Here's the complete directions for finding the side length of a right triangle using sine, cosine, or tangent.[br][list=1][*]Label the side you're trying to find with x. [/*][*]Use opposite, adjacent, or hypotenuse to label the side you know & the side you want to find.[/*][*]Choose the trig ratio that involves the two sides you just labeled.[/*][*]Set up an equation using the trig ratio you choose by filling in the angle and side length you know and x for the side you don't know.[/*][*]Solve the equation.[/*][/list]
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[/img][br]Let's try all 5 steps to find the length of DF.
cos(50°) = 6/x[br]x*cos(50°) = 6[br]x = 6/cos(50°)[br]x ≈ 9.3343
[img]data:image/png;base64,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[/img][br]Let's try all 5 steps to find the length of DE.
tan(50°) = y/6[br]6*tan(50°) = y[br]x ≈ 7.151
[img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAZ4AAADrCAYAAABZ5PDJAAAb5ElEQVR4Ae2du67sRnaG501swIANOLPhUBc4sv0CwgC2H2D8AGNg/ATjbDSAJxonR/k4FHAyBQIEKdixYqUnPWkbX2vWPnW4yd28VJF1+Qg0+kYWq75Vzb/WqsXqX9zcJCABCUhAAicS+MWJ5/JUEpCABCQggZvCYyeQgAQkIIFTCSg8p+L2ZBKQgAQkoPDYByQgAQlI4FQCCs+puD2ZBCQgAQkoPPYBCUhAAhI4lYDCcypuTyaBOgj835/+dPurv/jL2cd//eY3dVTSWnRLQOHp1rQ2TALLBBAXhIfn6ePt27fLB/qNBDIQUHgyQLQICbRG4B8///wuPK3V2/r2QUDh6cOOtkICqwm8e/fu2dtZfZA7SiAjAYUnI0yLkkALBJ6enu7C89WbNy1U1zp2SEDh6dCoNkkCrxFAcJjf4fnHH3/86PH+/fvXDvU7CWQhoPBkwWghEmiHQCQWzGW1/fTTT+00xJo2S0DhadZ0VlwC+wggOCQXkFI9fewr0aMksI2AwrONl3tLoGkCeDSRRt10Q6x80wQUnqbNZ+UlsI0A9+ggPHg6bhK4ioDCcxV5zyuBCwj84X/+cBceMtvcJHAVAYXnKvKeVwIXEPiPX/3qLjzcy+MmgasIKDxXkfe8EriAQGSyTZfJ4b0ZbRcYZNBTKjyDGt5mj0eAe3ZCeOaexyNii68ioPBcRd7zSkACEhiUgMIzqOFttgQkIIGrCCg8V5H3vBKQgAQGJaDwDGp4m90XAdKjSZX+79/+9vbtt9/21Thb0x0Bhac7k9qg0QjEvTlpwgBp024SqJWAwlOrZayXBFYQiCVwUtGJ13o+KwC6yyUEFJ5LsHtSCeQhwNI3ITTTZzwhNwnUSEDhqdEq1kkCKwnE2mtT0eG9wrMSorudTkDhOR25J5RAPgLffPPNosfDDaNuEqiRgMJTo1WskwRWEHjN28HjcQXqFRDd5RICCs8l2D2pBI4RiEw2/tCNVGoW/USIEJsffvjh/kdviI8JBsc4e3QZAgpPGa6WKoEiBN6/f3+LFaZ/+cUXiwt7xrpsCJOLfxYxhYUeIKDwHIDnoRI4kwACgtjgySA+iNBrG94O+yI+j/Z9rRy/k0BuAgpPbqKWJ4ECBPBgEBCEZEu2WoTk1ghVgWpbpARmCSg8s1j8UAL1EAjPBdFhHmfrxn/tbBWsredwfwlsIaDwbKHlvhI4mUB4LHg7exMF0nmhr968ObkFnk4CLwkoPC+Z+IkELieAWISnkiNBgKy3CNXtFbDLoViBbggoPN2Y0ob0QoAkgshcyzk3k67rZqZbL72lzXYoPG3azVp3SoAkgs8++eR5TiZ3NlrMF+H94AW5SeAKAgrPFdQ9pwRmCIQokAjwD3/398Xuv2Geh3Pk9KZmmuNHElgkoPAsovELCZxHIMQgkgjIXuN1bo8nWsQfxiE+PLtJ4GwCCs/ZxD2fBBICCEuIAEKTzr2Q0VbKK/nuu+9uf/vXf3MXHzPdEoP48hQCCs8pmD2JBF4SYI4lTSKYm3Mhs23LDaMvz/Lyk/Cmvv76azPdXuLxkxMIKDwnQPYUEpgSwLPBw4lw11JIjc8Rp1wrTSNiqWeV1sO/UZhayfelCCg8pchargQWCKRJBGvCXCEOR+6/QcDwnuZCd1GfVJAWqu7HEshCQOHJgtFCJLCOQPpX1VuEJFabTueA1p3xdp83QnDwdpY8q6jXnDCtPY/7SWAtAYVnLSn3k8ABAlzwufATWtvrWSBUHDs3F7RUtVhcdE2oLuqHZ+QmgZIEFJ6SdC1bArfb3cvAk4h7Z7YIxxQg4rDWKwmhWutZxXwS9eQ8bhIoRUDhKUXWciVw+znMhZfCxRxPYinUtQUW5Ty6/wbh2ONZUb+o71rB2lJ395UABBQe+4EEChEIjyO3BxGeyVxiAt9FEsFezyqSGai3mW6FOsfgxSo8g3cAm1+GQEzWc/Eu4TkgKngmadl8RhgOb+ioZ/X09HRoPqoMVUvthYDC04slbUc1BAhzITgIQ0mPAc+E8/AcXsqcF7QXDDeaUj5/t31UyPbWweP6JKDw9GlXW3UBgQiBcbHG80AMSm9pOC/1fnKdN0SU9rhJIBcBhScXScsZmgAig2cQonOmh4DglBQ5RId2IUJuEshBQOHJQdEyhibAfEhkgvV4cUZEQ1QJv7lJ4CgBhecoQY8fmkDMg+AR9HxRjjkk2onQukngCAGF5wg9jx2aQMx/4O2McDE2023o7p618QpPVpwWNgKBNImAEFTJ+ZXaeDKfhNeD2J45j1UbB+tzjIDCc4yfRw9GAJGJyXaeR7z4hqc3avsH6/JFmqvwFMFqoT0SiAU3zfC63VdHkEOPvfycNik853D2LI0TiBATF9s1Kz033tyH1U/DjfJ4iMsdJgQUngkQ30pgSiBCS8xrlLhJc3q+Vt6nmW5yacVqddRT4anDDtaiQgKM6llwMybTR0oiWGsOwo/yWUvL/YKAwhMkfJZAQsAkggTGg5cRhjTT7QEov34moPA8o/CFBH4mkIaQCLONmLm2tS9EONJMt63kxtxf4RnT7rZ6gUCM3k0iWAD0ysf8HQPcHv1J3StF+NUgBBSeQQxtMx8T4C8FuHDycLL8Ma/pHmmmW86/Z5iex/ftE1B42rehLThIgAtmjNaZpzCJYD/Q+IM6xXs/wxGOVHhGsLJtXCQQ/9rJhZL5Cd67HSOAcIfnqIgfY9nr0QpPr5a1XQ8JpEkEOf4u+uEJB9oh5srwIBXzgQy/sqkKz0pQ7tYXAS6MXBQZmTsfUca2MWdmplsZvi2XqvC0bD3rvosAS7xEKMgkgl0IVx8Uc2dmuq1GNsSOCs8QZraRECCJIO43wdvhrnu3sgTSTDfYu0kAAgqP/WAIAukFkNCPk97nmR32EdbUwzyPe81nUnhqto51y0IgTSJg7TUuhG7nEkhtoKd5Lvsaz6bw1GgV65SNQJpEYKgnG9ZdBWEL5tbwfvQ4dyHs5iCFpxtT2pApgbdv35pEMIVy8ftI7DDT7WJDXHx6hediA3j6MgRMIijDNUepYRvCnm5jElB4xrR7t61Okwh++cUXhnQqtHRqI8OfFRrohCopPCdA9hTnEGDeALFhHsFQzjnM954F8QlbERJ1G4uAwjOWvbtt7dPT03PKrqPoNsycZrphP7dxCCg849i625amSQSOntsyM4JjpltbNstRW4UnB0XLuIxATFSTouuo+TIzHDpxDBwIvXmP1SGUzRys8DRjKiuaEuACRVYUo2WTCFIybb6OAQRzc279E1B4+rdxdy1kboALlEkEfZk2bOocXV92nWuNwjNHxc+qJcByK7HuFxcoQzPVmmpzxcx024ys2QMUnmZNN17FY8kVPB3ugHfrj0Ca6eaCov3ZN1qk8AQJn6smEHMAeDtekKo21eHK4dWa6XYYY9UFKDxVm8fKEX6JPxNzcclx+kN4t9jccGp/dld4+rNpNy169+6dSQTdWHN7Q8LLdRWK7exqP0Lhqd1Cg9YvjfWbRDBoJ7jdnlPm6QNu/RBQePqxZTctiTALcf6v3rzppl02ZDsBwmyRZm1CyXZ+tR6h8NRqmUHrhdAgODxMIhi0E0yanXq/9okJnEbfKjyNGq63aptE0JtF87bHTLe8PK8uTeG52gKe/561FOEUnkkqcJPAlECEYMl0s49M6bT1XuFpy17d1TYNo5A2bepsdybO2qAIxZbOdKNfsngp80o8XIA2qxlvCk9enpa2gQAjWEavzOeYtbQB3OC7xn1dPOfeGPjE4rMx18izf9Odl7TCk5enpa0kwCgyfthOGK+E5m53AmmmW86sx7RcRI15JTbCenhAbvkIKDz5WFrSCgL8uPFuEB28nfhxrzjUXSTwTAAxCG8518AlBkN638+Yi71QeIqhteApgXRESYzeUeSUkO+3EKD/hNecoy8hZDzop25lCSg8Zfla+p8JcGGIESrxcn/cdo0cBHJlukW6tt5ODqs8LkPheczIPQ4SICMoRMcf9kGYHv6CQITIjmS6hYAxZxSh4PCmGCjl8KheVHzgDxSegY1/RtNJSY0fcK5Y/Bn19hxtEQix2Jt9FuIVc4+Uhwjxt+rxmfcO5esTCk8+lpY0IRAXA7wd74OYwPFtVgLp/CH9busWwkNfnXo3kb6dM4Nua/1621/h6c2iFbQnvQgwYpz+kCuoolXokAD9LkK6W73rEJ45cWHQhNez15vqEPXhJik8hxFaQEoAkYnwxJGYe1qmryWwlgD9L8RnS6p+hIQRoLlN4Zmjsv8zhWc/O4+cEOCHHj/6PeGOSXG+lcAuApEoMBc2WyoQwUJcGCxNt/iuxEoJ03ON8l7hGcXShdsZP3Z+vIwe3SRwJYEInW3xugmlTfsvCQXx+dbw3ZXtr/3cCk/tFmqgfiYRNGCkAasY/XLOi5nDkYbpCBdzHEK05AnNleFn6wgoPOs4udcMASZzYzS4JawxU5QfSaAIgRCPtaFfxCey2BAcBIiEA/q6Wz4CCk8+lkOVxA80ftQ8+8McyvzNNJZ+GckuhoDrMZvCU48tmqnJNIlA0WnGdENWNA2heT9ZHV1A4anDDs3UIk0iWEo9baYxVnQYAnEvjiHhOkyu8NRhhyZqQaybuDc/XjN8mjCZlUwIxL06hN700hMwF7xUeC6A3top+ZHGhKsjxtasZ31TAlsz3dJjfZ2PgMKTj2WXJXEfQ5pE4EKJXZp5qEZFf16b6TYUnJMaq/CcBLrF06STsng8hidatKJ1nhKgH4f4OE85pXPOe4XnHM7NnSVNIphbOLG5BllhCSQE0kGV85UJmJNeKjwngW7pNJFEQCKBP8qWLGddtxCIfx113nILtTz7Kjx5OHZRCiGImHz1x9iFSW3EAwLh2dPfDSU/gJXxa4UnI8yWi0rj3sS/TSJo2ZrWfQuBGGzR7xWfLeT276vw7GfXzZFpvJu11/zxdWNaG7KSQKw5aKbbSmAHd1N4DgJs/XBCDYQZmM/xR9e6Na3/XgKpx2+m216K649TeNaz6m7P+M8Skwi6M60N2kEg9fxNqtkBcMMhCs8GWL3syugu4tp4O1v+IrgXBrZDAnMEEB8GYjx47VaGgMJThmu1paYhBSZT/XFVayordhGBNNPNJJsyRlB4ynCtslREJv6bxCSCKk1kpSohEPeymelWxiAKTxmu1ZXKsvAmEVRnFitUMYFYGJdnt7wEFJ68PKssLZaDJ27tvzBWaSIrVSGBNCztslF5DaTw5OVZXWlpEoH/vlideaxQ5QSY44lIgZlu+Yyl8ORjWVVJ6WiNeR2TCKoyj5VpiAC/nRAff0d5DKfw5OFYVSn8OJgUJbTm5GhVprEyjRJIM90Un+NGVHiOM6yqBO7JidGZKxFUZRor0ziBuOHawdxxQyo8xxlWU0KMyvB0XPajGrNYkY4IxJwptyO47Seg8OxnV9WR8YPA23EStCrTWJmOCKRzp0YU9htW4dnProoj+SHEyrqIjvHnKsxiJTomwG8uwtkO8vYZWuHZx62Ko0wiqMIMVmJAAvz2Qnxc63B7B1B4tjOr4oi04+PyMwpzk4AEziMQc6pGGrYzV3i2M7v8iOjwJhFcbgorMDiBWBWEe+Uc/K3vDArPelZV7BmLFyI6xperMImVGJxAJPaQZu22joDCs47T5XsxmopFC3XtLzeHFZDARwTihm0z3T7CsvhG4VlEU88XrBcVHZtn/yOkHttYEwlAgIFh/OWIC/E+7hMKz2NGl+6RJhHg8RhHvtQcnlwCiwTS36oL8i5iun+h8LzO59Jv0yQCl2W/1BSeXAKrCCA4zL8aDn8dl8LzOp/Lvo11oUwiuMwEnlgCuwiY6fYYm8LzmNGpexBKiywZR02novdkEshGIH7DzMkaHn+JVeF5yeSyT+igaRIBMWM3CUigTQKxlJWZbi/tp/C8ZHLJJ+nEJB3WUdIlZvCkEshGIB1Iulr8x1gVno95XPKOJALCasznODq6xASeVAJFCKQDSm/4/oBY4fnA4pJXMRFpEsEl+D2pBIoTYBFRM90+xqzwfMzj1HcxAYm34wq3p6L3ZBI4lUDcGsFv3TD67abwnNr9fj5ZGvslmcAkgguM4CklcDKBGGia6abwnNz1bneRiaU17ICn4/eEEriUQKy3OPpcrh7Pid2Qu5pNIjgRuKeSQGUE0mjHyKuRKDwndcw0icBFBE+C7mkkUCEBFvmNAeiomW4KzwkdM2K7dDYXDzwBuKeQQOUEmNcl043HiHO8Ck/BDopbHXcvM68zYgcriNeiJdA0gTTTbbS/OlF4CnVdRCZd/sYUykKgLVYCDROIfxQeLdFI4SnQabknJ2K4hNkUnQKQLVICnRCITDeeR9kUnsyWDveZ2K3rM2WGa3ES6JBAmuk2Spq1wpOxI6dJBKNmq2TEaVESGIYA4hNRkhGuHQpPhq5Np4kkAjqPSQQZoFqEBAYjwHUjxKf3JbQUnoOdm2wUkwgOQvRwCUjgTiBC9b0PYBWeAx0+HaGYRHAApIdKQALPBOJv73vOdFN4ns297UWMTEgiGHnpi23U3FsCElhDIOaLCeH3uCk8O6waufeIzggTgTsQeYgEJHCAQO+ZbgrPhs5BZ4ic+95jsBuwuKsEJFCAQM+ZbgrPyg6TjkCIvY62xMVKTO4mAQlkJJDOI/e0zqPCs6KTpMbH40GE3CQgAQmcQQDBIazfU5RF4XnQc5jDidx6kwgewPJrCUigCIH4WxUWG+5h4KvwvNJNIq3RJIJXIPmVBDomQLSDmznnHkvhdjwUrh08cobHItONUH/rm8IzY0FGFGFkvJ3e7yKeQeBHEpDA7fa8IgmDz+kDYUm3dB443XfufhyiJ1xb+G7LX6awP2VzfWp5U3gm1ks7D0ZmxOMmAQmMSSCWwgoPJn2eDkhjsMox4SFFFmx6Pw7h+1SM2BcRWrNxfUKoEJ+W/8lY4UmsnSYR0FEwspsEJDAugfBIHhHgWoEYzM3BhHjFIBYxmobgQqwenYfv0+vUtJw1x9ewj8LzZytgwEgiaN2NraFjWQcJ9EAAMUm9laU2xUomcwlIkRgQoTn2md54vjW6wvWKun32ySdNRmUUntvt7rJiRB7TDrHU0fxcAhLon8Ba4UFUlq4fhNL4Dk+HLUJriAeeEsciPFs2jvvPX//6Xi4D5taiM8MLT8RlMV6rbuuWDuu+EpDAOgIRPuPagNcTDwQE8Ui3EJ7p5+wT5aSeE/tRDp9xDdoiHOyLUPH48ndf3sWH11vKSOt+xethhSeMx0hkS1bJFUbynBKQwPkESJfm2pAKT0zsc92I0Bk1Q0D4bE54+J7vUuE50hoEKxWaOHdLUwRDCg+Tc9GBUgMe6QweKwEJjEEAcUGMEJO4lyciJ6WFh/NMr1npIDoVw5qtMZzwmERQc3e0bhJogwAJAqnX81qojYFuDo+H+WcEby6klma6tTBPPZTwYBA6AI+Wc+Db+GlaSwn0S2CaqRbv564reEFcc46EwkJYljwqSMd5ECf2r3kbRnjCFcYoJhHU3CWtmwTqJ0C4Kx3AhlcTmWtpC8I7OuKJMI+zJowWg+slzyit15Wvuxce3NKYfGthJHBlZ/DcEpDABwJ4EDGH8+HTD54FwpN+H/PGqbcRngr7zoXI0nKXXiMmlL12C6GbzgWtPf6M/boWHoweI5OajXCGoT2HBCSwjUDM23DtwJPhfQxiEZKpBxOhLr4jwsKDwS7v13grc7VDrCjjtRDb3HHUl/POeWBz+5/9WbfCg6HC6HSAvaONsw3i+SQggToIMHCNCzgX8Xjw2ZIQEMaPwS7746nsFR0ohNhtJcL1LuqBB1Tb1qXwRJwTwx8xem3Gsj4SkMBYBPZ4O0GIMGAMvqfeWexz1XN3woN3g+AAvDbYVxnZ80pAAu0R4PqF13Jkw2sLT43XtWzdCA+uZbjFiE5NkGsxtvWQgATaIcD1LMfgmTJiMJ4mQ1xJogvhAWbEM3l2PufKLuW5JSCBowS4hiEWua5ltWW6NS88eDYRx2SEkMtQRzuOx0tAAhLYSwAvhQy6nFtMQ+Qud08dmxaecCEZGdSYubHHIB4jAQlIAJGYWwXhCBkG5REZovwrt2aFJ1xHRCdHHPRKI3huCUhAAikBBGIpZTvdb+trxCciRFdeN5sTHsCFy2gSwdZu5/4SkEALBBhQl9rS6YkS4ram3k0JT+oqMiKoJUNjDWj3kYAEJLCGAGKwZYmcNWVO94lpiqsG79UKD3cAx9pHwPn9l7+/ff7pp/dMDybHECE3CUhAAr0RQHjOSADg5no8q3/5p3++ff7pZ/fXDOjPWES5SuEBPEDmHldPivXWyW2PBCRQFwG8ETJ0z9j+/V//bfY6WzoEV6XwxI2gc8Lz/fff3yfdAONDBvYB+0BvfYDBNY/S7eJaOneN5bPSwlel8OBmLgHx83lPUC5ysQ/YB3L1gdKhviqF5zWP53//+Mf7wp/EJ33IwD5gH7AP7OsDXEuXhGpI4WFyaw5IaRhnxFQ9hwQkIIFaCCxFl0onGFTp8WAUJtgiqw0RIuZpJlst3dV6SEACPRBI74vkOksG8Rk3llYrPD0Y1TZIQAISkMBLAgrPSyZ+IgEJSEACBQkoPAXhWrQEJCABCbwkUFx4iBdOs05YddXlbl4aw08kIAEJ1E6Aa/f0mp6+X1P/4sKTJghMM9XOmMRaA8F9JCABCUhgHQGu29NrebwnOWHNVlR4yJigQumCd6yMijpGRUun7a2B4D4SkIAEJLCOQPwlDZGr6eoKXN/XbEWFh0ohMKRCTzcqzXcsSucmAQlIQAJtEOCazbX7yHRJUeEJz2bpn/TC6/H+nDY6nLWUgAQkwHV7bUhtiVZR4Ym7YvF85rZH388d42cSkIAEJHANgYhiHV1EtKjwoIqo49Km8CyR8XMJSEAC9RGIKRKiWUe2YsJD/A/RQVyWtsh4OxIrXCrbzyUgAQlIIC8B5utjimT6vBTZmqtBMeGJlDsyIOa2EKajscK5sv1MAhKQgATyEwhnAYdi+tgyV19MeCLlbulenUg8OBorzI/WEiUgAQlIYEpg7vaY6T5r3xcTnpi/mQujkesd8z9b3LO1jXI/CUhAAhLISyASC+Zuj9l6pmLCQ/xvLoyG6EQeeI4GbG2w+0tAAhKQwHYCEaVauj1mS4lFhAdxSRML8HpQy3RiCo9oS0xwS6PcVwISkIAE8hKIKFaOKFUR4YmUu2nWQ3hBORQzL1JLk4AEJCCB1wjE9Mhr+6z9rojwoIi4ZdNHDqVc2zD3k4AEJCCBfAS4nudyGooIT76mWpIEJCABCfRGQOHpzaK2RwISkEDlBBSeyg1k9SQgAQn0RkDh6c2itkcCEpBA5QQUnsoNZPUkIAEJ9EZA4enNorZHAhKQQOUEFJ7KDWT1JCABCfRGQOHpzaK2RwISkEDlBBSeyg1k9SQgAQn0RkDh6c2itkcCEpBA5QQUnsoNZPUkIAEJ9EZA4enNorZHAhKQQOUEFJ7KDWT1JCABCfRGQOHpzaK2RwISkEDlBBSeyg1k9SQgAQn0RuD/AdcPYHORGA3kAAAAAElFTkSuQmCC[/img][br]Let's check our answers for DF and DE using the pythagorean theorem.
7.151²+6² = DF²[br]c ≈ 9.3347, that's pretty close to 9.3343![br]
[img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAXAAAADICAYAAADx97qTAAAU5klEQVR4Ae2dvc4kxRWGuROQkGzJmS3LlpHxmhxZQpbW3AK+ACxwgkN8AbsiwAmOFycbkZOQEBARk5KSjvXOcrS1/XXPVNf/qXpKGs1MT3f9PKfm7dOnT828dqFAAAIQgIBLAq+57DWdhgAEIACBCwLOJIAABCDglAAC7tRwdBsCEIAAAs4cgMBkBP77xReXf3788eWnn36abGQMZ0sAAd8S4T0EnBN4//HjyzuPHjkfBd2PIYCAx1BiHwg4ISCv+83X37h64E66TDczCCDgGfA4FAKjEfj++++vAv6/L78crWv0pwIBBLwCVKqEQC8CEm554N9++22vLtBuQwIIeEPYNAWB2gR081ICzg3M2qTHqB8BH8MO9AICRQjo5qVuYlLWIICAr2FnRrkAgR9//PHqff/7008XGC1DFAEEnHkAgUkIfP3119zAnMSWscNAwGNJsR8EBiegBTyKfysThbIGAQR8DTszygUI2A3MBYbKEH8mgIAzFSAwCQF533//4INJRsMwYggg4DGU2AcCgxP44YcfruGTp0+eDt5TuleSAAJekiZ1QaATAVvA89VXX3XqAc32IICA96BOmxAoSEDpg8r/VghFrynrEEDA17E1I52MgOLdeki49VAWCmUtAgj4WvZmtBMRUNaJPG898+NVExn2xFAQ8BOw2BUCEIDASAQQ8JGsQV8gAAEInCCAgJ+Axa4QgAAERiKAgI9kDfoCgR0C+o0TyzLhZuUOoIU3IeALG5+hj0/A/mHHMk3smZuW49uuRQ8R8BaUaQMCiQT007Am2uEzv/mdCHSywxDwyQzKcOYiYD9QFYq3XiukQoEAAs4cgMCgBPS3aB9/9NGuB86fNgxqtMbdQsAbA6c5CMQQ0I9TKUwib/vPf3qxTD70wr/77ruYathncgII+OQGZnj+CNgPUylMYv8ur0wUbX/27Nnl0dtvX5fQ88fF/mxbuscIeGmi1AeBRAL6ISr7bRPFvo9+mMr+Oo3fPkkEPdFhCPhExmQofgnoZ2At1zvmJ2EtO4W/T/Nr8xI9R8BLUKQOCCQSUBjExFjet2LfMUXHSfD1IJQSQ2zOfRDwOe3KqBwQUHzbvO6UcIgt8iEjxYGxK3URAa8ElmohcERAHrP9g7wyTXLCIFaP4uKU9Qgg4OvZnBF3JKAQyV/fe++aHijPOTf8oeMVepEnf3TTs+NwaboyAQS8MmCqh4ARsPTAX/3il5fPPvvMNmc/2x8aK3OFshYBBHwtezPaDgS26YHffPNNcY/ZTg56pqxDAAFfx9aMtAOBo/RAxa4V+ihZ7HdTYjNZSrZNXX0IIOB9uNPq5AQUm76XHigBL+kxy9NXLFz15sbWJzfPNMNDwKcxJQMZhUBseqDFrkt5zBLtf33yyfUGaUpa4ij86Ec8AQQ8nhV7QuAmAQmopfXFpgcqxKJ9cz1mnQTkeSuMYiKek554c6B8OAwBBHwYU9ARzwQkoPbrgWfTAyW6OR7z9gamTgYKpeiRe2LwbJMV+o6Ar2BlxliVgAmoBNN+PfBMgxa7PnusjpP4y/PehmFYpXnGAn73RcD92o6edyawTQ/U+9RicfNYj9n+6Fie+9ExFs5hlWaqVcY/DgEf30b0cEACR+mBOV1V6EWPW0VirX3k7d+LcWtfeefaN+fkcqs/fNaXAALelz+tOyNgAqp/x9kLXeQMR3Urjn70c7ISbInxmRi7Qivqq0ItlPkIIODz2ZQRVSJgYQ4JYs5Nx1vdM5EOPWYJu9qTeKeEQyxGXzLn/NYY+KwdAQS8HWtackrABFTCHZsemDNUibW8e5UwPTAU9bP1ywNX/7c3O8/Ww/5jEUDAx7IHvRmMgAQvNT0wZygScBPdEp6zxF8evOrVCYkyBwEEfA47MooKBCz0IOE7m+KX2x2dOBTrLukxK/xSM/yTO2aOP08AAT/PjCMmJyBvVZ6qxE5ecE7oYjRUOiloXPcyWEbrN/3ZJ4CA73Nh66IEaqQHjoRS4RNdUehBKGUky6T1BQFP48ZRkxGQmJl3Ku+7ZOhiNFTyvuWFa7wU3wQQcN/2o/cFCLRIDyzQzaJVsEqzKM5ulSHg3dDTcG8C8rpNyFqkB/Yeb9i+xq4rDYVSZorxh2Nc4TUCvoKVGeMDAr3SAx90pOMGMVAoRUJO8UkAAfdpN3qdQaBnemBGt6scaixK5JpX6SCV3iSAgN/Ew4czEZg5PTDHTrZgaOYbtzl8Rj4WAR/ZOvStGIHZ0wNzQOnEpli47gOQWphDsv2xCHh75rTYkMBK6YE5WFmlmUOv37EIeD/2tFyZwIrpgTlILQ++9c8G5PR59WMR8NVnwITjXzk9MMec4qYwCqs0cyi2PRYBb8ub1ioTID0wDzCrNPP4tT4aAW9NnPaqEbCUOHmQhAHSMdvipqN/BkqvmSNLE0DASxOlvuYESA8sj5xVmuWZ1qgRAa9BlTqbESA9sA5qVmnW4Vq6VgS8NFHqa0KA9MD6mHVy1FJ7VmnWZ53aAgKeSo7juhEgPbAdelZptmOd0hICnkKNY7oQCNMDdaOSf5WpbwZWadZnnNMCAp5Dj2ObEVBMVjfW7I8IJOaUNgR0xSPuyk6hjEUAAR/LHvRmh0CYHqgl35T2BFil2Z55TIsIeAwl9ulCQJfvFoOd7c+FuwDNaJRVmhnwKh6KgFeES9XpBORpK85NFkQ6w9JHskqzNNH8+hDwfIbUUJAA6YEFYVaoilWaFaBmVImAZ8Dj0LIE5OGZ1y2h4EZlWb6lamOVZimS+fUg4PkMqSGTgITaPDvSAzNhNjicVZoNIEc2gYBHgmK3OgRID6zDtXatrNKsTTiufgQ8jhN7VSBAemAFqA2rtAwhnYQpfQgg4H24L90q6YFzmJ9Vmv3tiID3t8FSPSA9cC5zs0qzrz0R8L78l2md9MB5Tc0qzX62RcD7sV+mZdID5za1Ts78l2YfGyPgfbgv0SrpgUuY+TpIVmn2sTUC3of79K2SHji9iR8M0HL5+S/NB2iqbUDAq6Fdt2LSA9e1Pas029oeAW/Le+rWSA+c2rxRg2OVZhSmYjsh4MVQrl0R6YFr2z8cPas0Qxp1XyPgdflOXzvpgdObOGmArNJMwnb6IAT8NDIOMAKkBxoJnrcEWKW5JVLnPQJeh+vUtZIeOLV5iw2OVZrFUB5WhIAfouGDPQKkB+5RYdsRAVZpHpEpsx0BL8NxiVpID1zCzEUHySrNojgfVIaAP0DChi0B0gO3RHh/hgCrNM/QOrcvAn6O13J7kx64nMmrDJhVmlWwXhDwOlzd10p6oHsTDjcAVmmWNwkCXp6p+xpJD3RvwiEHwCrN8mZBwMszdVsj6YFuTeem46zSLGsqBLwsT7e1kR7o1nTuOs4qzXImQ8DLsXRbE+mBbk3nsuOs0ixnNgS8HEt3NZEe6M5k03SYVZplTImAl+HorhbSA92ZbLoOs0oz36QIeD5DVzWQHujKXFN3llWa+eZFwPMZuqmB9EA3plqmo6zSzDM1Ap7Hz8XRpAe6MNOynWSVZrrpEfB0di6OJD3QhZmW7ySrNNOmAAKexs3FUaQHujATnbxcLqzSTJsGCHgat6GPIj1waPPQuQMCrNI8AHNjMwJ+A47Hj0gP9Gg1+mwEWKVpJOKeEfA4TsPvRXrg8CaigxEEWKUZASnYBQEPYHh9SXqgV8vR7z0CrNLco7K/DQHf5+JiK+mBLsxEJxMIsEozDhoCHsdpuL1IDxzOJHSoIAFWacbBRMDjOA21F+mBQ5mDzlQiwCrN+2AR8PuMhtmD9MBhTEFHGhFgleZt0Aj4bT7DfEp64DCmoCONCbBK8xg4An7MZohPSA8cwgx0oiMBVmkew0fAj9l0/4T0wO4moAODEGCV5r4hEPB9Ll23kh7YFT+ND0qAVZoPDYOAP2TSdQvpgV3x0/jABFil+dA4CPhDJt22kB7YDT0NOyHAKs1XDYWAv8qjyzvSA7tgp1GnBFil+dJwCPhLFl1ekR7YBTuNOibAKs2XxkPAX7Jo+or0wKa4aWwyAqzSfGFQBLzDxCY9sAN0mpyOAKs0LxcEvOG0Jj2wIWyaWoLA6qs0EfBG05z0wEagaWYpAquv0kTAG0x30gMbQKaJZQmsvEoTAa847UkPrAiXqiEQEFh1lSYCHkyCki9JDyxJk7ogcJvAqqs0EfDb8+L0p6QHnkbGARAoQmDFVZoIeJGp86IS0gMLwqQqCCQQWG2VJgKeMEm2h5AeuCXCewj0IaDv4vuPH1/eefTootezFwQ808KkB2YC5HAIFCaw0ipNBDxj8pAemAGPQyFQkcAqqzQR8IRJRHpgAjQOgUBjAius0kTAT04q0gNPAmN3CHQisMIqTQQ8cnKRHhgJit0gMBCB2VdpIuARk430wAhI7AKBQQnMvEoTAb8x6UgPvAGHjyDghMDMqzQR8INJSHrgARg2Q8AhgVlXaSLgO5OR9MAdKGyCgHMCM67SRMCDSRmmByoFSe8pEIDAHARmXKWJgP88N0kPnONLyiggcIvAbKs0lxfwMD1Qv6Gg2DcFAhCYl8BMqzSXFnCdjSXab77+xkVGlZhTIACB+QnMskpzWQG3s7B+tUx3qCkQgMA6BGZZpbmcgJMeuM6XlJFC4BaBGVZpLiXgZjB53XpNgQAE1ibgfZXmEgJOeuDaX1JGD4EjAt5XaU4v4Ipvy+PWjUot0KFAAAIQCAl4XqU5rYDHpAcqHi7jSdj1UC74XlG2yt5jL+VQ2/a279XLNghAYAwCXldpTing99IDJe5Pnzy9euXyzMOH0ou2Jfw8fK34mRXVqWPtoc9ISzQ6PENgbAL6rnr8L83pBDwmPdDiXhJx85b1bDc0tp64RFv7br1wO1ZTU5+HN0bNqx972tI7CEDACOj7re+6vHEvZRoBl5jK+zUDpHi/EnY73gxoRr0XP9963Dou9NCtPp4hAIFxCZgDGDpj4/b2cplCwEulB5pYh2dg27b1yrdG3Xrg6pO2USAAAV8E5Agq8UEO3ejFtYAL8D8+/PDqNQt6DnB57BZCCVdmmoBLkPXaHlvDqm0ZXaKth+JpKVcB23p5DwEItCWgq3ldiUtTRi9uBTxMD/zLu+++En+OhS6vWqJtwi3RDcVb9Zh3L4OGj719JdhHAh/bJ/aDAAT6E7Dv/b3Qae+euhNwiaSl/EhEdbaUaMr7PevxhgJuueJWZ2iYrfcto5qY53j9YRu8hgAExiJgjl2YrDBWD53FwCXUEliJ5/bXAy10kQNYgi4hl+HuFS9n6Hvj4HMIQGCfgIVFpTlnncP9GstvdeOB291hCew2zCEsgi1hz/WIrZ179VicLEbsy5uNGiEAgRYEpDXmMLZo72wbwwu4hDI2PVBeeG7MygRc3v6tYh649qdAAALzErCQ7Z7j2HvUQwu4iaS8br2+VyzEcm8/edd7Hra2WSzcLpl0ArHXVq/eWyjnXnqhHcMzBCDgk4B936UNWy3oPaIhBVxCajcQzqYHSljvnSntJqTqNq9dzybeoRevfmi7nrVdHreJt46hQAAC8xOQc6hQSrhGZIRRDyfgEt89IY2FJYG9F9aQVy3xtdCMDKM2ZZyt+Ou9nUy0nx46Ds871iLsB4E5CEhX9P2PiQa0GvEwAq5LE4s1ycOVyKaU2DBKSt0cAwEIrE1Azpucvb0QbA8yQwi4ia7ObjrL5caZVE9uHT2MQZsQgMDYBORY2lX4CD3tLuB2WaKz2jZ8kQpIIQ+dFCgQgAAEShOw5IrwXlnpNmLr6ybgOpNZDFqhk5Ies+LbI8WpYo3BfhCAgA8Cdl8sNdRbapTVBTyMbevSQ2L9/Pnz62WIvO4aQqsz4whnx1JGoh4IQGAsAoqB//Gtty6//fVvrlombZPjWNIRjRlxdQE3L1sDDB/aXutGgKX7xQBgHwhAAAJnCUio//C737+iadI3eeYtS1UBt9zJULjt9X8+//zqJZu3XPL56ZMnl/cf/61a/SX7Sl0vrpbgAAdPc8Ay5kzPwudajuneiaGbgIcD5vWrVyfwgAdzwO8caJlAUVXAdSY6mogtz1J7Zy62QQACEEglYOmEW33Tfb2WcfCqAi44liYYDrTGjctUQ3AcBCAAgRQCumkZ6ppet16hXV3ABUaXFBbfanl5kWIUjoEABCAQS0CC3VPbmgh4LAz2gwAEIACBeAIIeDwr9oQABCAwFIFkAVegXuEQe7QM3A9FkM5AAAIQiCBgmnmUwCEtPbuy87SAqxN7wXsF8Gsuzongwy4QOEVAc1nxSy2+0EM33M9+gU41yM5LE9Bck07u/eaTZewpv/xMOSXgmtxKk1En9CwhtyC+Gm6dQnNmoOwLgZCAxDtcJWy/baG5zY32kBSvSxGwxT97Hrh0VHPvbIZetIBrwts/0ZxtpBQA6oFAKQKW3hr+foXmuJwQHJFSlKknJKB5JQ3dKzYfzzoP0QJu7r8aokDAOwHzvrfekC5vUzwh7zzof10C90IkdgV4thfRAo5nchYt+49MwMKA2z7KC9dnZ2OR23p4D4GQgDkGcoT3iuacnIqzJUrArXFdblIgMAMBCwduPXBbIi2PiAKBUgQsgiGR1twKH3Y1mBLdiBJwa3wb+za3X2cPPY7OLqUgUA8EShGwTCo9m4jr2b5MCHgp0tQjAqaVoXDba3MmUpbhnxLwbYC9RAcwLwR6EAhvysv5UIhQz5YpoLlNgUApAppbRyEScyZSUlizBNwGZ5PePBnbzjMERiYgEddVpb5AunpUqFBzWF+2lMvZkcdK3/oRsLCc5tlesau+vc/ubTsl4NsQilWuSwB5MBQIeCdg+bgpl7Pex07/6xCwObWnn3bTPPWKL0rAFTqxy0w1GJbcDoR18RoCPQloLpszsp3nPftF274JWIhkG4LWqExbU+8fRgm4GtIZwkRcl5c6q6hR257aAd+mofezEFDohLk8izXHGsetEIl0U7qq8F1KiRZweSQSbjW2faiDxL9T8HNMTwKax5q79gXTe2LfPS0yZ9tyDI7mlTnBqfoZLeAhWrn99gi38xoCngjoy6Mb8HrodUoWgKfx0tf5CCQJ+HwYGBEEIAABfwQQcH82o8cQgAAErgQQcCYCBCAAAacEEHCnhqPbEIAABBBw5gAEIAABpwQQcKeGo9sQgAAE/g89I2RBqt6WuQAAAABJRU5ErkJggg==[/img][br]Find the length of side JH.
sin(35°) = x/9[br]9*sin(35°) = x[br]5.162 ≈ x
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[/img][br]Find the length of side GJ.
cos(35°) = x/9[br]9*cos(35°) = x[br]7.372 ≈ x
[img]data:image/png;base64,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[/img][br]Check your answers for JH and GJ using the pythagorean theorem.
5.162²+7.372²= GH²[br]GH ≈ 9