Answer to Question #166800 in Macroeconomics for mj

"Y=income\\\\\nMPs=0.1\\\\\nMPc=1-0.1=0.9\\\\\nconsumption\\ function\\ :\\\\\nC=Ca+MPC\\times Y\\\\\nC=5000+0.9Y"

"Y= Income\\\\\nSaving \\ function:\\\\\nS=-Ca+MPs\\times Y\\\\\nS=-5000+0.1Y\\\\"

"we \\ know\\ that\\ Y=C+S\\\\\nwhere\\ Y=income\\\\\nC=consumption\\\\\nS=saving\\\\\n if \\ we \\ want \\ S=0, then \\ Y \\ has \\ to\\ be \\ equal\\ to\\ C\\\\\nlet \\ us\\ replace\\ Y with \\ C\\ in \\ the\\ consumption\\ function \\ devised\\ in\\ part \\\\\none\\ above.\\\\\nwe\\ found\\ that:C=5000+0.9Y\\\\\nwe\\ can\\ replace\\ Y\\ with\\ C\\ , and\\ the\\ equation\\ will\\ be:\\\\\nC=5000+0.9C\\\\\n0.1C=5000\\\\\nC=\\frac{5000}{0.1}\\\\\nC=50,000\\\\\n\nSince\\ Y\\ was\\ to\\ be\\ equal\\ to\\ C\\ ,we\\ can\\ say\\ that\\\\\nY=I=50,000\\\\"

"We\\ are\\ given:I=6000\\\\\n and \\ Y=C+S\\\\\nor \\ at\\ the\\ equilibrium\\ level\\ S=I,we\\ can\\ also\\ write\\ it\\ as:\\\\\nY=C+I\\\\\nlets\\ substitute \\ them\\ by\\ entering \\ in \\ the\\ values\\ of\\ I\\ and\\ the \\ whole\\ C\\ \\\\\nfunction\\ in\\ place\\ of\\ C\\ above\\\\\nwe\\ get :\\\\\nY=5000+0.9Y+6000\\\\\nY-0.9Y=5000+6000\\\\\nO.1Y=\\frac{11,000}{0.1}=110,000\\\\\nY=equilibrium\\ income=110,000"

"We \\ are\\ given\\ G=4000\\\\\nand :\nY=C+I+G\\\\\nor\\ at\\ equilibrium \\ level\\\\\nS=I+G\\\\\n Y=5000+0.9Y+6000+4000\\\\\nY=15000+0.9Y\\\\\nY-0.9Y=15000\\\\\n0.1Y=15000\\\\\nY=\\frac{15000}{0.1}=150,000.\\\\"