[size=150]A program gives computers to families with school-aged children. They have a certain number of computers to distribute fairly between several families. How many computers should each family get?[br][br][size=150]One month the program has 8 computers. The families have these numbers of school-aged children: 4, 2, 6, 2, 2.[/size][br][br][size=100]How many children are there in all?[br][br]Counting all the children in all the families, how many children would use each computer? This is the number of children per computer. Call this number [math]A[/math].[/size][/size]
How many children are there in all? [br][br]Counting all the children in all the families, how many children would use each computer? This is the number of children per computer. Call this number [math]B[/math].
Does it make sense that[math]B[/math] is not a whole number? Why?
Does it make sense that the number of computers for one family is not a whole number? Explain your reasoning.
[size=150]Find and describe a way to distribute computers to the families so that each family gets a whole number of computers. Fill in the fourth column of the table.[br][br]Compute the number of children per computer in each family and fill in the last column of the table.[/size][br][br]Do you think your way of distributing the computers is fair? Explain your reasoning.
Which mascot won, according to the principal’s plan? What percentage of the votes did the winner get under this plan?
Which mascot received the most student votes in all? What percentage of the votes did this mascot receive?
The students thought this plan was not very fair. They suggested that bigger classes should have more votes to send to the principal. Make up a proposal for the principal where there are as few votes as possible, but the votes proportionally represent the number of students in each class.
Decide how to assign the votes for the results in the class. (Do they all go to the winner? Or should the loser still get some votes?)
How many students are in this district in all?
If the advisors could represent students at different schools, how many students per advisor should there be? Call this number [math]A[/math].
In your system, which mascot is the winner?[br]
In your system, how many representative votes are there? How many students does each vote represent?
If the advisors could represent students at different schools, how many students per advisor should there be? Call this number [math]A[/math].
If the advisors didn’t have to represent students at the same school, how many students per advisor should there be? Call this number [math]B[/math].
Using [math]B[/math] students per advisor, how many advisors should each school have? Give your quotients to the tenths place. Fill in the first “number of advisors” column of the table. Does it make sense to have a tenth of an advisor?
[size=150]Decide on a consistent way to assign advisors to schools so that there are only whole numbers of advisors for each school, and there is a total of 10 advisors among the schools. Fill in the “your way” column of the table.[/size][br][br]How many students per advisor are there at each school? Fill in the last row of the table.
Do you think this is a fair way to assign advisors? Explain your reasoning.
[size=150]The whole town gets interested in choosing a mascot. The mayor of the town decides to choose representatives to vote.[br][br]There are 50 blocks in the town, and the people on each block tend to have the same opinion about which mascot is best. Green blocks like sea lions, and gold blocks like banana slugs. The mayor decides to have 5 representatives, each representing a district of 10 blocks.[br][br]Here is a map of the town, with preferences shown.[br][/size][br][img]data:image/png;base64,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[/img][br]Suppose there were an election with each block getting one vote. How many votes would be for banana slugs? For sea lions? What percentage of the vote would be for banana slugs?[br]
Suppose the districts are shown in the next map. What did the people in each district prefer? What did their representative vote? Which mascot would win the election?[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAaQAAADZCAYAAABvh0SeAAAgAElEQVR4Ae2dCXhV5bX+T8g8neQkAUIGIARkUhLQKohASEImBkMGQARkckIcrnXsddZqVWZRq1hBZJ4JQb1qH2vrrKVXbRFvta3WoldBKw7YlvL+n7WTjWc++2QlZ8f7f/M837OHM6283/ut317f3mcfB/hHBagAFaACVKATKODoBDEwBCpABagAFaACIJBoAipABagAFegUChBInaIbGAQVoAJUgAoQSPQAFaACVIAKdAoFCKRO0Q0MggpQASpABfwCyeFwgI0a0AP0AD1AD3SEBwKhl0AifHnwQQ/QA/RARD1AINFwETVcRxxV8T15tE4P/N/wAIFEIBFI9AA9QA90Cg8QSDRipzAij3D/bxzhsh/ZjxoPEEgEEoFED9AD9ECn8EC7ACk+LgZ5PVwoyHOiT75NrVcWCvvko7BvIQr79vVsfXqjT+9s+2Jr1aSwIMczLrc4+/Tujj75aTbGmIY+vXNQWFjgG2NhIQr79EKfnpk2xuc0Pr9QYnHT7cR6Qb7N+jnRp1d3FPbp7T8+8WAv6WObxofxuWkoLJAx4jU+ZLuwsHP0b59eRiw+MRYWGP60f4x096+faFiQY3P/Oo0859+DMobz0adXlm0xCh+EE8KLQFVUuwApJzsdjy1uxHOry/HC2hJb2oubp+K1F/fi9TfewOtv/Najvfbyr/By0422xOWux6u/fNQjLvc4X95zC15cV2lfjOuq8PLen+K1V37tG+Nrr+LV53fihY219sW3tgQvbZuH1197yTe+N36LV5/fghfXVeCFtWNti/Gl7RfhtRef9huf7JfH3f0Q2fWxhj6ik7vvTqy/9pKhb2Rj8soVG2sNn73+2qs+MYovxZ8vrKuyTUMZnzJOT2jmlWdkfNuq39oSI89JvvON8Q0jP0qetCtG4YNwQnjRoUDqlZNqwOhgkwuH9zpsaZ8/9yN8c+htfHf0G3z33Xce7ejfP8KXv7vWlrjc9fjqw+0ecbnH+eWbN+LwU93si/GpbHz59u04euSgT4xHv/kS33z8Cg4/O8i++PY68PmLE3D060P47uhRnxi/Pvg8Dj8p/ou1LcbPX6rDt4cP+MQm/Sz75XF3P0R2PdbQR3Ry952xfvSooavoG9mYvHLFs4MMn4nfvGMUX375+9tx+Kls+2J8qhtknHrHZm7L+LZVv70OI89JvjNjOrE8+o2RHyVP2hWj8EGgJLzoUCAV5KbgxbUlxj/61VMO2NG+/s0w/PvIfuD4MZ+q7/jRj3H099fYEpe7Fv/8eIdPbOaO7/bfiK+eSbIvxmeS8N27d+D4d5+ZIZ1YHj92FMcOv4Gvf1VoX3xPOfDtq5U4/q8jAI6fiM1cOXbo1/jqmSh743u9Dv/+6n0zJI+l7P/29Tpb4xN9RCffv+OGrqKvu18jvS7+Ep+J37z/xJfiT9vHyP4bvUM7sS3jO9KaeX+e5DnJdz5/x48Z+VHypPdrIrUtIBROCC8IJAIpuBEJpOD6WDjQEuAQSG0/ICWQ2q6dCRUCyeEwiMcKKbSZWCGF1sgcWP6WrJB0+rFC0uqXBJnJCPTHCim4vqyQWp3DKbvgRjGSPyskVkicsgvuARkjBFJwjYLMJHRqIB15yoGPdzrwx40O7F/rwIdbHTi0x0LiDPAP8xxS27UjkJTatXqSU3Y6HTllp9NPxjGn7MKcsvv7Ew58tseBD7ZGYctd/dAwNhHjh8fgsvpofLCl7R1CILVdOwJJqR2B1OajZsN7rfoRSHofEkhhAOnIkw78ZVsqtt/dF9PGD0SPbqlIiItCfGwURhfF4A+Ptb1DCKS2a0cgKbUjkAgkADyHFHwcdbopu6dX9sOMCQXo39uJblmpcDmTkJQQa1wCOPLkGLy9Jvg/5H405b1OILVdOwJJqR2BRCARSCE90OmAtOrmYgwqzEK/XmmoLcnGj2cPQbeMJAIJME6W2v4dC34PKeSg8j4Qct/mOSQd2Dllp9NPvMgpuzCm7J69vx8umHIKHr/9JLy/NRNNi/uhMK/lW7uskPjFWPfk7m+dl30rExa/GKs64JADRl5l13YPdroKSS5m+OuOFHzW5IBc3NC8pA+B1HppOu/UENroBFJojfyB/MQ+AolA4p0avh9Ecqm3NHOA7F1aQCARSCf8YPoi0JJA+n7sBNIo6H4CybLX/OrICkmlX6erkLw7mUD6/jvfrJBCJ1sCKbRG3mPMY5tAUiVUTtnp/Ecg8U4N1gcg79RgXSu3Kt894fOiBl3C4kUNOv3Ei7yoIYyLGtwHr6yzQmKF5O2JYNuskJQJixWS7qCDU3Yq/VghsUKybiBWSNa1YoWk1srfgQcrJOUBByskh/Edorb+HhIrJFZI/hJToH2skJQJixWSDqSskFT6sUJihWTdQKyQrGvFCkmtlb+DDlZIygMOVkiskPwNrED7+HtIugHHCkmnH38PSasfvxgbKLdZ2c8KiRWS9SNZVkjWtWKFpNbKXwJjhaQEJiskVkj+BlagfayQdAOOFZJOP1ZIWv1YIQXKbVb2s0JihWT9SJYVknWtWCGptfKXwFghKYHJCokVkr+BFWgfKyTdgGOFpNOPFZJWP1ZIgXKblf2skFghWT+SZYVkXStWSGqt/CUwVkhKYLJCYoXkb2AF2scKSTfgWCHp9GOFpNWPFVKg3GZlPyskVkjWj2RZIVnXihWSWit/CYwVkhKYrJBYIfkbWIH2sULSDThWSDr9WCFp9WOFFCi3Wdnf6SukVx7JwfSKZJSfGoNLJsfgT5vabpivfzMM/z6yHzh+rLUu+n5x/OjHxl1wrYjWkc8hkNrev9IvBJJOPwJJqx+BpMmPnR5Imn/O+7UEUjsMtnfvwPHvPvue5OaU57GjOHb4DciUirfukdwmkLR9HIVjh37t07/AcRz/1xED+JHsT+/P4pSdsn85ZaebsvM2pGabQFKameeQ1LDl7yHpPEgg6fST/MnfQ3I4kN01ERvuOR2vPhSNfY847Gnr+uEPv/svHHhnPw4cOODR3nnrZby5Z649cbnp8fsXHvSIyz3ON/degn2PxtsX46PxeOvJy/DO26/5xrj/Lfzh1e3Y91iOffE94sDvtozCO7//LQ4ceMcnxj+8sgn7HrXRf0Z8Y7B/37M+sUk/y/7fbRljq36ij+jk7ruW9XcMXUVf28avjJPHcgyfHdj/lk+M4kvxp91jRMapr34t+UbGt636PeIw8pzkO58Y39lv5Md96/rZFqPwQTghvHA4WooZ76Wf8t3Y5fD3gPeLze3kxBj0752KUwpjUdw32p42wIWhQ/pi2LChGDZsmGcrHoShg3rYE5ebHkNPzveMyy3OoYO6o7hfvH0x9ovH0MF5GFY82DfGocUYWjQAxf1T7YtPdOzvxLChRb7xDRuGoUMKUdwvDsV9Y2yLUfpwaNEg//EViQe72xaboUu/OEMnn/EhPhxaZOhr2/g1+jfV8NmwocW+GhYPNvxp+xgZ1N03ttZxLOPbVv36Rht5blixPw8ONfJj8QCXbTEKH4QTwguTHd5Lf9yRfWEByftNue2f/tSFutAD9AA9ENgDBFKA0pGmCWwaakNt6AF6oCM8QCARSAHL544wHN+TiYweoAcCeYBAIpAIJHqAHqAHOoUHCCQasVMYMdARE/fzaJoe+P/HA+0CpPi4OGR374q8nG7Iz+1uU+uB/Lxc5OXnIy+/p1fLQ35ejk1xuelhxOcdW8u2/fFlt2jkV7985OXlIT8322YNewTo355G39vnvdY+Fo/l53l5r7V/8zu7B/ORn9vD5v7NNnzmbwzn5+e3jmGbPZiX47d/JedI/ukMHszz60HRT+Kzr4+FD8IJ4UWgg4x2AVJWRjLuvKYaq+88C4//7Exb2vrFE7Dp8QexefMWbN6y1aNt2rAGG+6/2Ja43PXY+OgdHnG5x7nhgYVYd88Y22KUz97w4BXYtGGtb4ybNmLTY/dh3aIK2+ITHdcvbcTmTeuxebNn/4qOG9csweN3j7I3vmXTsWndKl/9tmw19q9fNt3W+EQf0cndd8a66LlpvaGvu18jvS7+Ep9t3rTRJ0bxpfjT9jHywEKf2Ew9ZXxHWjPvz5M8J/nOjOnEcvMWIz9KnvR+TaS2hQ/CCeFFhwKpIDcFL64tgdyrSHO3Bc1reacGpfa8U4Pau7xTg86DvFODTj/eqaH1/AuBZM1IvLmqNZ0CHZjwXnY6/XhzVa1+vLlqoLFpZT9vrto6Icm7fVsYiKyQWCG9WqnWwEpiCvQcVkgWxmmA3+IyNeW97BwOsEKyZiRWSNZ0MgeX95IVkk4/Vkha/VgheY/JcLZZIbFCsn7EywrJulYBjlJ5DkmX8Fkh6fQTOLBCYoVkOZGxQtINOFZIOv1YIWn1Y4UUTkXk/dxOVSEdedKBgzujsG9NJlbfOgg3X9AbMyvjMKsqHjfM74Nf3DwQv13dDZ/tceBIgCNQ73/QfZtX2bXDYOMP9Fk+uHD3nrnOCknnQVZIOv3Eh6yQLFRInzc78LvV6VhxzWCMLylEXnYasjKcSE1JQlJSApypycjtnoqJJT2x+948fLQjCl88EV7nEEjh6WUm0RNLTtmpYCQ6Ekg6DxJIOv0IJAuXfUu188G2BIwfnY9MVzJiY6KQGB+N04r7YdTwQTitqC/i46IQEx2FmJho9MxJx+pb+uPgzvA6h0AKT68TIDKrUQKJQOJVdsE9IGNk/42BbiYAmZL3GVfm+IrQkhWShQrp450OzG0YitNP6Y4fzz4Fzz9YgP/Z4MD7mx14d4MDz6wsQM2YPgawEuJjMHRwLl5+2Im/P2k9yRJI1rXyO2gIJHUyYYWk8yArJJ1+rJAsVEgi0uFmB55YVog9Swrx3qZY444Ock5JHvvySYex/fKqHJw9NhexsTGIj4/DyutOxidNUZaTBIGkNDOBZNlrfoHOKTu1fgSScgzzHFLLXWhDfQ9Jpu3knJDAJ9Bg/vwJB1b8OB/OlCRERUXhknOH4E9bYwM+3/t9CKTA2npr5XebQLLsNb/6EUhq/Qgk5RgmkKwBKdAA9t6//e4+yOuRgS5dolB1Zlf84XHrHUQgWdfKW3djm0BSJ1RO2ek8SCDp9JNxzHNIFs4h+U2Afk7y7bq3APmtQJowJhfvboi2nCQIJKWZCSTLXgvkZwJJ50ECSacfgWTxHFKgAey+X6bzVt9UgCxXqjFld/XcInywjVN27hp16DqBRCDxKrvgHpAxwqvsgmvkp9Aw81an+mKsGVSg5cGd0fiP6blISIhHQnwsHr1lMD7dw4saAunV7vsJpDYPNLMvWCHpjvBZIen0Ex9yyq6dpuyee6AnzhyabcDo9OI+eOMXSWHdsYFTdkozE0gEEiuk4B5ghRRcnyDVkcDyB1Eh/f0JBz7Z3QXzGk5GujMeLmcsll8zAH/dHl6CJZDC08s8qj+xJJBUg010ZIWk8yArJJ1+4kFWSIoKSb6L9ME2B5ZfdRJ6dE2AKy0BlWd2x7ubuuHzMH99lkBSmplAIpBYIQX3ACuk4Pr8kCsk+W7SJ7sc2L2oHwp6dkNKUhxKTs/D8w/mQaqmE0fuIf5J83kEUviamdoZSwIpbM956McKSa0fKyTlGGaF1PbvIcl84sY7+mDIgB6Iju6CQX2zsO62Qhxq5t2+vRNdRLYJJHVC5ZSdLqESSDr9JE9wyi7MKTupjAQ6exfnYeTQ7nA5E1GQn4WHftIff9kaHdaFDO6JmhWS0swEEoHEKbvgHuCUXXB9QsxmdbqLGuSc0Uc7HNizqBfKRhaia0YS+vVKw6L/EBhFBb21kDt8/K0TSASS/ACdP29Eah8rJJ0HWSHp9BOfs0KyWCFJZfRpkwM77ylE0cAcJCXEom+vLCy5ciAONUfDvNlqW5MHgaQ0MyskNcwIJJ0HCSSdfgSSxTs1CIykXNt0Zz8UD8xGYnwMBhR2w8pr+hsVkzzeVhCZryOQlBoSSGoPEkg6DxJIOv0IJAtAklsCfbLbgQ2398UZQ7oh3ZmEwoJcLL5yMF5alY//2ZyO97Yk+7Q/b0s1XmcCJ9SSQFKamUAikHgOKbgHeA4puD4hCotOcQ7p090OPL2iwKiMkhJjERcXi5MHFWJOw6lYcK60YX7bVfPOwN7lgywLQCARSDyHFMIDz0Th2KFf+/nF0+M4/q8j+JZACp5vCKTg+vwQgPTuegemlqchObELunRxWG7ZXV1YehWBFKoybLfHWSGpBpv0A6fsQgAxRMLilJ1OP/EgL2oIcVHDh1sduLwhBqOKYjBisPU27oxU45yT1YTLCklpZgKJQGKFFNwDrJCC6xPigKNTTNkd2uPAnzc78PYaB95cbb29s86Bj8K4nx2BRCBxyi6EBzhlp0qoXxFIKv06BZCsVjja5xFIIZJRiKMXY7C9eweOf/eZzzmG48eO4tjhNyBTKtp+0rxeznHIuQ7guE+Mcm6EQArhAQJJ518CSaUfgdSato4f/diYW9Ukw/Z47T8/3uGTSM0d8sNfAoX2+Jw2vQen7NTa8xxSCCCGOCjiOSSdfjLueQ7J4UBifDT69UrByX1iMaQw2p52khNFp/RDcXERiouLPduQQSga0N2euNz0KBqc7xmXW5xGfH3j7Iuxb5zxheXiIYP9xDgERaf0x5B+SfbFJzqe5ERx0RA/8RWj6ORCDCm00X+F0Sjqn4XiIQP9xif75XHbxofhw1hDJ5/xIT4sGmLoa2t8/ZIMnxUX++njIYMNfw6xe4wM6O6/f4uLIePbVv3EgxLfkEF+Yiwy8qOMIbtiFD4IJ4QXjtavDHkvzQN076XDe4dse7+Y2y03l6UO1IEeoAfoAb0H/HHHYI+/Byi4XnBqSA3pAXqAHvDvAX/cIZAClJM0kX8TURfqQg/QA+3hAQKJ8OFULD1AD9ADncIDBBKN2CmM2B5HV3wPHqXTAz9sD7QLkLpEd0F8Ujzik+1riSmJSElNgdPphNOZ5tFSnalISk2yNT7RJjk12SMu9zglvoSUBNtilM+W+EQr97ha1p3G/kQb4xP9pI9b+te3j6XvE2z0n8QnfehfvzRjv90eFH1axojn+DA1FX3tHcMJrfr59q/oKv60e4xIH/qOjxY9JT479QvuQafR93b3sXBCeBHowKFdgJSWlY7ZP5mNOfeeh9lLZtnSLlu5EL/YuBpbt+/A9h07Pdq6zetx60M32RKXux7L1i73iMs9ztsevgXzl861Lcb5S+fhp4/cgfVbNvrEuGXbNjyy/hFcvOIi2+ITHa+8/wps3rYF27z6V3R8cP1DmLd0DuYssc+D1z54DR7btNZHP4lP9svj7n6I5LroIvqITu6+k3XRU3QVfSMZk/dnib/EZ+I37xjFl3c+cgfEp96vi9S2jE8Zp96xmdsyviMVS6DPkTwn+c6MyVxKXpT8KHky0Gs7er/Bh5/MhvCiQ4GUkZOBeavOw9TtEzB1V7Ut7eKn5+HAJwfw5ZEv8dVXX3m0jw59iJWv3GtLXO56PPP+sx5xucf50OvLMKOp1rYYZ+6ZjEf3/RwHDx/0ifHzLz/Hmx+8hvlPnGtbfKLjdb+6Ep9+8SmOePWv6PjaB6/g3KazMXVXjW0x/ufzV+H9Tw746CfxyX553N0PkV2vMfQRndx9J+uip+gq+kY2Js9cIf4Sn4nfvGMUX4o/xad2xSjjU8apd2zmtoxvu2IzP1fynOQ7MyZzKXlR8qPkSfO5EV9un2BwQnjRoUBy5bowd81MTGmqQOPeMlvagufn4E9H/oRjx//tU/Ud/vZTPPDfi22Jy12P5w4+5xObuWPVWysw/aka22I896mJeGz/w/jiu8/NkE4s/3HsO7z72ZuY98tptsUnOl770hX45p9f47ifWwe9eWgfznmqGo17y22L8cZXrsHBI385oZv7iuyXx939ENn1ckOf/z60zz0sY130FF1F38jG5JkrxF/iM/Gb998X332BtfsfhvjUrhhlfMo4DfQn49uu2MzPlTwn+c77T/Ki5EfJk+ZzI70UPggnhBcEEoEU1IgEkmdybMtgJZB0GhJIOv3EswSSw2EQjxVSaDOxQgqtUTAQsELS6McKKZi3rDzGCknjvzJjBo0VEmCUsJyyC24mVkjB9bGSsFgh6TRkhaTTTzzKCincCmlPORp2laNueynO3jzGaPU7ytDQVI7G5rZ3CM8htV07MTKBpNNPNCSQdBoSSDr9CKTWL5VavqhhTxmmbq7GlPsnofrWcgydPxhFcwbg7J+Nx9TVE9C4q+0XRRBIOjMTSDr9CCS9fgSSXkNWSBYqpPrdpZj081KMnTsKrp5pSOmagqSMJMSnxSPOGY/kzGSk5zoxvOF0THh4LBqawu8YAil8zSSJmo1A+l4LU5Nwl6yQdBoSSDr9xK8EkgUg1e0Yi9Gzz0TXnllI65aG3EE5GDi6PwaXDcRJZ/RFRo4LcQlxSEpLQv+RJ2HSA+Wo31l6IllaSQwEks7MBJJOP/EogaTTkEDS6UcgWZyyM4B02Y9w0vC+GHdpCcavKEH945Vo3FCNyb8Yh6rrxyK1eyqi42IQnxKP06cORe0GAskKiNvrOQSSPhkQSDoNCSSdfgSSRSAZFytsqUTjlgo07C5Dw54yNMgFDM0ty/qmUlTfVIZuvboiNj4Wg4YNxIRHSlghuU2ptRd4Ar0PgaRPBgSSTkMCSacfgWQVSJJY9wS/im7ymnEYXDIQXbp0QWJyIsqXn0EgEUgeHuD3kDQJi99DCnQwZnU/v4ek8d8P7HtIDeurMKTiZONOsK4sFyruG+GRjEKZhueQdGZhhaTTT/zJCkmnISsknX7iQV7UYOGihlAwkSm8iQ+VovC0PsbFDUVjTsGkNTyHFEq39nycQNInAwJJpyGBpNOPQApnyi7A9JPxhdj11Ti1eigSkhOQkJaAcdeNRt02Aqk9gRPqvQgkfTIgkHQaEkg6/QikcIHUXI7azWMw7v4zULHyDNTcMxrlV4xBn+EFSM1IhSvHhdHzhqNuo9y5IbzO4ZRdeHp5A4pA0uknehJIOg0JJJ1+BFKYQJrSNA5Vt4yCs3cKnL1SjC/DCoiio6OR1SMLYy8YicmPlRtX4XknzFDbBJLOzASSTj8CSa8fgaTXkOeQwjiHNGVXBcZdexZiE2O/bwkxiI6LRk6/Hhg+41Q0PlSD+l2lLZeFB5jm8wcnAklnZgJJpx+BpNePQNJrSCCFAaTG5nJM2VSBxvurjFa/qAYT/7MSp1QMQtf8rkh0JiI1OwVVPylD3ZbwOodACk8vb6gTSDr9CCS9fgSSXkMCKRwgScXTXI7GpnEtbVcF6reWY9LqUlTcMAq9i3siPike3XpnYfxdpajfab2DCCTrWnnDSLYJJJ1+BJJePwJJryGBFC6QAk3D7axA2dWjkJKejKioKAytKkbt49avtCOQdGYmkHT6EUh6/QgkvYYEUnsBaW8Zau4bhczeLkR1iULXXhmYuMh6BxFI1rVihaTTyp9+BJJeUwJJryGB1I5Aqnp4BFx90xAVHYWsvCxM/Ok4y3drIJB0ZmaFpNOPQNLrRyDpNSSQ2hFI1ctGw9UzvaVCKsjEpMUEUqCj8fbeTyDpkwG/h6TTkEDS6Sc5gUCyACS5s3f9dvnp8tabrHqfR2ouN+7MMObHZ8Lpchr3sxsw6iRMesz6Hb9ZIenMTCDp9GOFpNePQNJrSCBZAFL9rjLj8u76FeMxbWuV5zRcczmm7ahC1Y1lyB+Ya1zQkJiYiKqbx6BxNyuk9q6EAr0fgaRPBqyQdBoSSDr9WCFZuVPD7nJMeagGrvx0OHukovtJXXH62aej+vJxqLliHEpmjkHvob3g7Jpq3MsuJSMFI2edhtr1Y43fSwqUQL33s0LSmZlA0uknfiSQdBoSSDr9CCQrQGoqR8NDNRhQchIy8jKQluVEZrcspGelwdU1HRldXUjPTIOzuxO9T+2J0ZeMQP3j44wf8vOGTrBtAklnZgJJpx+BpNePQNJryCk7C1N2jbvLUbe2AjW3l6Bs3miMnDQCKdnJRjtl1MkomTYKlVeVYMJDJWjcVeE5ped9vinANoGkMzOBpNOPQNLrRyDpNSSQrABp7/c/VS73qZM2eUeJ0ep2jjW263eXtummqmbVRCDpzEwg6fQjkPT6EUh6DQkki0AywdFRSwJJZ2YCSacfgaTXj0DSa0ggCZB6uDD75zPRuLkGDdsqbWkX7J2Nt//6e3x2+BAOf/65R/vzwfex7IW70LCtwtb2xIEnPeJyj/P+lxbhnB0TbYvvnB2T8NCrK/HBJx/4xPjJZ5/gjfdexOymKbbFJ3131TOX42+ffoTDhw/7xPjie7/BtB0TWr1nTz9f++wVOPDh2z6xST/LfnncPg9WGvqITu6+M9YPHzZ0FX3ti6/C8Jf4TPzmHaP4UvwpPrUrRhmfMk69YzO3ZXzbFZv5uZLnJN+ZMZlLyYtv//VtXLD3PNtibNxcjdkPzjB44Wi9/sB7iQB/Dn/7vV9sbjsznJh8UT3qrqlH3XV1trRZN8zGbffegaXLlmPZ8hUe7WeL78bCWxeg9tqzbW3X3nmdR1zucS685RLUX1dnW3wN19Xj8tsux92L7/GJcfHSpbj9ntsw7SdTbYtP+m7WDedh0dIlfvv4prtvNnxnZx/Pv2k+7lp0p49+0s+yXx63Mz4Zm6KTu+9kXcaM6Cr62hmf+Et8Jn7zjlF8Kf4Un9oVo4xPGafesZnbMr7tis383IW3LMDPFt3tE6P0seTHGTfMtC/Gq2pRe2Gt8WOsJju8l/64I/vCAlKXLl0QlxiPuKQ425r8/HlSSjJSUlOR6tWSU5KRmJxoW2ymLonJST6xmbEmJCcadzo3nxvppdxlXTRKTknxiTElJQWioTwn0nG5f158UgIkFlMz92VSShLibfSfxCl9KDq5x2Wuy3553P3/ifS66CM6mTG5L0VX0TfSMbl/nvhLdPLXx+JL8aedHpTPlj501819XRc1gcYAABSySURBVMa3+/9jx3rLGPb1oORFyY+SJ+2I68RnJsZBeOENInO7XYBkvhmXjoBCUxtqQw/QA/RAcA8QSAHmMmmc4MahPtSHHqAH2tsDBBKBxKqOHqAH6IFO4QECiUbsFEZs7yMtvh+P3umBH54H2gVI0dHRSElNQaozFalOpy3NmeaEMy0NaQGaPNbyHHmePS1QbOZ+u2M04wi0tDu+YP0rMTO+UL4OPD5+CPq1xBjqf+zIx4PrZ3988r8Hj9HWMeJ0GhedCS8CHSy0C5CSUpNQWluKceeOQ/mMclvaxNkTMffi+Vi48FIsvPQyj3bhgoswdf5UVM6stLXNvPA8j7jc45T4qmfV2BaffPb086fjoksu9onxkoULcf7F50M0tlPDs+fUYsHChT7xiY5zLpqHqlnVqJxVZVuMDXMbcOGCC/3GJ/vlcdv0m1Vl6CM6ufvOXBddRV/b4ptZafhLfCZ+M+Myl+LL6eefa/sYkXFqxuS9lPFtp37y2RKf5Dvv2CQvzrv4fHv7eEYlyieXQ3jRoUBy5bowd81MTGlq233o2uPuDbxTg+5b3rxTg04/3qlBrx/v1KDXkHdq4K2DLN8M9rmDzwWqSLHqrRWY/lSN5fdqD4i7vweBpE8G/PkJnYYEkk4/Gc8EEoFkGSIEkm7AXfvSFfjmn1/jOI77gP3NQ/twzlPVaNxbbrk/3IHcHusEkq5/CSSdfgRS6xVqnLKzZiQCyZpOgeBAIGn0KzeA/d+H9vnAXAAvoBd9A2kfif0EkqZ/W17LCokVkuVBTCDpBhyBpNGPQNJCVabUZWo90J+Mb+1naF9PIBFIlk1IIGkSaplxBM8pu7ZqSCBpkz2B1FbvtbxOLnqTi99kRq3TXmXXsKcMjVsrcPrVJ2PowgE49T8GoWzZjzB5Z4nlRC9G41V2OrPwogadfuJBnkPSacgpO51+4kFWSMoKqX57KWpuK0NSRsu16THJsRhwTgEmbRxFIAX4uXbtkZ6/1xNI+mRAIOk0JJB0+hFI2osa9pRj4gOlyBuQg5i4GKOMI5D0pvQHnFD7CCS97gSSTkMCSacfgaQEUu1jYzGi4XQDRoNOG4iE5HgQSHpThoKPv8cJJL3uBJJOQwJJpx+B1EYgNTSXoX5bKUquGImMHJfRxsw7HSkZyQRSBKfp3MFEIOmTAYGk05BA0ulHILUVSE1lmLBsLHIH9UCyKxmj5g1HxaWjkZqVQiARSAHPHfKyb03C4lV27gdgbVnnVXYa/5UZt5brfFfZ7SlH/eZxKCofgtT0FOSdnIuGNVWovmYMgcRbBwWEkSQQAkmTEAiktkDI/TUEksZ/nRRIkzeWYszFI5DkSkKPwh6ouaEUDU3lqL6OQBLDuw+ASK5zyk432KSvOGWn05BTdjr9xIO87DuMy77rd5ah8p7RyOuXi5SMFAyfcRrqNrXce6z6egKJQAo+IFkhBdcn+AEMK6Tg+oTWlhVSaI2Cadzpvhhb92g5hlYMQXRMNPqP6IcJD37/5VcCiXf7DmZmeYxA0iQEAimUv0I9TiBp/NeZpuyay9C4qwIj5wyHM8uJtK5pqF1Ugfod3/+DBBKBFCohEEjfj5dQWvk+TiD5ahKengRSeHp5691pKqT6naWouOUsdO2TifTsdIxZMAJ1W0rRKKBqvaqMQCKQTC8EWhJI34+XQBoF3k8gBdbGmq4EkjWdAuncKYDUsLsUtY+OxaARA43zRr3OyEXjhko0NHn+cwQSgRTIyOZ+AslzzJi6WFsSSNZ0CqwxgRRYGyvadgog1T5eihHTT0NsQiwKintj0jL/P3NOIBFIoUxNIGkSAoEUyl+hHieQNP7rDOeQdo9DxS2jkJmTiS7RXXBqVRHGXzsWE24u9Wmjp52JhJQExMRHo++oXqi6djQm3zkOjT+v8qmm/BmHd/vWmYWXfev0E0/ysm+dhrzsW6efeJCXfQe77Ht7JUbOOgMxMTGIiopCYmoCnN1S/bbElAREx0YjKjoKCSnxSMlMRvfCrhh/2TjIOSh/EHLfRyDpzEwg6fQjkPT6EUh6DQmkEEAaNX8EErLiQ7a45Dh0iemCqC5RiEmOQbwrHpl9XKi8tAx1BFJIILvDuS3rBJI+GbBC0mlIIOn0k3FPIAUBknET1aZSTN45NkQrQeU1o4yqSGDUf0ovjF87EnW7xqK+KXR1JB3BCklnZgJJp594kEDSaUgg6fQjkNp4c1URzrvxogZe1ODtCe9tXtTgO268NQq8zYsaAmtjTVde1GBNp0A6d4qr7AIF572fQCKQvD3hvU0gaRICgeTtp3C3CSSN/zrDVXZ+KqFAJiCQCKRA3jD3E0iahEAgmT5q65JA0viPQIL5d/jbT42TfW01Ynu97rmDz5kh+SxXvUUghdKZQNIkBAIplL9CPU4gafz3AwPSxLtK0e2ULLj6p6HoopNQu3WMz3mmYIbhRQ06s/CiBp1+4k1e1KDTkBc16PQTD/IquyBX2QUDiPdjZ28Yg+pVZ6Li58MxccMo4wo77+cE2yaQdGYmkHT6iTcJJJ2GBJJOP/EggdROQAoGGyuPEUg6MxNIOv0IJL1+BJJeQwKJQLI8tchzSLoBx3NIGv14DsnKgW2w5/AcksZ/ETyHlJKegvEXjEfVjytReXWFLa3+J/X46ZK7cN/KlVi58n6PtmjZIlx4y/m2xOWux3V3X+8Rl3ucF996IcZfW21bjOOvrcHC2xdg8fLFPjEuv28F7lh0G2qvn2RbfKLjtBumYemKZbjPq39Fx5vvvQU111ajyib/SXwzbzoXdy/5mY9+Ep/sl8fd/RDJddFF9BGd3H0n66Kn6Cr6RjIm788Sf4nPxG/eMS5evgQLb78E4lPv10VqW8anjFPv2MxtGd+RiiXQ50iek3xnxmQuJS9KfpQ8Gei1Hb1f+CCcEF44Wr/D6r30udqrdYfD3wPeLza35V516enpcGVkICPTrpaJzEyzZSEz07NlZGbaGFuLJi3xecb1fZwSn70xBtNPHrM7Pvn8wBp2lvgC9W8W9QuZG4L3b4sH7cov8rnB4pN+t3f8tuReidGfB1tit3MMCx+EE8ILkx3eS3/ckX1hAcn7TbntCCg4taE29AA9QA/49wCBFKB0pGH8G4a6UBd6gB7oKA8QSAQSqzl6gB6gBzqFBwgkGrFTGLGjjrj4vjyapwd+OB4gkAgkAokeoAfogU7hgXYBUrIzGeV15aicUYXKWZW2tMnz6jB3wXwsvOxyXOrVLrzkIpxz/jRb4nLXY8aFs3xiM2Odev5U1JxXY1uMNeeNx4wLZuCihQt8Yrzk0ktxwYILMGnOJNviEx1r59ZCYjE1c1/OuXgeqs+rRuUs+zw4Zf4UXHTJRX7jk/3yuLsfIrteZegjOrnrZq6LrqJvZGPyzBXiL/GZvz4WX4o/xad2xSjjU8apqZn3Usa3XbGZnyt5TvKdd2ySFyU/Sp40nxvx5YwqgxPCi0BVa7sAKT3bhfNWzkDD+ho0bKqypc3fPQv73v8d/nbwID7++GOP9j9/OYBFz91hS1zuejS/3ewRl3ucK56/F9O2TLItxnO2TsIDLyzHex/+0SfGD//2IV7e/yuct2OqbfGJjj9+8jL8+a9/wkGv/hUdf73/OUzdMgENm6pti/HqJy/D2+/t89FP4pP98ri7HyK7Xm3oIzq5+07WRU/RVfSNbEyeuUL8JT4Tv3nHKL4Uf4pP7YpRxqeMU+/YzG0Z33bFZn6u5DnJd2ZM5lLyouRHyZPmcyO+XF9jcEJ40aFAcuW6MHfNTMgPMAX7pnNHPsZbB+m+Rc1bB+n0E2/zXnY6DXnrIJ1+4kHeOoi3DrIMYd46SDfgeOsgjX68dZD2gJi3DtL4L4K3DmKFZK2jCCRrOgVKHASSRj8CKZCvrO4nkDT+I5BOnB/jD/SFNhKn7EJrFCpxccpOpyGn7HT6iT85ZRfGlF1Dcxnqm0oxeWdJyCbPk+eHSgLm4zyHZF0rUzP3JYGk00+0JJB0GhJIOv3EgwRSGECq3zEONfePxhnXnxKyjf/5GDTsst5BBJJ1rdxBZK4TSDr9CCS9fgSSXkMCKQwgTXxsNAZVDEBCVnzINvaC0ajbOo4V0l69SU3oBFsSSHqdWSHpNCSQdPrJ+CaQwgBS1cqRSO+VhqguUUjvno6sXpnI6u2/lS8oRT2BZBnIwWBj5TECSZ8MCCSdhgSSTj8CqfV2G1avsht/11i4cpyIjo1G9ZXlqF1Sg9rl/lvD6vFo3F1uOSFzyk5nZgJJp58kAwJJpyGBpNOPQAoTSDU3lhuVUXRcNGqXl6NhxzjjPJGcK/JpTWVo5EUNloFspQoK9hwCSZ8MCCSdhgSSTj8CKUwgjbuyBJndMpDZPQMT144OCzjBkqk8xgpJZ2YCSaefeJBA0mlIIOn0I5DCBNKo88+EK8uFopFDcPaGknY9+ieQdGYmkHT6EUh6/QgkvYa8qCGMixpyz+qOxJREjJw0HLWbCaQT39wFsOqtFZBvgktis6MRSHrdWSHpNCSQdPqxQrJaITWXY9q2avQ8PQdJzkSMmjoCdevLMXVXJabstn5pd7BEzQpJZ2YCSaefeJNA0mlIIOn0I5CsAmlPOaatn4Cew/IQmxCLgmH5KJ48CMOmDsKwcwdhxBXDUH33WNSuKUXjLutX1rkDikDSmZlA0ulHIOn1I5D0GnLKzsqU3Z5yTFkzAQU/6oXYpFjEJMcYLTYxFvFJ8UhxpqJbzywUV5+CumUVqNtWioY94XUOgRSeXu4wl3UCSacfgaTXj0DSa0ggWQCSwKVhTQ2GnzcM/Sb1Qt/ankYbUFmI/j/qi4yuLsTExqBLdBckuhJRcfUY1G0Jr3MIpPD0IpB0ennrRyDp9SSQ9BoSSFaA1CzfMyrH5I2lmLhuNCauP6ulrR2DCY+UoGrxWRheewZSMlOML832KMjGhCUl/GJsBC9wYIWkTwY8h6TTkEDS6ScHRQSSBSD5O5r02NdcjkmrS1E06RTEJyYgJiYGp00uRu36sZavOGOFpDPzjP+ahC1/3IAj/zjifvGfsf6PY0ex/9N9mPvsVMv94dG/7QRW/h6Spo/5e0haT/L3kDT++wH+HlLlXSVwZbuMe91lFbgwcTmBpB1EVl8/8+laPP3R0/j2X9/6AOnov77By399BnOfbSCQgsCVFZIuYbFC0uknY50VUntUSK2DvObBkXD1SUNUdBSy8rIw8afWLwlnhaQzswDp2b89i6PHjvoA6et/fIUn39uK2U/XEUgEUod5gEDSjWECyepl30EGsfsRfPXDZyKjbwuQuuYTSO7adPS6AOmXf/tlACAdwRN/3EIghfAxKyRdQiWQdPoRSO0JpOYyVC8ZhfTcVGPKLmdgNs6+3/p3klgh6cxMIOn0k2RAIOk0JJB0+hFIYQDJ+F5RoLt3y0+bby/F8PnFxq2FoqOjceb0MzB5k/UOIpCsa+Wv2iKQdPoRSHr9CCS9hjyHZOEcUkNTGeoerkTDxio07vGqeuRLs1urUHLZGcjKy0RsfCxyCnKMy77ldf6Sp799BJJ1rfzpRyDp9COQ9PoRSHoNCaRQQGoqR8NjFSj4UW8UjuyNgXV9Me6aEtTcWo7qm8sxZuGZKBzTC8kZSUhKTUR6j3SUXXMWJm8utQwjSQYEks7MBJJOPwJJrx+BpNeQQAoFpN3laFg6HhkFLiQ6E5GanoruOd2Q1SPTaHKXhoTkBANIvYrzUX19GRp2lqOx2auSCnFCmUDSmZlA0ulHIOn1I5D0GhJIoYAk5422jUPF7aMxfPowDBtbhAHFAxGbEGeAqH/xSTitYijOXHAqah8px5QwQSSJgBWS3sgEkl5DXtSg05BA0ukneZBACgWkvWXGjVLrdow1fgNJfphv0roxGL/mLKNNfHw0ajeWYPK2sWjYHd40nQkjAklvZAJJryGBpNOQQNLpRyCFcZWdOzw6Yp1TdjozE0g6/cTTBJJOQwJJpx+BZAKphwtzVs1E47Yq4/yPnAOKdLvw6dl4538P4MhXR/D11197tI8OfYgVr9wd8Zi8NXj6T894xOUe54OvL8X0pgm2xTijeTKeeO8JHP7yc58YP/3if7Hr7fWY1VxnW3yi5dXPXY7P/v4pvvLqX9Hx1Q9fxrSmGjTuqrAtxut/dSXe/+SAj34Sn+yXx709Ealt0UX0EZ3cfSfroqfoKvpGKh5/nzPnial488PX8MWRL3xi/Pjzg/jFvgcwvWmibTHK+JRx6q2fuS3j29//Fcl9kuck35kxmUvJi5IfJU9GMh73zxI+CCdcPVxwtLLDe+lzm5jWHQ5/D3i/2NxO65qOc26YhsZ76tCw2J429745eHz7ejQ1N2NP816PtmXnFtzwyHW2xWZqsmLDfR5xucd50y/+E9OWTrEtxunLpmHZhhXY2bTbJ8Ydu3dg8WM/w7nLzrEtPtFwwQMXY2fTTp/4RMdVm1dh6pJGNNrkP4nvsgcvwYbt6/3GJ/vlcdMLkV6KLqLPqs0P+41PdBV9Ix2X++fNWn4u1mx5BLv2+Hpw267tuHX1LTjHxjEi41PGqfu4dV+X8e3+/9ixLnlO8p17XLIueVHyo+RJO+KSzxQ+CCeEFyY7vJf+uCP7wgKS/JZRetd0pGfb1zJzspCTn4OePXuiZ89eHi03Pw/dc7vZGp9ok52X7RGXe5zdcrsZRw52aejqkWHol98z3yfGvJ75yM7NhjzHrvjkczNyMpFv9K9vH/fIy7FVP4lP+jAvP89HP+ln2S+P26mfHJmKTu6+a1nvaegq+toZX0aPTOTm57b2secYFv2yc7vb2sein/Shr34tscr4tlM/+WzJc5LvfGPsaYxvyZO2xtg13fjtO28QmdvtAiTzzbh0BCQ/taE29AA9QA8E9wCBFGAuk8YJbhzqQ33oAXqgvT1AIBFIrOroAXqAHugUHiCQaMROYcT2PtLi+/HonR744XkgLCAlJyeDjRrQA/QAPUAPdIQHwgLSqFGjwEYN6AF6gB6gBzrCA2EBKdCTuZ8KUAEqQAWoQEcp4Pd7SB31YXxfKkAFqAAVoAKBFCCQAinD/VSAClABKhBRBf4fmP2X2HUOY1IAAAAASUVORK5CYII=[/img]
Suppose, instead, that the districts are shown in the new map below. What did the people in each district prefer? What did their representative vote? Which mascot would win the election?[br][br][img]data:image/png;base64,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[/img]
Suppose the districts are designed in yet another way, as shown in the next map. What did the people in each district prefer? What did their representative vote? Which mascot would win the election?[br][img]data:image/png;base64,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[/img]
Write a headline for the local newspaper for each of the ways of splitting the town into districts.
Which systems on the three maps of districts do you think are more fair? Are any totally unfair?