNL/trwFr9iukafr4uLKVP7L1aXyrS54+5K+1tqHucGvje9+Emn6a4S8/Z/+CNrKUDiOfxSEYoeQ3zWnQ0kCPqr4C6FP4b+G+n6ZP4e0rwr9md0TTNG1FtQgVc53mZkQu7ElmJGcnkmvSK8u/Z50i30X4a29rbeGvDfhSIXEx/s3wrfC8sVy33lkCJ8x7jbXqNIR8/ftF6l4w8QX9l4J0jwt4gm8I6hF5mv69oohad7fdhrOAPKhDyDIeT+FG+XJPy000vUvAnxQ0rx3ovgbWZPDd94Ui8PS6NZxw/bNMe1nd7ZWi8zbsZZXXKs2NqZ4r6NooHc+Rfh18K/Fvwc8UeG/iDeeG7nVrzVbfW4vEWlaS6TTWD31+t9DsBZRIEK+U+1j1yuVr1/9nnwdq3hfw54l1PXbD+ytV8UeIr7X5dNaQO9qszKkUbkMy7/ACoo92043E163RQFzzb4t/DHwh4r8P65qmt+FdE1nU4dLmjjvdQ06GeZFVHKhXdSVAJJ/Gua+FPwH+Gl78L/AAfc3Pw88KXFxNo9nLJJNolszu5hQkklOTXp3jz/AJEfxD/2Drj/ANFtWd8IP+STeCv+wHY/+iEoAueIvh74W8YWlpba/wCG9I1y2s/+PaLUbCO4SHjHyK6nbwB0rD/4Z8+Fv/RNfCH/AIIrX/4ivQaKBHL6t8OvCuvaNZaNqfhjR9T0iyx9l0+7sIZbe3wNq7I2XamAccDpWN/wz58Lf+ia+EP/AARWv/xFeg0UAc1d/DzwvfeGofDt14b0i48PxY8vSZbCJ7VNpyu2IrsGPpWH/wAM+fC3/omvhD/wRWv/AMRXoNc340+IHhv4c6TJqnifXdP0HT0GWn1C5WJf+A56n2FACQ/D7wtb+F38NQ+G9Ii8OPndpCWEQtDlt5zDt2fe56daw/8Ahn34Wf8ARNfCH/gitf8A4ivGbz9tG5+IV1Lp3wS+Hut/Em5UlP7bmj/s/R4m/wBqeXBb/dCjP96oR+z18YvjKpl+LfxRfQ9Hl+94V8ABrSIr6S3T/vH916VQ7HS/ET42fAT4DaPfeFbsaDF9tys3hLw/p8c8t0XG3a9tCuMsFA+fFeIa3pfiP4l6Teah4W+AngH4P+D4Ymml8VfEHRrT7SkI+ZpFtFT5Pl/v7hX034D+B3wp/Z00G71PRNA0rw7b2sRmu9auvnm2KPmd7iXc+O/3sV4VFDrX7fXiZbiZbvQ/2fNKucxRNuhuPFUyHq3dbZWH/Avr9wKR8l+E/wBkub4z6N4++IMus6g/w40XTL27srxrKPTl1y8ht3ZZbe2jUJDArKPm5LAbfXZ+sXgLQNN8N+EdKstJ0+10yzS1j2W9nAsSL8g7LxWd438DR618KfEHg7RYrXS473RrnSrONU2Q2++Fo0+VRwi7h0FdPpVq1jplnbOwZ4YUjLDoSBik2Ju5dooopEhRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQBQ1bUF0nTbu+kjklS2heYpEuXYKM4UdzxXzd4d/aE8Z23hbx74j8SDw7LFZeE9M8WaNY6YZNgW7a+VLV5mf8AfSN9ljUMqoGd+BXu3xE8VXPg3wXq2tWWj32v3VnDvj07TkDzynIHygsoOM5PPRTXxv4b0nRtZttN8XaF+zf4kTx5f2ltd2090gi0NL1l3pO0JutixpK7uvyZG4lfmagaR9y6hp9tq9hc2V5BHc2dzG0M0MqbkkRhhlI7givmT4jeAl8X/EDUdC8KfBr4fa1F4dsrO0l1PxX+7baY8xQwIkLt5aIFXJIHVV6GvqftXx58atH8LXHx58QXfjjwv8QPEcJ06yi0u68K298LWCMBy8LNbFN772Z9xJ4fHy7eQEfQvwX8K3vhDwNBpmoeG/DnhW4SeRzp3hbP2IAt94ZRPmPf5a7+vNPgLb+H4Ph7bp4Z0rX9G0oXEpW08SpOt2G3clvPZnx6c16XQJhRRRQAUUUUAYHj3/kR/EX/AGDrn/0W1Z3wf/5JP4K/7Adj/wCiErR8e/8AIj+Iv+wdc/8Aotqz/hB/ySXwV/2A7H/0QlAHX0VwnxK+Nngb4O6cbzxl4o07QU25SK5mHnS/7kQ+d/wFeHf8NWeP/i6TB8FfhbqGpWT/ACp4q8YZ07Tf99E/1ky/TH0oHY+p5JkhjaSRgiKMlmOABXgvxE/bW+GfgXVToen6jc+OfE7fKmh+EoDqFwW9GKfIn4tmuTi/ZE8YfFZxc/G/4o6p4mt35Phnw2TpmlL/ALLbPnlHu2017x8PPhD4N+E+mrp/g/w1p3h61C7W+x26q7/77/fc+7E0BoeCtqv7S/xwAGnadpXwN8NTf8vGpbdR1l09REPkjPs2GFdB4N/Yd+H+kaumv+MZNT+KXin7zar4vuTdhT/sQn5FHtg19G0UBcq2VlBp9tHbW0EdtbxrtjiiQIiD0UDpVfW9bsPDuk3eqapdw2Gn2cTTXF1cOEjiQDJZiego1rW7Hw7pF3qmqXcNhp9nE01xdXDhI4kAyWYnoK+QIYdb/b68TrcXCXeh/s+aVc7oYWDQ3HiqZD1butsrD/gX1+4AkEMOt/t9eJlnuEu9D/Z80q5zHAwMNx4qmQ9W7rbKw/4F9fufYOl6VZ6Hpttp+n20VjY20awwW0CBEjRRgKoHQCjS9Ls9E0620/T7aKysraNYYLaBAiRoBgKoHQCtCgGzgvjrcS2nwT+IFzDK8E8Xh7UJI5I22sjC2kIYHsa6zw8S+g6axYktbREk9/kFYnxU8PXfi/4Z+LtBsTGL3VdHvLG3aU4XzJIXRdx7DLCt7SLZ7PS7O3kx5kMKRnb0yBigReooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAM7W2vE0i/bTlR9QEDm2WT7pl2nZu9s4r4W8V+EfEPhJLPUNY8S/FbVPEGuaNpuoaNFBdXQhuNYLubmyuIoQqWyNmEYbYERnwfkr7o1yWW20e+mgiknnSF2jigOHdgDgL718PTzyN8GtF8SWf7R3im98WXZtd2iQalbebcXMkiCSyS3MXmJJyUG75lYZK9RQXE+59Q1G10mxlu726is7WFd0k87hEQe7HgV5n4j/aH8N6B4O8J6/aWera/L4tVH0LSNKtN99fq0fm7lRioCrH87MxAC1Q+HOo6sPD3xC8P+Ip5PiGfDGpPZQzvbQLcalGbO3ulhdPljMqmbZu+VWwpODux5l8ONV+B/wx8WjXLrxjqum6vZWr6dp2ieMpJbc6HbOVd7e2gkRcL8qDK7/lVVDbaCbH0H8OviZonxN0FdS0WZwVZorqwuR5d3ZSq7o8U8X3o3Do64P93jNdjXkPwJ1HwxcJrUfhLTNWlsLm6m1C48SajYG2XUZp55ZmVGdUeRU81gDs2BdoDGvXqBBXi37Q3gzXvFtx4MbT9Ak8UaLpl/Pe6npMWpLYvc/6LJHCoclc4eXfjcBlFr2muP8AGvhXX/EMtq+ieMr7wt5aukyW1lbXAmVtvP75G2uuOCOOeVagEfP0XinQPiTdfB7wd4etL/RvBur6jrB1nR7mR0n86xR99lMd5OPtDbmXcQypjo1d78AnuNB8efFbwTDLcS+H/D+rWr6XHNK0n2aO5tEmeBWbJ2K5ZlXPAdR0rT/4Zw0Ky8KeHdM0fU9S0nVNA1GbV7LxAGSW7a8m3/aJZd67ZPO82TeuMHPG3Arqvhv8MrX4cWursL+61rV9avn1LU9VvtgmupyioOEUKiKiIqoowoWgdzG+Mfi3xDpGia1aaZ4I1DX7J9MmL39te2sKRko4IKySq5wMHgd68A+HPgj9oj4weAPC9tqXizS/hJ4OGl2scUHh5PterXMIjQKzTP8AJESoz8nTPSvrDx7/AMiP4i/7B1z/AOi2rO+D/wDySfwV/wBgOx/9EJQFzzn4afsZ/C/4cakNYOjy+K/E7fNJr/ieY6hdu/8Ae3P8qH/dAr3NEEahQAqjoBT6KBBRRRQAlZ2ta3YeHNJvNU1S7hsNPs4mmuLu4cJHEgGSzE9BRret2PhzSbzVdUu4bDTrOJpri6uHCRxIBlmYnoK+QIYdb/b78Trc3CXeh/s+aVc7oYWDQ3HiqZD95u62ysP+Bf733AEghh1v9vrxOtxcJd6H+z5pVzuhhYNDceKpkPVu62ysP+BfX7n2Dpel2eiadbafp9tFZWVtGsMFtAgRI0UYCqB0Ao0zS7PRNOttP0+2isrK2jWGC2gQIkaAYCqB0ArQoG2FFFFAjiPjVqV3o3wd8dajYXMlnfWmhX9xBcRNteKRLd2R1PYggGum0J2l0TT5JGLu9vGzMepO0Vz/AMX9CvfE/wAKPGejabF5+o6jot7aW8WQN8skDogyeBywrodEgkttIsYJRtkigRHHoQooA0KKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigCjq15LYabeXMNu93NDC8qQR/elZRkIPc9K+H/B/j+x0NvHvjq+1Twhr3ja58MaTrGjTW+kWtvLDql3LqCHT4iq+c774YYzvYvljux0r7e1aOebTLuOCWSK4eJxHJDt3o204I3cZ+vFfJ/wAPdM8X6NqOla5r/wCzVZX/AI6hRYrvxfBd6XDcXLjhrlgDlHf75VWPLNg0DR9dxwpFuKqF3HLYHU0S28cxBkjVyvTcucVLRQIKKKKACiiigAooooAwPHv/ACI/iL/sHXP/AKLas74P/wDJJ/BX/YDsf/RCVo+Pf+RH8Rf9g65/9FtWd8H/APkk/gr/ALAdj/6ISgDsKKKKAErO1vW7Dw5pN3quqXkNhp1nE01xdXDhI4kAyzMT0FGt63Y+HNJvNV1S7hsNOs4mmuLq4cJHEgGWZiegr5Agt9a/b68Trc3KXeh/s+aVc7oYGBhuPFUyN99u62ysP+BfX7gCQQW+tft9eJ1ublLvQ/2fNKud0MDAw3HiqZG++3dbZWH/AAL6/c+wdM0u00XTrbT9PtorKyto1hgtoECpGgGAqgdAKNM0u00XTraw0+2isrK2jWGC2gQIkaAYCqB0ArQoG2FFFFAgooooA4z4wa3e+GfhP401jTpvs+o6fot7eW0u0Hy5I4HdGweDhlFdHos0lxpFjPKd0ksCO59SVFcz8adLvNa+D/jrTrC3kvL+80K/t7eCJcvLI9u6oijuSSBXS6FG0WiWEcilHS3jVlPUHaKANGiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAzdbjuJNJvltIknumhcRRu21XfadoJ7DNfn2PBfwh1DwBpPh3Tk8WT/GMtbRS6HLc6kl19tEi+ckw3eWkH38up2qnKHpX6B63PJa6TfTwwyzzRwO6RQbfNcgHAXPGfSviiebWh8F9H8Y237SHiC7169S0J0u3fTmNxNJIgezhi+z+YsvzFF3Zwy7mXqA0Wj6W+COi3/hL/hNfD73GrXmhaVrfk6NPrEks032d7S2ldFlk+aWNJpJlDkt0K5+SvVK8u+CWr69KvjHw/wCIdZHia78N6ydOj1gwJC9zG9rb3KiVEwnmJ9o2HaoB2qepNeo0iAooooAKKKKACiiigDA8e/8AIj+Iv+wdc/8Aotqzvg9/ySfwV/2A7H/0QlaPj3/kR/EX/YOuf/RbVnfB7/kk/gr/ALAdj/6ISgOh2FZut65YeHNJvNU1S8h0/TrOJpri7uHCRxIBksxPQUmua5YeHNIvNV1S7h0/TrOJpri7uHCRxIBksxPQV8g29trX7fXidLq6S70P9n3SrndBbsDDceKpkb77d1tlYf8AAv8Ae+4DSC3t9a/b68Trc3KXeh/s+6Vc5gt2zDceKpkb77d1tlYf8C/3vufYWmaXaaLp1tYafbRWVlbRrDBbQIESNAMBVA6AVHY2Fj4d0qG1tYoNP06zhEccUSiOKGNRwAOgUCi713TLKzjurjUrS3tZv9XNJOio/f5WJwaAZp0VzWp+O9A0uCCefVIDFcK7xtBmbcifff5M/IuRlugzzW5a3cV5BHPBIssMiB1dDuVgehB9KBFmiiigAooooA5H4seILzwl8LvGGuacyJf6Xo95e2zOu5RLHA7pkdxlRW/o1zJd6TZXEpBlmgR2x6lc1yXxwtLjU/gv4+tLO2lu7qfQL+KGCBC7yubdwqKo5JJ4xXVeH1ZND09HUo6W8asrDBB2CgDSooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKAPNPjN8d/DnwM0vTLvX0vJ59UnNtZWlnGrPPKF3bdzsiJx3dhXg+kaP4q+IfxpnuNE+HHgX4W6ollBrEniO+s4NW1iaGaWVMo0O2NHbynyxd/vfxV9Zazomn+ItOmsNTsbfUrKZcSW13CssTj3VuDXjR/ZL8KeH9ffW/AOoax8N9Wfb5g8PXO2zmVWLbHtJA8OzLN8qqvU4oGj22G2jt3lKIqNK29yoxvbGMn1OAPyqzRRQIKKKKACiiigAooooAwPHv/Ij+Iv+wdc/+i2rnvh5ren+G/gh4V1bVLyHT9Os/D9nPcXdw4SOJBboSzMegrf+IDbfAviMn7o025/9FNX57+C/ih4f/a2g8NaL4x8aaJ4F+DXhW0tLebRdS1mC0vvEl5DGgbzULhktlI/4F9fuNDSuesRWutft+eJRdXaXmhfs96XcZgt2zDceKpkb77d0tlYf8C+v3Pbfg88vw58R33wsuneWw020W+8N3EnLSabu2Nbsf4nt3wm7qUeInnNaGm/Hj4O6Lp9tYWHxG8E2dlbRrDBbwa5ZokSKMBVAfgAVwfxM+Ovw0/4Tv4aa5p/xF8JzT2mrzWd00OuWzbbOe0m378PwnmxW7ZPdVpjM79rHx5batLcfDy9m1DStBbS5NT1m+gs7hxdoAfJskeNGxvdd0h7Iu3+OsL4eeDtQ+LHwB+BWpeH7XQfEFt4Z01WudI8TxzRW9xP9h8hf+WT/AHN7/NtYdCK9r1X49/CHWdMu7C5+Jvg5re7heGRR4gtFJR1wf+Wnoa4WTX/glH4a0DQ9M+NWn+HtP0WzXT7aPSPGsEO+BVChX/enccKPn++P4WFSB0Xwp/sX4s+BNM17R9Pn8B3Vo1/o1xp+leSEt3Sdo7mEfJsK+bDuV1VT343GvWtH0q20HSbLTLOPybOzhS3gjznaiLtUfkK8r8F/Fr4IfD7w1Y6DoXxC8GWGlWalYoR4htmOWYszMWlyWLMxJPJJre/4aM+E/wD0U/wb/wCFBaf/ABygD0eivOf+GjfhP/0U/wAG/wDhQWn/AMco/wCGjfhP/wBFP8G/+FBaf/HKCT0aivOf+GjfhP8A9FP8G/8AhQWn/wAco/4aN+E//RT/AAb/AOFBaf8AxygDc+JfiW58GfDjxT4is0jlvNJ0q6v4opgdjvFC7qrYwcZWt3Srpr7TLS5dQrzQpIVHQEjNeG/G74/fDHU/gz4+tLP4jeEru7uNAv4obeHXLV3lc27gIqh8kk8YrqNC/aI+FUWh6fHJ8TPByOLeJWU6/aAg7B/00oHY9Xorzn/ho34T/wDRT/Bv/hQWn/xyj/ho34T/APRT/Bv/AIUFp/8AHKBHo1Fec/8ADRvwn/6Kf4N/8KC0/wDjlH/DRvwn/wCin+Df/CgtP/jlAHo1Fec/8NG/Cf8A6Kf4N/8ACgtP/jlH/DRvwn/6Kf4N/wDCgtP/AI5QB6NRXnP/AA0b8J/+in+Df/CgtP8A45R/w0b8J/8Aop/g3/woLT/45QB6NRXnP/DRvwn/AOin+Df/AAoLT/45R/w0b8J/+in+Df8AwoLT/wCOUAejUV5z/wANG/Cf/op/g3/woLT/AOOUf8NG/Cf/AKKf4N/8KC0/+OUAei4oIzXnP/DRvwo/6Kf4N/8ACgtP/jlfMfxG/wCCnnhb4XfG3UvC13psHijwhHHA8HiHw1fR3JBeNWcFd2x8MSOHHTpRYaTZ9x0V5d8H/wBpL4dfHez83wX4ostUuBGZZNPJ8q7hGcEvC+H25I+bG33r1GgQUUUUAFFFFABRRRQAUUUUAFFFFACEZqlHpFlGgRbO3VF4CrEABV6igCp/Zdn/AM+kP/fsUf2XZ/8APpD/AN+xVuigCp/Zdn/z6Q/9+xR/Zdn/AM+kP/fsVbooAqf2XZ/8+kP/AH7FH9l2f/PpD/37FW6KAKn9l2f/AD6Q/wDfsUf2XZ/8+kP/AH7FW6KAKn9l2f8Az6Q/9+xR/Zdn/wA+kP8A37FW68/+IXivxx4d+03Ph3wnpmuafaWhuppb3WTZySMN2Yo0EMnO1c7nZRyo9SoBb+J/gw+L/hv4r0HT7e0iv9V0m6sLd5htRZJYXRCzAEgZI7Vv6TolvZ6ZZ28ltAXhiRGKoMZVcV5TbftBy+MU8IWngPQl1zVvEGgr4kEWq3hsYbWyOAvmuElO93bYqqp6MxOF5q6R+0m/jOy8J2Xhfw99q8W66L3zdL1O8+zw6b9il8m6M0yI5O2Uqi7EbfuB+UUDse1/2XZ/8+kP/fsUf2XZ/wDPpD/37Fcd8JviWnxO8NXV6+nvo+p6dfz6VqWmySeb9luoX2yIHAG9fulTgZBHArvKBFT+y7P/AJ9If+/Yo/suz/59If8Av2Kt0UAVP7Ls/wDn0h/79ij+y7P/AJ9If+/Yq3RQBU/suz/59If+/Yo/suz/AOfSH/v2Kt0UAVP7Ls/+fSH/AL9ij+y7P/n0h/79irdFAFT+y7P/AJ9If+/Yo/suz/59If8Av2Kt0UAVP7Ls/wDn0h/79ivlT4pf8E8fBvxs+OmqfEHxbq19PYXMVvFHoNgBbp+7jVD5kvzMQ23omz619bUUAnY4n4bfB3wX8INKXTvB3hrTvD9tjDm0gAkk/wB+T77n3Ymu2oooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACvnf8AaO8Za3qmq2/w+sNG8S2ugalBv13xJpWkXN3stTwbW28pD++lXKl+iKT1bGPoiigD5uSCL4a/FnRvG2neGtdfwRqPhKLQUg0/R7iW506S3mZ4Ue1RPORHR2Gdnysi5Kg1xPwz8DeIvhD4x8N/EfW/D2qyW+sx64ur2On2j3l1pRu75bq2zDDvd/lXY+xThiO1fY9FA7nj/wCzh4a1TS9E8W67q9hPpFz4q8SXmtx6ddDbPbwPsSFZR2cpEHK/w79vavYKKKBBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABUbyCNC7EKoGSTUleRftQ6rq9r8HdX0rw6kx8Q+IpIdBsJIIy/kvdOIWmbH3QiM75/wBigBfgN+0BY/He01+W00q40g6ZdIsSXEiu11aSpvt7pcdFkXPy9tp5rvx4w0P+0LjTjrWnm/tiizWou082MuwVAyZyNxKgZ65r5n0rwF41+Cnxi8JM2o6VqWla94dfwhE+iaJNYx2c1rG01i82+5uCf+WybsgfMPWvML9vDWn/AAc+D2gXPhm8sviLpvi7R11l7nSZhcQ3hu1+0yzXJTa/nPyG3tv3KRnbxQ7H3VfeLNE0vUV0+91iwtL8wmcWs10iSmMdX2E52j1p134l0izmghudVsoLiZ444o5bhFZ2kz5agFuS2049dpxXw98WV0Xw/wDBP9oDSvGnhy7u/H95e6rfW92+kTXDz25ybG5juAjAQwxbFzvXZ5bjAPyn07w/8P18Q/tF6xq8ujxXV/p3gDR/7GvL6DfFbXnmXfzpu4WRcJ8y8qD/ALVFh2PpO38TaTd6tcaVb6rZXGqWyh57GK4Rpox6smcr+NQt4w0SPU59NfW9OF9Bs821N0nnR72wu5M5XJIAr4y+B3gV9Usvhzp1/wCL7Dw/488PXhu7jSf+EYe31V7rY4uUuLlpW8xJdzs0u3D/ACkdqwdcHh/SfgH4A0DVvDV7b/FCw8WaSdZnn0mbzo7xtSi+0XMtyU2sk2flfeQ+9NudvBYdj7um8X6Fb67Fo02tafFrEi7o9Pe6Rbhx6iPO4/lWRovxW8KeIPGeteE9O1u2ufEGjmNbyyVsOhdGdQN33ztU525298V8f/tL+J9U8XWfxDs4bG10LXNG1y1/s3S7Pw3JNquoLFJAy6gbv+CPG/DoOFTBbnbXW+I/Ds1h8Wv2irDQdPh0zxzr+g2k3haf7KI5bmQWEyTPby7cbt/DYPUjdQTY+r9M8S6TrN3d2mnarZX11ZtsuILa4SV4W/uuAcqfrSa74m0jwxbR3Gs6nZaTbuwRZb64SFGc9FBcjmvln4AeE9J1Txh4B1HTvF2mWupeHtMmt5vD2n+FpNMuxE8QV4LwtKx+V9r/ADjl13L97NdN4vudE8M/tKa3rPxIskl8P3nh22tNAvr6za5tInEkv2y3XCsEmfMRx1cYAztqR2PoptSs1e1VrqEPdf6gGQZm4z8n97jniua8b/Fbwp8ONHm1XxBrtrYWcNzFZO27eyzSFQiEDJz86n2Vtx45r5S8L6dqXw+0n4K+I9d0/UNI8J6X4p1t4RdW8m/SdNukuFsVmTbuiTBRfmxsDIpxWX4009fGfw3+OuujQry805/H2manatdaZL5r2qJpyyXCRFN5TYjtkDlM0BY+1Lvxn4fs7M3tzrmnQWflCb7RJdxrF5ZOA+4nG3IIzV9NYsWWzYXtuwvObY+av7/5d3yc/Pxzx2r5M8SeJPhxZftZ6JqmrwWMvhX/AIV6H065+xtLYwk38gDbVUomUZ1UkdyB97nn/D+l3fgbQPhb4nvtMv8ASPAul/ELVr6zimtJFbStJube7itGlixvjj3yBvmA2BxuxVWCx9ZePPir4V+G/h+/1rxFrVtp9hZSxQTsTvdJJCoRNi5bLb17dOenNauoeLdI0zwveeIpr+B9GsrWW8mvYpA8YijUs7BhwcBT+VfFfxH07/hP/h9+0nqtpod7qNpP4g0e+sWn0+XfNDCln5s0KMm5k2JLyByN3Y19EfGKGw8W/sveME8GJBc6fdaFcvYxafGESVAjMURePvbWXHvUisM1v496ja6D4Qi0/wAIX2o+N/EdumpweFrSeMyw2CSxfaJJJZGijQpFKuAzDMjKnIy1er6XqZvtJtr6a2m03zYVme2vAqywZGSr4JUEd+TXgfx0uvh7r/hrwj4k1XUvEOg6gLQXHh7xX4UsbqWW3aYIFhDwxOh80siiGXiToozXc+DLzxbrf7Otpc+NLP7J4vuNBka/to49h84xN1RfuueCVHQkigZ3CeM/D08lzFHrmnSS20Aup41u4y0UJ5Ej/N8qf7R4qjrPjVLfRtJ1PRYbbxBaahfQWwnt7+GOJY5H2GZXc4fb/cXLHoK+TvA/wj0qHw1+yIz+E4EmMZfVi1jyWOlSzN9o+X/nuiP8/wDGq96NV8L3mnaV4w0yw0ma306D42aPcWlpBbMsSQNJYSyuigfc3tKWI4+9TsKx7HL+0tcRC5/4kMZ8n4hJ4H/4+jyjbf8ASfu9fm+5+teo6J4xN3Z65c6rbQ6Jb6ZfTWvmy30MqPEmNszMhxHuz9x8MO9fKV1oWpt/aGNPuufjtDdj9w/+p+T970+5/tdKoPo1xp/iu71bxJpN1d/D+z+K2r3msxtaPNGA1miWdzLHgl4UmPXBUNtY/dpFWPtCx8UaPqWkLqtpqtldaW3S+guEeE84++DjrS6V4j0rXZLqPTdUs9Qe0fyrhbS4SVoX/uvtPyn2NfFHxW0UeJ/CH7QWqeDtLul8D6xZ6MlstpavFDqOoJcf6TPbJgbhsaFGkQYdk6nbXpPjDwDomh/H2e0h0+Tw34UvvhhqllqV1odqYfLRLmBU2+Uv+sSN5tmAW/uigmx6542+MOj+FvBmoeJdPmsvEem6RPF/arWN8jGzti4WaY7c58pdzlDjIRuc16IkgkG5SCp6GvjDwx4m/sH4HfGTw3IumeIvDWi+GVsNM8UaTpP2FdUaS3mhSxkQ/JJOj7Eyny/vlBVG4r628H6fcaR4S0SwvJPOu7Wyhgmc/wAToihj+YoBo3KKKKBBRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXln/AAo21v8AxBpWp674r8SeJrbR7z+0NO0vU57f7LbXA3bJP3UKSSFMnb5rviiigaHeM/ghb/EO6vLfW/FniW58OXsolufDaXECWUwUr8hYQ+f5bY+ZBKFOTxXpqosa7EAVVGAB2oooBi15defA+21bX9Mvte8V+JPEljp+ojULLR9RngFpBcKWZH/dQpJJsJ+VZXdRgcUUUAj1GlbrRRQIF60N1oooAG606iigDkl+HOlD4mN473XH9tnRl0XbvHk/ZxM033cZ3biec9K6tutFFAAO9G0EEdqKKAOfsvBuhaXodroFvpFmui2xEsFg8QeGJo5VkjKqcgbXAZf7pVcYwMdFRRQAUUUUAFFFFADV60p6UUUAZGuaDp3iCC1j1KzivYoLqG6jjmXKrLG4aN8eqsAw9CoPatiiigAooooA/9k=)
![](data:image/png;base64, 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)
Refer to Figure 23.11. If
MPC increases to 0.8, equilibrium aggregate output
◦ increases to $250 million.
◦ remains at $200 million.
◦ increases to $400 million.
◦ cannot be determined from the given information.