Select [b]all[/b] the equations that represent the hanger.[br][br][img]data:image/png;base64,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[/img]

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[/img]

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[/img]

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NIEjHNjqICA0xzl3oABAwxsGxwA7H2ZMmXMnXfeaT755JOkZX3AgAUHV0GZ9NKlSwuY0GfVqlXNyJEjRa9gG5njzJF+lIcCzEvt2rXlhMbyU69ePXP55ZebK664IpRX+/btc7ha1vX06dPjcrN5yOTqv6EAArgAZP033nhDFgSbFrMgfgEoBMeNGyfyPZyA24aeAXAZNmyYOf3000XPgFWhbNmyAhDvvfeegIuKCm4pm/r9sUBw9NFHi5y+fv16EekQ68J2ffDBB3KwIaYqEMRZNwAAXMDXX39tnnrqKVOzZk0DsdioJUuWNG3atDELFy4UUYB7U238FssDshkyGgDDM/A/4DRC3GAM6nOQKoXd/S4WCNDdPPnkkwbADmtjbZ1yyinC4SoQxJll2PJ169aZm266yXAysDm5EAVwH8YkaNM7kOehLOR5cB0ojuA8eN7QoUPNli1bEuoe4ryCfpQCBRQIVDSQZcMJ/f333xvchJs0aSKnPxuSuAF8BTi58SBMRRRItC55Ln3u2rXLTJ48WUQFdAaAD0B0ySWXCAeColFFhUSUTO87BQIFAmEBN23aZIYPHy6iAOw5G7F8+fKmV69e4vwDG+/lRgQQ0EnghoySChDAAQmRASAaP368yKlhZlfT28rp/VqBIMJAwMYmEOijjz4yV111lbDmbD4cPJCbxowZY10UKGy5IiqgSLz99ttzfA4YE8DAZyiwACWAQ5s9CigQRBgIOF0xm2AFgAPApgpbjl1//vz5YtfPxobjmYgCeJ4xNoCAseG3cOGFFwrXAGBkY2z2tp6/elIgiCAQAAAo4fD04+SHA0BJh6cXnn74BngtChS2DRxu5f333zdXX321cCvoLLBxV6lSxTz88MPiyahWhcIomdz3CgQRAgJO0G+++UZOe+TwWN//s88+24wdO1bkcNseVsktxfh3AVroL7AgxMY2AFr9+vUzS5YsEd2Ccgfx6ZfspwoEEQACNgmbe/fu3WbKlCm5ogHx68bLipPXr9GAcAdwKLNnzzYNGzYUiwaiDP4N/B+LBgDHOyogJLv1c9+nQBABIGCDEOXXt29fYbGRt/HzJ/BiyJAhohAMwgYCEFAWItJgTUCc4eI9Bg4cKKKCTR+H3Fsl3P9TIAg5EHz77beiXKtbt674VqN4wzxIgAknLL4BQZKz8Tkg1wGKREdU4J3gbC6++GJJiYY/hDZ3FFAgCCEQOKIApyex3aQQI1AIrTvZgxzfADYMp2zQGqc+Ygw+B506dZJcCIgKKBJxV54wYYLElwNwQeB0/EB/BYKQAQGbBN8A3ISvvPJKCeRB2448Xbly5ZwIPxsbxHkW8jnOQJj0Cmo8D5MgHAr3s5HTBSFHVEAsQHnIO8Id8PfNN99sPv30UyvPKeidwvS5AkHIgIBTfubMmcL6H3TQQTm+Aeeff7646tpyxmFjAziPP/64aO/JRUhi0oI2N6BBBhzCmclnOGPGDCv5BxgH70zGG8QfwAAdCO/OO5Md6eeffw7TnvXkXRQIQgYEH3/8sUQIshFgl1GkkTeA9GI2fQOcDUiwEOIGEYNwIfH0DYAAHEO3bt3MCSecIBuWcdqKW6B/OAw4gB49eggX5CQ9IZU65kdtiSmgQBAyIGDDk0wCbTpAwEbAQaigkzrx8ij4W4fVHzx4sLj/UsiEPALxYgHYpOQ1IKUZOQduu+02SVDCBrbZEE1WrFghefAcrgC3ZMym2hJTQIEgZEDAhD722GPiLYi83KpVKzEdJl4GqX3LRiZLMfHrZCcmhwBcR2wDgDBd4h1I0lJchhcsWOCZEm/VqlVSZAWOgPgExCR0E9oSU0CBIGRAgM8AsjgnL0CAxYB8gF41TJC4/OKmzKZjQcU2NiGfk2sA2z85DRATvGhwKcROkIMObghvSbghbYVTQIEgZEDAZuAEvvTSSyWAiAQfo0aNEo0+39luZCtCP4BpElMlCsPYxkbEcxGdBeXQyFeYyLoQ+1s3f/NuiCDESpBDgfEggpCmWlvhFFAgCBkQMOWY6LCl42SDbb1z585yCtuWyXnWmjVrzAUXXCBZhfD4A4RobEy4AWoXoBtgLPxNiigvGu9GXr1GjRoJ6MCBvPLKK55xH168Qzb7VCAIIRCgsOPkJScbjkQnn3yypAOLp8hLd/GhkUchia8CgLNhwwbpEt0Aac3IdkQNBGICUGQiunjR6JfCFYgFvDMiEZaJeFYML54f9D4VCEIIBJyOaMo5qckvgNLs0UcfFXu77QXLCd+/f3/RR5BJCBMijQ340EMPiXMPJkxk97yKRJtjAeScPIvoIjBVUmXJC3HI5rj90pcCQQiBgMWPjR7/AUKNiS0AFIgrsG1GZAE9+OCDAjicxogKPBtAoKwZLPpll10mz/ZCN8BGol/yK1A4BeDDivH00097Cjx+2cC2xqFAEEIgYHHAFZCIlMIhsMrI6StXrrTmxOMsQLz2CG0m1Tk5DlEeAjgoDgGB6tWr51SR8ep0htN4++23zYknnij6ATwMqdKsYoEzS4X/q0AQUiBg01GLkHp2aOxhl2HPbZvu2GyYJ7FOYLIkKpDcBhQuQXt/zTXXiBKv8KWY+h2IJ5gleUe4H4KqWNheKEdTH6W/f6lAEGIgQGsP237kkUeKXf3GG2+0vikBHJKfchoDBGQbpoIRzkNwAzgZeaUgdLYWyU4xTQJ4iAVYTGyLQM6zwvqvAkFIgYAFy2bAtbdGjRqSiIRTeu3atdY3CfI5Zjv0EXgQ8jeyOu7H2PG9Egl4RzgSPBWJOMRyQRgyDlVePjOMYKBAEGIgYMHi0NOuXTuJPcCMN2nSJOvReIggTjp0FIQEIQE+y5Yts/6svJsQUYeS7PhLoAuhZDv+BNrcUUCBIORAQOw/8fpsEi42LBl+bDa8CXkGCkPcmtEX8H8cm7w+mSmX1rZtWwE6RKAnnnhCPAxtvl8U+lIgCDkQYF8nuSe+BLDOnNhk/rXZOJUpmMpGBAjwJ2CDZkJrT76BU089VXQgOE5hGVH9gPvZVSAIORCwKVCmEYBD0g7yAVDp1uZmwXEHEyJWApR1RD+iqLT5jLxLG04DkEMZipkSAMJCwbtqc08BBYKQAwFLAvPaAw88ICc2JjYyBBGgY8O8hjMPCUGojkTfJBDFqchrkQCQwV+BIqlEPvJswAhRSJt7CigQRAAIcPpZunRpjsMN0YJo+m2w7ugBcB5CLEA3ALcByHjdAKBFixaZatWqSaQh/yIWeBFP4fW7+KF/BYIIAAGbBgUhAUCcntj7n3/++bQ3LKc+noSY7NA/4N+fqbRguDHjRMS7YDFo3bq1lFb3Uhzxw4b1agwKBBEAAkee7tOnj4QDw0aTzgyRwQ0LD6Cw0bjYiGQDatasmcjouDJjz88EN4BIg6WC+Akcl/BfGDlypCRT9WqjhL1fBYIIAAGLmM3zzDPPSNFTPPDQtBOqnKzXH5sfawPFRwcNGiQlyrEOkKKMQqojRowQ+TwTJzLsP7kJEQdQgOLBiFsz4KQtNQooEEQECNigsO2YD/EnIFEI8fvJVgWCG5g8ebJsOvz5uXBQwmQHOMBdcE8mGnoJkpzgt4CoQz4ElIQ2lJ+ZGL8fn6FAEBEgQARg05PKi02MTI8LcLLORQDJ6tWrhRugcAr6ACoUczLbUDq62RxkQerYsaOAAIAGNwIIuRFz3DwvCvcqEEQECFjMnJik7yL1OOnOKQBC3oBkNhD3wJJzGu/atUtMd/zNZ8n83tZmQpTBdRl/CHwHzjjjDAlsyuQYbL2Ln/pRIIgQELDwONWx+QMEaNypEBQk2ZrqSqNHjxYlIUBAkla8GLWlRwEFgogBAU44iAdsIuRrMv0i3welIRZ07dpVRBvMhsOHD8+XQj0o7+KncSoQRAwIyObjuAOT+5+QYUKTg9JwIqJIChwNuRDJTJQpJWVQaJTKOBUIIgYE6AnQC5C6DOsBxUnIKuT3hg4A/cC4cePEgxFlJwpDSr+rfiD92VMgiBgQsGRQ9l133XViPcAER8gwSr9M+ACkumQZG8FNBBaR9ASxBl2B1jVMlaK5f6dAEEEgwIxIqTKcgXDIadmypYBDss5FuZdQZv4HJ0OdAhKeUMUIsQAxwcsU6Zl5M388RYEggkCA3Z9CJGT7xcuQfIPEDBCc5NfGmCndRqZkwIuwahyk1InIzowpEEQQCGCziQlA+45ogIfgXXfdZT3DsZ0l+v/l0xhvp06dJMoRJyJnvKofsENlBYIIAgFLBzFgzJgxwmIjbxNBCJfgRw083AA5DyhjxljhYObPn6/lzu1ggPSiQBBRIIClJnqQ4CNkbrIAU5/AjzI3TkRz5syRKEPEAmo14BrtZ52GxT2aka4UCCIKBLDUBOqQzJTNBRhQHzFvWfOMrMJCHoKV44YbbpC8A6RDu+eeezLu2lzIEAP/tQJBRIGAlQvLTUYh4vlxLsJdF+ciFoVfLuIZSH1GqDFgRd6Dl156ydemziCiggJBhIEAroAcA3jqFS1aVBx12rdvb3r06OGbizoFmDeJmASsiJMAGLTZpYACQYSBgKW0detWcdLBZRcwKFKkiC8vxoYnJHESfhRf7G7LzPemQBBxIEARN3bs2JwTlw2X7pUXTNLtj98DVNRmePHFFwMVLZn5LZ3aExUIIg4EmAuJSKQICiHJyN+pXsQskAsRF2AHDMhsTIRjqn06v2Ns8+bNy1g6tNS2U3B/pUAQcSBg6WJKJNaAoiR4F6Z6odi79957xenHAYJKlSqZqVOnptxn7FgYo3oSegM2CgQKBFZWFopHNiol0fFWdICAKMeZM2daeYZ24h0FFAgUCKysLgUCK2TMWicKBAoEVhafAoEVMmatEwUCBQIri0+BwAoZs9aJAoECgZXFp0BghYxZ60SBQIHAyuJTILBCxqx1okCgQGBl8SkQWCFj1jpRIFAgsLL4FAiskDFrnSgQKBBYWXwKBFbImLVOFAgUCKwsPgUCK2TMWicKBAoEVhafAoEVMmatEwUCBQIri0+BwAoZs9aJAoECgZXFp0BghYxZ60SBQIHAyuJzgGDo0KH5go6CUFLNChEC3IkCgQKBleULEJABmTDk4sWL50Qfknr8mWee0RyDVqjsXScKBAoEaa8ukpvs3bvXvPDCC1IfgZRiThgyuQbbtGlj3nnnHUmIqvkE0ia3Jx0oECgQpLWwyEGwbds2M3HiRHPKKadIdqJixYpJcpIjjjhCMg8fdthhplatWgIUO3bs0FRjaVHcmx8rECgQpLyyON0//PBDc+2110oNxX322UcyDZOV6O677za9e/c25cqVM3zORdr0AQMGSClzP1deTpkgAf6hAoECgevl69ROJPMQZcgoOkJyUXIVNm7cWComUTyFXIjPP/+8FCyFS9h///1FkXjhhReaBQsWGBKnKiC4Jr8nP1AgUCBwtbDIa0gdwkGDBpmTTz5Zqg+hE6hQoYK59dZbzYoVKwxl12koENEdoB/o2bOncAdUX0ZvcMYZZ5iRI0eaLVu2qKjgaga8uVmBQIEgqZXFyc1iWb58uVQlhgvghEcPQP1EyqXBAcSrR0hFJcqWUaqMHIboDOAgjjnmGBErPvjgA6nOrIrEpKbCk5sUCBQICl1YjigwefJkU6dOHQEAag1wunfs2NG8/fbbkl0YDiBRAxBmzZplmjZtahAVnD4QJyhySunzwvpI1L9+lzoFFAgUCBKuHjbv+vXrTd++fXNYe0QBqifff//9ZtOmTZKqPJkNzD34GmzcuFHECJSH1DOkCCuiBf35tTR7QiKF4EsFAgWCuMuYTbtnzx45wS+55BJTqlQp4QSOPPJI06RJE6lVkKop8LfffhOT4+OPP27q1asn4oUjKnTt2lU4DPQMKirEnRpPPlQgUCDItbAAAHwDtm/fbsaMGSPVhxEB0Adwgnfu3Fn0BGzmZLiAXJ3H/IffonhErGjevLk56qij5BnoD0477TTxOdi5c6eMJeZn+qdHFFAgUCDIWVpsTkSB1atXG6oQU6gE+zaTLDEAACAASURBVD/y/PHHHy9afriAdAAg52H/+wP9A5aDgQMHSjVmKh7DHcCB3HnnnSIqKGeQl2r2/69AoEAgq4rN7bgJn3XWWTlFUREFzj//fLNw4UIRFeJZBdJdloAPfgf4HCAqOFYFng238Prrr4seQn0O0qV0wb9XIFAgEBb9s88+E29AfANwDOJkPumkk6QMORwCNQi93IgAEXoBAKdXr17CHcCJ4HNQu3Zt8/DDD4tiEnFCm30KKBBEGAjY2HAB+AZ06NBBRAFn8xE3gLkQXUEmWXMCmIhduO+++0yVKlWEO2BMiCn9+vUz+BywaG2KJ/a3VfB6TAUIWBfok7AEFXYB4Nxva97oh/7ol8stp/r111/nxMZUrFjRTJ8eUSAABJg8goXw8nPiAXAQat++vVm8eHFWFXWIC5Rqx8cAcyU+B3ApjRo1khLrKCu95FCCt5XTG7FbIID2cIkoe2fPnp3wwkcE71LWm41DBRDgwGAzv/nmm+att94yKJbdrAcFAmNkg+MbQFAQ/gBYBVDQkTsA12F8A0BZN4RNbxnm/zWTzULDnRlOAIsFlgvH52Dw4MHmiy++UPfk/KRL6RO3QOBwbuh08BBNdJUtW1bC0zdv3mzlcCFGZdGiRaZu3bqmfPnyEu/y0ksvueIKIg0EbOyvvvrKvPzyy6ZVq1amdOnSctriLoy339SpUw1WAbdsVkorL8kfcfKz4TFlMvEkPcEJCWC48sorzRtvvCFKTFssZ5LDCt1tboGAeUF3RKQp4Mxmr1y5sohziHSxF3qnCy64QEQ+fpdqY/2yPidMmGBQaDtK5RNOOEHWLlxksi2SQMAmgUhsqLFjx0psAHI3G6pMmTLmqquuMh9//LGwbn7cUCwAOBTYwIsuukhOH7gDOBlOJFKhwRryjn4cf7KLM5v3uQUCdAOvvPKKYRMeffTRZvz48ebdd98VfRM6p9iLQDTC1VN1EmNOARA4in//+9+mWrVqojPi2YiNCgRJrByHiLj1suFRujnyNmhOBCAoG5TGYsDnAD8DdAboNjiNbrrpJvFHUDBIbSbdAgHAjIIN/xLWEWHlbk5kN6OEQ/3oo49M27ZtZd7hZHv06GFGjBghnKECQRLUxD6P/FSjRg1hqzlJYa/PO+88UbLwvZ9EgcJeicUGWzd37lwJgMK8yDsh3qBYdFKiFdaPfp+bAm6BAMUfsSGAMKy/lzEizHf//v1FlEXkGDVqlMSrTJkyRXRcCgS55zLnf3ABbJh169aJ8g8QgIVCFMBUQt4A5Dui/bKpEMwZsMs/GDMLEY01eQ4IWAIM8H8gJRpcztatW1VUcEFXt0DA2nG8QQlDR+y0YRGIN2TmGrHjsssuE6czOFie73AkCgRxqOYkEl25cqX4BqDNZZOgWKlZs6Z54oknRBSwIUvzLAKTmJjdu3cLZ1FQv3zOhJKzgPvxX0h34QAIuCc/+OCDoqgCCBy9R58+fXJ8DtJ9Thwyh+4jt0CA5v6aa64RHROKZ+bUSzo75kJ0EzQsSjNmzBDRRIEgznJkgz311FOy6dkU6APwDSCC8L333hMCxvmZ64/Y2CwG5DR0D7fffrts8oI4DCYSZR8my6uvvtpMmzbN2lgAmPnz54u4A+ChN+Ddzz33XIme5HttiSngFghQ/HFCY71hbTnKWubZuQAG1kNBh0PiESX+VoEgMX3M2rVrxVTDRkCZhihAZiA8BG36BjC5LAaUdNhyYclR6MRTGLEg4Bwuv/xyuRdNPy7N8e4t5PXifs1iY2EgDtx4441ySgAGmLV4Jn4R2hJTwC0QcODg+o3SFo6AkPL//Oc/5rrrrpPcFQ888ICYqbEWfPvtt9bBQIEg8XyKiaVbt24CAogE2NpxymEz2kRm+oJNo6AJ4gdxCchxgE3eBueAlyCgRFZjZEs+s81KchK9//77EiQFJwQQkE0Z3wltiSngFgi4H1s+Vii4MOYVCwL/Os5F6G7gytBJLVu2TNaLrTWoQJB4PuWUBp2Rl/EVwO6OHO1FYyM/++yzornFljxv3jxR4sQ+i3t4PnkMEFGwVixZssQqKMU+D/s11gM4Ahbkiy++aMWbLfYZYfzbLRDADRIIVr9+fbFI4ex16aWXSj5LOARySuCpioWKXBOID46vig36KRAUQkVOxaVLl8rmBAhOP/10CeMt5Gcpf40fedWqVc0hhxwijj0sqNjGhGHmgYUkrJjFk/ee2PvT+RsRgfJqcCeIRWeffbb55JNP0ukyMr91CwSc7Kw1dANwXLHcHfOAOIDehpyWmHZx/iKGBX8WG1yBAkEhSxMiow/gBIZl41R85JFHZNJsTEDex+PzDYuIToJNjvUgtqE3aN26tZgvqWfAxoxdNLH3pvM374a4gY7AcUNGLECbra1wCrgFAnqE5swlV961BRggJqILwhEIDhVHIDT9mP7SbQoESVAQRc7TTz8thGcCQGUQGgS33VBOIn6gj8DpA3syjYXBZCGmoBtAdIAzQGnoRWMxoixs2LChnD4AIE5HXnEfXrxDNvtMBQiSGS96JGJbcDzClwUlog2djQJBEtSH+JzEOHrAkuGNhXzm2GCT6CLpW3D5JeEoQNCpUyfxMOPHbEwiHFEWISO2aNFCdAVegBHPwzuSIqxOEAxp1+E+bFkmkiZIQG/0Cgg4EHBsc9LgX3/99RJ8lC6ZFAiSoCCbELfMli1bingAS+aVbI6L8i233CKKyQYNGsikM0SCRLAooEVGacSp4KU9HzaUlOu8KzIpWY7ggrQlRwGvgICnIx6wNtBZYV6Ec0u3KRAkQUFQmI3ouICiK2jWrJnr5A1JPEqsFMOHDxfAQQRYs2aNcB7Yj/EtYGNiwgSYvOQGUEKhHERpSY4F3E9ZLNqSo4BXQMBaRHysXr266JHII5FXj5TcCHPfpUCQmx4F/g+uAE8+QjaRzWCZMa2lEw8e72FMCJp6rAI4FuH/T3kzAlIQCXBrdpJGsCi8aHAa5CXAbo0ohCkLsUTFguSp7RUQYGZET8RaQImL1ytKXac5hxbPZx6TPSwUCBwKFvIvBGZDorHHsQYbPhvWNrvMZmPzowziQiuM8wiBTjib4PPvteYe5ROZlXhHohF5JgsLMNSWHAXcAAGbFYU0imGUv4hlsbRm7aGz4R7WBpwhXCmHAsFusdGuWBCwPHFwsD5ZK8mAgQJBcvMqd6EcxHToxO4jQ9uQz2KHwKSjDMJ2DxCMGzfODBkyRDYkTiWEBcdOfOxvbf2NCzGOSnADcCUkXcV8pS15CrgBAk50HMmINaD4LTEsiH6sNw4GNil6gdGjR4uSEMsVuiLS1ec9iDg0MD+TKg+xjqA4xlJYUyAojEIx37MZQGQ2JJ52WBFwwbW9SfAcpAwaAShXXHGF5KfjBBg6dKjoJQALrxoLDxEIEMJyASCwMLW5o4BbICAjESZauD7+RS+DGIr5FjGU+eA7ODQ+RzyAe8h72pPliHWJSzhgAGcAqBTWFAgKo1Ce74kzwPUTIjMxIK5t7T3eZUQUIgcSiMKpTGbkVatWxY09yDPEtP7LCUNQFacOupBrr73WinkqrUEF8MdugADwxTyN8xYbn1L3AAGAQOo7Tn9Cg1He4ltClmMUhLHig0MiJ0iO3xKrQN7MWB2Cc1/ef9F1vfbaa2KeJrM1f7vhPAEbUvazblByhz6dOSgMqw7bzEbp0qWLeB7mJWw6/4eoaIMBGkxEnAY4jiAjeskNMGZ8BdCDOEA3adIk60CXDm2C8ls3QMA7sakBYUQAXIk5YMgniDcn4ijmYixHrI1EG5RDCZd4ytuRoBav2LxcQzwa8nxM1/jHcJHnwg2nGzkgADkpGQbiwjqjUaeakM3GhsdrkFgCXI3JiIzczsnhZQNkOG1AdmILHNHHa/Dx8p2y1bdbIMjWOG09N3JAwKZAhoeFw3oA+4V85wY9CyM+XMeTTz4pjjyIBWRKBoC83JD0jbYamRJlKACEWGBbGVrYu4flewWCCFQ6goXCs5ATGxMbWYKQw+LJbG4XNmwfrBlAg52YABP+73UDyDCP4j0JwOFNiCYbUNLmngIKBBEAAjSsOBOhFEFXgEIPTzwbzkWwWFgH2IhwG9iCbSsj4y1rAAiLCHEU6D7wXMMi4kU8Rbznh+0zBYIIAAHKF05PSoyjJUWzS87AdMJBYc3pF48+Uo+hJIQ19yoJSt6Nx4bHiYh3wUTVrl070Ux7KY7kHUOY/q9AEAEgYHNw+hP5he8/LDyRgnjkudk4nMKIE7DlyOd4hGG3R0bHk5BUZXAfXjfGgJYYYAME8F/AeSUZs5PXYwtq/woEEQACFiebB1spzh6IB2jaCRBKVrPP76k6e8cdd4gLb/fu3UXEIM8AdmTMR5iTbCohC9pUgBAmJ8QC3gVrAeXSbYg6BT0z7J8rEEQECNigsO3kB0Cm5hQnnx9BIck0xACSnbDpUDpywZZjjsRrDIVkMvbfZJ5V2D0oBHkmY0DUIZ06nwFW2lKjgAJBRIAAEQDWmfoDWA7wKXCTygsgwRqAswhlyvEqwwGEkziRw0hqyzLxrwh2IRkm1gI4kscee0xAyI2Yk/gJ0ftWgSAiQMDS5sQkrTjiAZ54ZPtlcye7gRAjABNOXy7+5rNkf29jewE6ZEHGQoGCksg2FJaZHION9/BbHwoEEQICFh++3djeAQKUbDNnzgyUyQ1Rhog3lIQ4EcWmR/Pb5grSeBQIIgYEBH8gHrCJCPskKMRGxphMLXo8B6lehGgDGFByLVk9R6bGGMTnKBBEDAgw7+FDgKIN/3zMfzjiBKWR3wC/BTgaciFiwsyUkjIoNEplnAoEEQMC9ARE7OGJh+mtcuXK4pqbyuLJ5G/QAaCPwF+AACr0A0RS2iqYkcl38eOzFAgiBgQsQpxxKF6K9QDOAN8AbPOZ8AFIdRMwNkyUJELFZMhF8JSNHPmpjilMv1MgiCAQoO0nkQN5AzDBUXOA5CKZNgO62Uiw/+S7wxEK/QaJL7AeZMKT0c04g3qvAkEEgQAWG5aaApaIB2T/Jd2XnzcVXoP4MJAJB/BCt4GDlDoR2YEeBYIIAgHyNhGCpBcjqxAXpavzJpa0s8TS7wWxAMtAhw4dJMqRlGgEHGUiA1L6ow9GDwoEEQQCliasNhmH4QYwI5JJ9vPPP/elBh4OhkzJVHaGGyBjMtYD9Bra7FBAgSCiQMApS9ARmwuZG30BKc3SCU22syTz9wI3QFwE1gKAgByFKDzVbJifVql+okAQUSBAPMBNmChCOALAgCxGbDC+89NF0QuKlpAiHSsH6cnQGTBGbXYooEAQUSBg+WAloAQV3ADORQTyrFy5UjLPknnIDxfmQYpgVK1aVcAK/4dZs2YpCNjZ/zm9KBBEGAg4USkGQqVaCkwQyUex1Pbt2/vmIvMQFgK4AcDqoosukjTZOStY/7BCAQWCCAMBK4iQXkqIs8kAgyJFivjyYmyYOnF+glPRZpcCCgQRBwKUg6QixySHroDNlupFwpO8gEKpNQKEUu3T+R1jw4dgzpw5monILgZIbwoEEQcCHHJw3cUcR1w/VWtSubA4sElRPsLGO5wF5a8GDhyYUp+x42BsFGZR3wEPUMAYKTxKdmvmjjnjcAhzRmi4ykiVPEtm2WBKRAvPxGObT/Vik957772i2XeAgCQoRDum2qfzO8bGGNWTMJkZdX+PcgQR5wjcL5n4v0DxyGYdNmyYeCo6QEBiU5KfaPM3BRQIFAisrFAFAitkzFonCgQKBFYWnwKBFTJmrRMFAgUCK4tPgcAKGbPWiQKBAoGVxadAYIWMWetEgUCBwMriUyCwQsasdaJAoEBgZfEpEFghY9Y6USBQILCy+BQIrJAxa50oECgQWFl8CgRWyJi1ThQIFAisLD4FAitkzFonCgQKBFYWnwKBFTJmrRMFAgUCK4tPgcAKGbPWiQKBAoGVxadAYIWMWetEgUCBwMric4Bg6NChuYKOKKn23HPPWXmGduIdBRQIFAisrC6AgFoJgwcPNsWLF8/JR0BFIvIiEuqszb8UUCBQIEh7dZJWnIzITz/9tKlVq5YkGXXCkKlRSB5ESqxRQEXzCaRNbk86UCBQIEhrYVEmjcIolCMj0zApxUhZRg2CUqVKyd+AQc2aNc2kSZPM5s2btTBJWhT35scKBAoEKa0sRAEyBq1YscJ07dpVchLuu+++svFJAfXQQw+ZAQMGmBNPPFFKmJO7kCzJvXv3Nh999JGUOKcPbf6ggAKBAoHrlQh7z8Ihr12NGjUkzx0gcPjhh0sVosWLF0utQsSFV1991TRv3lzEBRKbUoq9UaNGZvbs2dKH6g5ck9+THygQKBC4WliIApzoN954o8Ei4GQ+ph4h+Qo/+OCDnLJpnPiUK6NAyS233CJ1FilZhqhAoRLu37BhQ6iTZLoibhZvViBQIEhq+XFyk+2Y8ulURMIyQJpySpCdffbZZvz48YaqRPHqEVJRaffu3VJSjVqLcAVwEKVLlzZXXnmlFFlhIaoiMamp8OQmBQIFgoQLi1PdsQr897//NaeddpoAgCMKUFqdakls4sJkfgCBFOWtWrUSToI+qFtAJeYZM2aI5SEekCQcoH5phQIKBAoECRcSCsEPP/zQXHXVVaLso1gqVgFEgZEjR5pt27YJa18YCPAQ7iHTMdWV8DcoX7686A7or0yZMub222+X8ucAhrbMUkCBQIEg7opj08LqP/vss+IHgAiAKIBJkPqDKPuonPz777/H/X2iD/nNzp07pW/qGpYoUUJEBaottWnTxsydO1cUiSoqJKKi3e8UCBQIcq0oAACFIEq8Bx98UBSCsO/FihUzeAli/lu9enXa5j+eQ/GSJUuWmA4dOkhFZp6BIhHzIxaJLVu2yD3cq81bCigQKBDkrDAUgoDAu+++ay677DI5qTH5oemvUqWKmTBhgnABNjcmz0S8wO8AoHHqJ8KB9OvXz3z88cdJix45L6J/uKaAAoECgSwaNjdWgcmTJ5szzjgjR5kHu05p8uXLlwu77oUyjz5ZiPgcNGnSJMeqQB2+c88917zwwgsSx6A+B673d9I/UCBQIBAugJOXE5hahfgGoA+gXNmQIUPkVIaN93IjAkRUZl65cqW5+eabpfIxiklEBZyWKKSKKzMcizb7FFAgiDAQoIyjKiy+ARdffLH4BLD5UN45Jr1du3Zl1L4Pd4AiccSIEcKZ4HOA7gBR4ZprrhFTJR6LNsUT+9sqeD0qEEQQCNhEbDiiAR999FE5cYkFQB+AVQBTISczpsNsNSwLlGpv2bKluC7jc8D4AKipU6eaH374Qd5BAcHODCkQRBAIYPPxDcCr79hjj82JAyB6cPjw4Wb79u1pWwXSXZ5scHwONm3aZO68807xOUBcgWMpW7asuCxj2cgmWKX7jn76vQJBhIAAGR9Wf9q0aRL4U7JkSdlY/Ito8PLLL4tVwAuFYKqLHs5gx44d5plnnjENGjQQsQUwwD0ZV2f8GRBvlDNIlcL//zsFgggAAQDAyfnZZ5+Jme7kk08WZSD+AZjsrrvuOvPpp5+KIs6PG4rxw8UsWrTIXH755aJIhDtg/GeeeaaYNfE54B39OP70tmhmfq1AEHIgYBORQoyIQRx3ULqhD+BUxXFn4sSJwgVkZrml/xTH5wDxAJ8DdAckQenRo4cAndfWjfTfwJ89KBCEHAiI+iOFGCHDmOJQuAEGKOFwHGIBBMmVF7Fl7969okhs2LCh+BzwTvgcoEhEVEAJqs0dBRQIQggEsMfI1uQGIG8A/gBwAJygeAjiG7Bu3brAOunA5eBPgJMTPgcEQCEq4AEJl0OeA5SMKiokDwYKBCEDAiL3UJ699dZbEu6LUg07PPkDyBswZcoUURjakKU5nVE+bty4USIKAZ+C+uVzkpQgy3M/nEq6nAiAQCTjY489Zpw8BwAeokK3bt2E49GEqcmBgQJByIAAZ5vHH39cEomyKWCbsQpcccUV5v3337eWOJSNjS2fOgbt27cXr0Qcgdic8RoANWfOHMlvSBwDVgDkeRsNHQjp0S644AIRe3hnwK927dqS5wCPRW2JKaBAEDIgWLNmjTn//POFVUaRVq1aNfENIKQYVrmgjZp4meT/1jnhb7rpJrHrcyIjisAV5G2OByOAgZIPzmT9+vVx783722T+zzvxbnAnd999t6lYsaIoRBGFOnXqJBxIMv1E+R4FgpABwdatW0337t2FE0BuJoMQm84WADibBSDA4ef+++8XVpxsxSgf453yiAT4KFSoUEFMf/yGU9r2mAAcgBDOAMsIMRP33HOPBFM549Z/41NAgSBkQAC7/sQTT4hbLuwxmwKZ3IvGRp4+fbp4/aGLoIhJXjaczcnz4QaIG2jatKkkMwVIvGikTSPZCdwQXpNYEeAWtCWmgAJByIAABR5xAscff7xYCigsQsYfrzYeocM4KKGxBxQw7cU2gIHEpugpiGNAsQeH4EUDdCivhpMU3BDmRRyltBVOAQWCkAEBGx6XXAKHsK1TVIRMQyjrvAADvP3q168vyjmSi5C+LLatXbtWUpshr+MSjHejbZGA5/FuAAxektRX4HnkRUSBqa1wCigQhAwImHImldMZEMCJCLacpCNexBAQvEScAifwDTfcIOY8xsDGRJtPglNOaJKTUhXZK2cfuAFMk8Qj4HqMUvL111/3jPsofGsF6w4FghACAUo8HIZIPc6mwKGIPIPxFHnpLleUk0QxAgSXXnqpKCbpk41JshMsBGQ5at26tYCEF2DE87BWAH44FyGm4GUI96EZkZObYQWCEAIBmxAOgM0Hm4wiD3t/Xvk9uSWS+C6ec+utt4o+gk3P5ocbAHQw5ZUrV07MefPmzfMsuxDPw9OwZ8+eAjq4UCMieMV9JKZIML9VIAghELAUOSFxtYVFRjxo3Lix5BmwLZ8jl1MJGcDhNMZ8B0cCBwJHAggREOSlhx+nPibSevXqCTdAvQTyHGpas+RBSYEgpEAAV7Bw4ULR6KM4Y5NiWmOT2mxsNjIGYRFgA5L2DGXlv//9b/mMRKh4FCIScHJ70bBMwHHwfEQhOBNMlvGcm7x4fhj6VCAIKRCw6dDgoyjEsYYTe9KkSVJWzObC5TQmpRicBxdyOu6+mBQBBzwPvdbcE7dAFiP8FLhQWsKp2OZ+bNLNb30pEIQUCFhonP7Y7VHW4X+PDL1582araxDA+eSTT0QPABCMGTNGdAMAT506daSAiVcKQl6E53P6Y8KE88F7kcAqBQF306xAEGIgYJMsWLBAsvjgcksp8hUrVljfJFgOmjdvLp58nTt3Fo09PgzoDuBKGIdXDa9BPBoxT2K5QBdCeLI2dxRQIAgxELAUqAVA4A0ut2jTR48enc8N2N2SyX83rD/xDXAeBB9hKYAbIAjJtk4i79OJtrzrrrtESYh+AGsBOgpt7iigQBByIEBbj+kQ2zqsM6BADL/NRv4DLBS4ERPfcNxxxwk3wOLykhvgHTBXkm0JoAOIEAtwZNLmjgIKBCEHAlhnkpTAOjsx+m+//ba7VVLI3fgnkF8AjoNT+cILLzSIC1478wAyRDUSao0OBAsFLs1eg08h5Ajk1woEIQcCNgUcQLNmzcR6wGlN4hKbyjTY83HjxkmqcdyJSYgKCHi5Iekb0yXxBHAiJGG5/vrrrXM7gdzVKQxagSDkQMCaYKOOGjVKNgzafBx8MK/ha5BuY8OjC8CZh3RoHTt2FNfedPst7PeMHV1AixYthAsBDGbOnKnehIURroDvFQgiAAS4+65atUpiDmDdYaFRItqI08cqQPIPQIDMQAQWZcKjDwAiqIg4CnQfp556qogFNt6pgL0S6o8VCCIABNjxcbohSQnuxiTsoPw5SUzctFhWn7/ZdOQjqFWrlpzKZEy2rYgsaHxYI3Ai4l1wIoITIR1b7BgL+q1+np8CCgQRAAI2B+62/fv3l9BkNg4eh25t/PQBqKBf4NTHfk+UH0pCKg7ho+BFhGPeZYtYgMmySZMmknMBRShZmfJmR8r7O/1/wRRQIIgAEDD9bB4CcSh0AiuNpp2sxsmy0vyejd+rVy+pmNSmTRtxUCKoiL6wGmA9sKmELGjZAjZLliwxlSpVEk6E4CbCrpN9l4L6jfLnsUDAQdGlSxcpj0d5+jBe9913n+TaxJKGSItrvG0rVxE/Lig2KGw7pyh6Ak5x5HkWQDINToDgIhyGsNdz4c5LDkLEDC+jC/OOz1F+8g54MOLMlMnn5x1PGP4fCwR4aEJX5higD+Pl+LzgcRspIEA8gHUmKrBEiRLijnvbbbdJaHIyCxkgIdQX0yCefAMHDhRgICegbSRNNB7eg0xEOBHhJIWOYOzYsZ5GNyYaT1i+w4p0zjnniOhIkFqULqpjwS3bXse+5AhYsGxm2HvKnuGJR1ovUo0lq2CDK4AtR8kIqPA3nyX7exubBj0F0Y74Q3By4cqMg1Qmx2DjPfzWB2IV/iWkmh80aFCkLkQfPFRti7W+BQIWHxufzEUAAaXBpk2blhEFn62F7yRCgXXFiahr167WIyptjTVI/bAJoC0Zp7C+ROlCrORQs32Y+BoImGBYexSGsNb9+vXLl3nYzwuY4qaUTIMbwHeBMGu3ZlA/v5+OLTwU8DUQYPZDSUjSEPzzEQ+CErYLYhM3QU1DOBqsBmRdwqKhTSngNwr4GghgAcnu62Q4JoUZEXt+b4AA+gHSo5OmHbMPFY/hEGyzdH6nhY4vGBTwNRBAQrwMsRhgL8aCQBZiOAXbyhKb08XYCHcm8QkabTwkMVvymTalgB8p4HsgQKaeP3++aN7RE+ALsH37dl8n+8Q6gQhDliWUhE4yVpQ82pQCfqSA74EAeym5C9EPAATUSaQ+op8TemDeonQb2Y/gCHCMwkFK9QN+3AI6JijgeyBApkYUIJkpSkO8rMj8ixnFjw2xAPfltm3biqUATzdcRJP1ivTjO+mYwk8B3wMBUwCrFaNdRwAAAf5JREFUjZcgiUTgCnDMIRuxbe8qG9MNN4D/A5WdGSsuoe+++67n+RBtjF37iC4FAgEEnLJsLkKI8SnAVRfxwI8RfJz8M2bMyHF/bdeunSg8ATNtSgG/UiAQQIB4gCjQu3dvCTBBATds2DAJ7wUk/HKhA0CRSVYlLAWIMZRfh0tQs6Fft4COCwoEAggYKCcqEYX47eOgQyAPDjq7du3yzUU6MmozED6N70CNGjWkhJqCgG42v1MgMEDAZsIk17BhQ1O0aFE5bevWrSsaebTyfrgoWEJqNSwFeEK2atVKAkT8vgh0fEqBwAABU7Vt2zbTp08f8d0HDIoUKeLLi7GhKCSMmsAYbUoBv1MgUEBAxBnx/MjfiAd+BQISSGA2nD17tmYi8vsO0PEJBQIFBDpnSgGlgDcUUCDwhq7aq1IgUBRQIAjUdOlglQLeUECBwBu6aq9KgUBRQIEgUNOlg1UKeEMBBQJv6Kq9KgUCRQEFgkBNlw5WKeANBRQIvKGr9qoUCBQFFAgCNV06WKWANxRQIPCGrtqrUiBQFFAgCNR06WCVAt5QQIHAG7pqr0qBQFFAgSBQ06WDVQp4QwEFAm/oqr0qBQJFAQWCQE2XDlYp4A0FFAi8oav2qhQIFAUUCAI1XTpYpYA3FFAg8Iau2qtSIFAUUCAI1HTpYJUC3lDg/wAdC05t7fj28AAAAABJRU5ErkJggg==[/img]

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[/img]

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[/img]

Explain how to reason with the hanger to find the value of [math]x[/math].

Explain how to reason with the equation to find the value of [math]x[/math].

Andre says that [math]x[/math] is 7 because he can move the two 1s with the [math]x[/math] to the other side.[br][br][img]data:image/png;base64,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[/img][br][br]Do you agree with Andre? Explain your reasoning.

Find the matching equation to the diagram.[br][br][img]data:image/png;base64,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[/img]

Find the matching equation to the diagram.[br][br][img]data:image/png;base64,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[/img]

Find the matching equation to the diagram.[br][br][img]data:image/png;base64,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[/img]

Find the matching equation to the diagram.[br][br][img]data:image/png;base64,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[/img]

[size=150]The area of a rectangle is 14 square units. It has side lengths [math]x[/math] and [math]y[/math].  Given each value for [math]x[/math], find [math]y[/math].[br][br][/size][math]x=2\frac{1}{3}[/math]

[math]x=4\frac{1}{5}[/math]

[math]x=\frac{7}{6}[/math]

25%

75%[br][br]

125%