[img]data:image/png;base64,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[/img][br]Which ratio could be used to write an equation relating the sides and angle given in this picture?

[img]data:image/png;base64,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[/img][br]Which ratio could be used to write an equation relating the sides and angle given in this picture?

[img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJoAAABzCAYAAABgtBtdAAAb1klEQVR4Ae2de5AdVZ3HeyaZyTwyeUweQBIwEXANoIgisIsJD3cBo6C7wqYUt1yVpZDIIxgLIpsU667WllKCWuWSrCTEJCgolIpI7VKYgAHlJcjLJURISCbJzJ25z759+3m+W9/T93fnzJA7M9whyWRu/9F1+naf7j59zqd/r3POPZZSCsmW1MHBZsA62A9I7p9ATAYS0BKJfkg0WgJaAloCWqJ2x4/aTSRaItESiZZItDqSaK7rauKDIKiQb9t2ZV9gKJVK8H3/LXnlfJKOH2hqacuqqpPgFIvFClCe54GwMZUHhWGIQqFQAYzHBUzJk6T1DZi0f1XQJEMURRqsXC5XASydTmvAJA8lXCaTqZwnpHIuSRPQyMCwoJkA8YLe3t4KRPl8foCEM9VrAlgCmMlAVdCoEiWj2F633norli5diueff16fo5oU6cU8Iv0S4BLIhB1Jq4JmwkJbjLZZU1MTLMvS2/XXX4+uri4NnAmlKfHkIUmagFcVNMIhDoCAQsimTJmiQWtpacG8efOwYcMGDRvVqDgCJnhybZLWN2xDgib2Gb1PqsapU6dqyKg6Tz31VHR0dOjfF154YUWdippNwKpvsAa3f1XQxN7iBVSdTEVtcp/nN27ciOOOO04fb29vx7XXXjvAWWA+Sjm5XlIeFyB5H9mX+5ohFB5LtiO/DmoGjdBks1kd5li+fDlaW1s1cHPnzsV9991XgcOEhiESgjU44Et7kJvjODpNwDrywRrchjWDJjeS+Nqzzz6r1SmlXkNDA8466yzs3r27Is1M4HitqGPT6eBx5jMlnzwnSY9s+GoGjdJMGp8hDlG1lGadnZ1aulHKXXfddRV1SohEqsm1TAdDKCETM0+yX6egseH37dunYSNkVHs8RgAZ9rjpppswYcIETJ48GW1tbdi0aVMlL/PR0RA4aaMlUuzIBmk4QVCzRJN+UAGMD2KIQx5IcLZs2YIzzzwTRx11lJZw3N+5c6eWapJvsCOQSLPxCVzNoEnMbDBgAp7YXsy3bt06zJ49G5MmTdLArVq1qqJOeT0lG/MTOhM8gTFJj3z4agaNjW8GZgUsHhebS+w4Sj/mXbZsGRobGzVsDPauWbOmojJNwMz9BLIjHzK24ahAGw4CUw2KDbZ161YsXrxYwzZx4kS9/9JLL2ngBDAz/GFKTt5D7Lrhnp2cH1uAHlTQxI5jo5vwUNL97Gc/w4wZMyrArVy5EqlUaoCUFDgJoOyLtExAGlsgDdceBxU0sddYCEoiU8Kx853nGf6QHocFCxbovlPmY34TKkIr1/f19VWcjuFeMDk/NoA8qKBJI5vdUDxGCSUqkJLqmWeeAftLCRzV6ZIlS7Bjxw4Nlth+hNKUinLvJB0bIA3XDgcNNJE+LAAhEfvLLBBVqADH/XvvvXeAOr3lllu0KjWHHsnQJPM+yf7Yh+2QgCYgECpTBcpxqkgx9AncihUrKup05syZePDBB7WqlACxSDm5PknrGDQ2PoGgNBND3gTCPCaepQBE8OiJLlq0SPcqUKWec845eO211zRwks+8X7I/tmEbnUSLFFTEIUQhIhr8ekgPp+UFcAMfgeLEFv7mCF16jvFEF9/zdF4/VHC9eBqfqFbHnHnlB/jubbfjvQtPgmU16M76FSu+ily2fyLMOwWYlD9+h+qNJvmUfje+O98pfq+hyyL54voa2TXVyzH0s8bedbWDRshCbi7cYgY+jXwdxO2BUg7ykYuSbgAHxXyqAqLLOaFROa+vEAigkYJLyOhtluK5pN2ptD7flyvgy8uu0eq0wbJwwrvn4+7NmypeqahkVr6o4MENQZtRYA45R1V/JPxQ4g9Eyi/lCfgBRApMvfK+50fIOiX9nvyAvFIeoV/SH1up6MB342sKOWfA/eOyEDDOe+W7ccoif489IA5WmWoDjY0UKOR6eqHCAnwnhZJSSBU4D5QV6aCoQuQVp93loKIiXI+xtBAq9KGiAC6HChFMTyEIFYoFAhjCtQu6kXK5AkKlUAoVenO23n/66adx/rmL0WhZmNDYoFXrq6++WhnDRpVrqlVCxx4JAYyVKGq6AhrhLH8kAht/6/NBBL/oVqDZ190LTyn0FXIIIw+KGyU2pyRGCqEfIZ/lx1K+nmkFJhM01lECmq4c8QZZUWJPSbwrbgTCFkF5+6FUL664+mpYDS2YPnmaBuGyL34WfX4aSmXh5lN49/xTYFntaLIstDVbuPvnD6DPUbrhqI7uWrceEywL7ZOa8fUbb4LvhxqAghvqPB6lp1LIZfqwacN6zJoZB3tZJnqne/bsqZSTQ5HM7jGGRWRYuobNKZWlcSxRCZioRIHNp9Tj+/kKJy04UavuvakeFEqOLpddLOLSSy/Vw9mffupp9Kb6KoDZhbJEq0BGtUmwaCZQqnEbibo1QT2y92uXaGx4lxXag48uPhkfOe98ZAoR7L6ibkRKNFtLtDwuu/gibNpwnz7u5buxbu3tsBom4bn/60LaDvHSy9vx/lPeh11/2YF8ug/vP/kUPPnk0yh5EWwv0qqKUoaOhW6wwENvqgfXXHMNmpubtUqdM2cO7r///gHSq+q8U0oalp9SiE5LWar175ftqTCCn81jy4MPoW1SMy6//DOIVIBIRdi4+aewrCbc8o1vwQ/6QQ3LqjgGiXCZmwBXX5Dx464RtAjZnh6o0MFP7rwVp79vvm4sr6xSA8dHxo20elRBEcovInQVPMdHVExBKRvHnXAS7vnVFi2tHn3s97joggtjxyIKsWL5DfjlLx/QEORLAbp6+vQ+JatXIsixRKDUffTRR3HuuedWvFMGfumxask13LxTAziqfkcDRzUYQvGvHzyqTap6H6u/uhwtloW71q/BC39+CZ2zj8NHzv24/gj29ebBdyewXhgg1M4RgWQ5Y2eoIsH4TG4VaVcf+7WBpiuPNlUOSxadjm+uWgnXV8jZQdw49CbL9peip+nRbqFdQpWVx/NPbUNTeye+t/YnGrTde7oxY3on7GwGmVQPTnv/qdiy5VFkckXdkFRnJT8sS6sQJTuPdF//jHkCeNddd4ExN6pSjhAZdt6pNHhZJbO8dF4ICW3IoJCDCjx4hTRU4MDe9yZOf+/x6GhrxJVXXQnLmozfbnsZBT9+V9puRQ51UpTAHkJFz1oMf8IW23EV+y0BLf7ChrTRlAuvuAte9g2cfsJ7cNXlV6K9fSbaOqagmXM/Wybi9V0hvECh0G1DSzXVC9fZBad3N/7x4k/iI+d9HPtzsY3m+QqbN27C1PY2baet+vrN+ounKmMDumVpoQ39iMZ3ueHKjUWPkrCxzF/60pf0qN6h5p3a+YJ2Ztjo+v6VRo9BC8WOClyoog3lOQidNDb++L+0jUlb8vYfbERfMZaC3blIO0OZkotiSK/UQ6BKCFWpDBvLW5ZkZZWdSLRypQ8NGm2lvVDubpw4cy4Wf+B8FItKx87oGFx84bmYOv1DeOMNBeUpqGIG06dZmDnDQrtl4ewPnoE93bZWVWxobeMEIYq5LFRAVRXDTlDFOCd0cWMFCLRtGJZttn7VIx7nE088MfS8U96/3OACWhw/I2ixygs8fiAuVD4Llc9ARTY23Pl9/SE1NVhYcsnnkaMnHcawUe1SKnqKUs1FoOg0OGXQyu8kz61D2GpUnQSNf4fQjZPnLMB3Vt+GfJ6NpKD8/fjDYw+jtf19eOihXTFobh4lh1H9Ligvi20Pb9Ee6PUrv6klChvZdxkuoNoK4ZfjaLzfW0Arq7aKzSMADkr5oQw775SSknZjEGnobQ1ZENuAgQdVzGs7VIVF5He+hmM7mvHpSz6K5V+9HpY1DevufkRfxzANN9p5BK2kiglog9qjRtBoe6Tg9O3Auztn4t++dguiSKEvy7+2ymHn9lfQ0v4ebNi4DcWUE6vOkGGQlI67MWxw/ddW45QPn4+de9NwSgRMxTG0MA56UnqNBjSqUvabMsxRdd4pPcRSLG0okbqLWS3RvHwWTqoHymYMkHalg0/8zRmY1WShkOnC9r9sx6y5J6Fl2ol4cUefBiwfxBLNDpxEdQ6CjG1ZI2i0OWy42T34/D98DFdcvlRDQa9LhQEeffgRTO5cgJ176SFGKPbsLUfDS7B7durGu/X7a3DekqUViabtJdpDWqrF6nA0oIkNdKB5p41WA84+46/R9eYeuCqK7TSfwdfYRmMIQ3ubWqrZ+OmaH2JqayNW3nSdDkY7RRs/XHs3LGs6Lrnsi2WVGUtfJ6R95ifOwCDYagMtihDxz/ZCB889/mttt6z78Wat5nI9WSw84b1YfOEndAO8/uqLmH9UJ/a+uT+2vaIC/vzCHzBl5hxctXy1jqNp+0h7gbHqLGjJODqJRmkmsNFZEJuT807p4U60GtDe0oZly6/DvkzswbIPNl3IwlcBnGIBquRg5/N/wvzOTpx1xmnIFTjgktI8gh8pXPz3n4NltWLzvb9AKpOvxONKPp2AJLwh9V+7RBOj1neh7F24/54foqGZM5za0NLQim9/69tanZSUj2x6F36+aT2aGqegwWpFR7OF1iYL9/7iNxVngEHOQo72ECVJrEZZuNFKNBlWRMjiYG8873RvV5fufWhunIAp7fG80/U/2aQ/DIYn4lBEpKUxu5cy3YwZxh+B61M1RhqqklcuoxGwLdjF8uACCc4mAdvRgcbKLbJDmdKgFwXP0yqI3lz33i70+XmkgwxCPwUVscNZPL0SfCet+zhpF9HrGyDRfA8eu4hGCZrMVxDAeD9z3qkKQjz2yBac/eEzcTTnnU6wcOrZZ+Ivb8bzTn2+W6ggHfCR46GUp5Gv0GvnkC/alV6IfC6PTDqrJXbJoVMzOCgr0NHkSLqgKqqGjSKqRjf44H8TYkX6ZXBK7M8sIFsqocC+wXKnel55cHRgN6871QkTHYZcD1Vo3KmeKwc7S24Ex2ZQN5YaEt4YjUSrdJ4PAkyDx/JzREao4LkufrR+HTqPno3G1kmwGhtw8+rVSKczcQiEoQhfwffivld6lvSEpd/S0Q7DwGCs65QdGj6nYqtQshEyql5u/G2eH9/7tdlohEZAC114TlZLJjZALkfv0tFR9pRDL5Rep63HncWSK1ZJEr/qzTDWVJYAnMBSHkakAS/3Q0pfZNwwoooI9dCNY3asS4yN1+hQSqhQyGT1swtOETm7gC9/ZRmsCRNgNTTguHfNx/o718dSzY3H27EcThCrTYLm2BwXF8DVTgw7/PlR8f4Dwesvt4CWDBOqNN6QEk0aWKuIuOG1xNLHqR7Y3xfbL/GX/9avl/mZR0Mm9xuUyj0ljRuMgA0P2XAQEgi3/O/hvH/AngWlsGXrViwy5p2es2gxXn7xZT1o0/Np4CsU9DoLLEMIz6Waj8vDgZ2U2gd+tpR75B/Kge9T7f5j+3jNEm08VILYcXwXc4YVPdZk3uk7C25dg2Y6CpTg5sytZN5pAloV1VR7xSTzTmuvu5FqtrqVaKb0omQzh3tL5VGFiq3K/WTeae1AJqAZDgihSuad1g6TfKAHSusWNFYGQx6UZuyAH1w55jGJyUmIJJl3+vZhrFvQqCpFLRIymS0v+0wJG49zX1Sr6any2G233YaFCxfGUwEbGvQse7OfldcmW82jN5LKIzwi6fbv348bbrhBw8ah5Mceeyw2b95cgVRUMq8hvCbgAiFtRoFZJKecGw9p3Uq00TaewELYZH/btm2Vf0XivAX+pUPN807HmSRMQKuxQalSzTicSCPG39auXVuZKFPLvFPTIx7tBzFWrk9AGwVo0oj8p8oBI0M4az+Vqn3eaY1lkvKMxTQBrcZGFXUpkkwal86C2G7MM6p5pzWWTcoyltIEtFE0puldEjAJiTA1//6Uv9/2vNNRlGssASZlSUCrsUFFotFDlHkJrFTuD/YaaXOJtzmSeafm8CZpqCM9TUAbBWimM0DnwASMIJrnCYqcH3beaY1lGsswJqAdpkYliMPOOy3H6kyVLDCJbcj7yD7P8bcEmSXvWEgT0A4TaISHNt6Q807LPRYCCtUyQTLHzvEcJSU3SlCRmnLNWEkT0A4TaAKA2Hfjfb3TBLTDBJrpsdJZoKQifON1vdMEtMMEGqGqNu90PK53moB2mECTUSCmZ2r2LtCGG0/rnSagHSbQpPeAks0ETMATo575xsN6pwlohwk0AmYGZgUsHpfwhNhxlH7MeySvd1oVNPnizLgMRyJwY2WMZJPKk3tJPEgqciT3qOc85igOqbsjdb3TqqBJAxMKCQi2tbXp5arl3HApAaP7LqANlz85P/ADFjuO9WLGzijpjrR5p0OCZgLCfZFo4oqPBAyBlHl5D/P3SK6v5zxir7EOWOemhDvS5p0OCRpfkBKNXxa/qNmzZ4N/QiwvzpevtglQhIvX8zdVqaiAegbo7b4769CsN9alfOw8fiSsd1oVNDFUzRd8OxKNlcEKYqVKyn3ez1QDb7fS6yW/Kb0o2eTDNd+fKlSA4/5YnndaFTR5IRMKgjZr1iz9cpROQ2283gSM9xGpJvdO0oE2mVkfJmhynFBROww+R63DD5jnCdxYXO+0KmimISrAtLe3V+w0Tr4YaiOUxxxzDJYuXaqBZCWY0lEqL0mrw8YPmdLsQPVmHpP2YX7WJ8Eba+udVgWNBWYgUV6CL0Z4mpqa9LqZokarpRP4P2PlVUzMSuF9D6QGEuAGAsc6ErUo8Eg9EiQe42/Zlzo1BQSPjZV5p1VBM19SXlCgGikUZn65B6817z3SeyX5BoI4kvoQITEW5p0moI0w+DyShh1LeeRjJmyyfzjnnSagjVPQqFLNOJyo1sM17zQBbRyDJhJ2LMw7TUAbp6CJuhRJJtDRWRDbjXkO1bzTBLRxChrBYkzNBEwcMqaHet5pAto4BU0kGmNrMi+B0HFf4m0CIQPAhI/XHKx5pwlo4xg00xmgc2ACRqjM84ROzh+MeacjAk0KwJ4ABmJFx8sXUS1lHK2hoaEivgcHF6tdlxx/+zGzd7rOKOE475RdjmzH6dOn48Ybb8T27dt1e9L2Ew6km5KcmAFjs0xVQWMm3ozBPu6Tfj6wo6ND/2ZBhtp4LfMTTvlyBFjeb6hrk3ND1+2hqB9pq0wmg9WrV+u2ZHuefPLJWLNmzVuEB/MP7oMdEWjyIGYWYqdMmVJ54FD9nDzHQnGgJCXaxIkT9W/plhIAh7tHcn7o/uSDWT9sq+bm5kp7s8248TiHil1wwQV6eLnp1Qozko4INOpw0iyZqfb4IPZ1HqgAUhBJBS7zN6GT30kaN9xYrofW1lbdXjKymmWVdiVowgY11oFsPjnPdEjVyQwU00Ko2FgyVs280eB9U4yyECTfpH9w/uT34bfLBreBtLPZjUUemM9sX/Ih6pznxFQy71cVNEIlYPGmsm9ePJJ9Gofmg83YzkiuT/IcPgBFwIiAIEymwJBY3GA2xNQy264qaMwk1MqDeAM+jDemlBpqM6/nPgFjfjk+1LXJuaHr9lDUj3iPJkQSjyMXpsCg5BMmzDmqbGvZqoImUIj4lAuEcvldLRXXl6l5jbxAtesOzXECHy9nyGUR46WtfaiIWzx4UBal5bqiXKczLlf8oVTKyLwhV2H2dB6uVxrfz8wfX8PjA89JnrGbSluZ8FDoCBtsW8kjbcxUzlfqaSQ2mpl5/OwTsngl4HQuXtxVhQUorqbslJesZhRdKfRxoq9AEoXwWNE69ONBhQ6Utx/K3qfXh2det7JeZz/MBJmwVgW2AvLYhW60bV9Voo32xmP7+hDFfC8cuw+hCmAX01BhDqqwH5md23F05wxMnDYPv9+R1qClI4VIL3kdwPc9hCqEywVhQxu/WfMNTKPrP/koXLX6duilsH2uNFwGTUvISC+PHS+RTZgI+iDpOM5hq1PQuBQ1VaQHu9QHpWwopxe3LL8aUywLzQSnaRrecBSy/NefLJfnLq8hz3XRIw6ljhDZaZwxtxkzmH/CNFzzzTUatCAUiOQ5Jmgi6STP+JViprCpU9AUXP6Ltu9AqQJ6enZg4fHz0GFZ+O5Ny/HJ889Dx7F/hVcyETJcI53SJlQIioSMS1s7KBRtfO26qzVka7+9Co0zF+AL/3o7euzIWMK7H7R+1dl/zGyI8b5ft6BFWur4sAtdeGLbg5hz9Ax0v/4aVKkPn73oo7AmTsPjO7NaQnH9dc9RUB4lW17D+eQzz6DRsnDHf6zAM799ANbEmbjq39fALttidCZieGI1SdDiY2HsdCSqUypofKexB+hDhRyzlUdPz34E+TRUaS+Wnn8Wmo9ZiB2ughMoZHr2g7ApwhnkEDm9WHLJp3DaaadBZXbhsYfuh9U0G8u/e7d2HPryjiHVYtAImQaNKpvebQLa+AaMUiZSEUpabXpQfh4qcssQlKBefxz/fNGZsCYdixezCgEBc3LangtLebipN/HT9XegbeoMPPGHp6CCNJ7c+j+wmo/G5Tf/AHQcJCQSw5yAxjqvS9UZqRChDm/QcwygvECHHiI3DeW+gis+/mFY007B830cwaKggoJWl76bQn7Pa5g7rQMfu+TTMZz2Pjy59X9htc7Dsu9sQl4pZIq+tusS0PqFVp2C5iNUBbh+BipQUL7EuLJQ3h/xub9dCKtlId4IFPp6GS8rwPe6oFQKX//Kv2BmSxu6unMaND/1Op57Yius5mPwxW/8twat4MUORAJa3YPGWBhtMxthIdKg+aGCV9wNld6KKz/1IVgdp+KFXv69gEKxdw+U6sYLf3oYbZaFzWvXww0VSl6gVecfH/8trKaj8JmV39NB3mIQg5uAVuegMX5WKO3VoNl9JQ1a7CH2QhWfwj8t+QCsqR/As10KHuNnkQs/2INrll2GFv7RTXsnLGuSHmvHuBvhozNgtR8Pq20W7rn/V1raJaDVPWj0+himsHV8zMl6KOZzKKVfhwpexec/tQhW+3uwJ1BwIhlckMOK5V/AJI7JsziwswlNExow07IwtcHS4Q2r5ThYEztwx4/Wx/abDnEk4Y26dQaUChAGeZScPpQcGvohfJvdUFkody8uveg8WJPfhRe6435OBmwz6V4E9D4jH75TjDvIXfaP7sHvHtiMhhnzce1/3omMF4cxYmnWH5xNAraVwGK/mIvVyHj+HSHy2anuIVJFvLHzRczpbEG7ZWFea5PugmqcNgdW0wxYLbPwwbMvQqrb1o6DY9O2c+O+TjcP5e7GK7/7te6CumJV3NfZ25fuH+3xlr7OpAuqMnZo3IPGTnKXDR7AV7147sWHcfzRbboLqt2aiKktM2BNbIbVMQVW8zSc+KG/Q+Qp2L1Ug+wfTUGxz9PLQbm78Mg9d8Bqn40rbr4VbnlUctKpPlBQ1WV4I47yKzhFG6HiMKFUrDZ9D6rIuJmCrUIdqpBhQr4bh0H8sKSloAYtKMbDhIK0HibEYUU5Jx7PVgGtPFKjX3WyAeqrQ72ObTR6kvEXFymOxKAaZYd5GI/SiGI7i7aZRPl1fn1NLAk1LFSL43jg4zup2epTotWlXTpQlb2TEI3kXgloCXSHxDZPQEtAOySg/T8CnFf7MjY36QAAAABJRU5ErkJggg==[/img][br]Which ratio could be used to write an equation relating the sides and angle given in this picture?

[img]data:image/png;base64,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[/img][br]Which ratio could be used to write an equation relating the sides and angle given in this picture?

[img]data:image/png;base64,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[/img][br]Which ratio could be used to write an equation relating the sides and angle given in this picture?

[img]data:image/png;base64,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[/img][br]Which ratio could be used to write an equation relating the sides and angle given in this picture?

[img]data:image/png;base64,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[/img][br]Which ratio could be used to write an equation relating the sides and angle given in this picture?

[img]data:image/png;base64,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[/img][br]Which ratio could be used to write an equation relating the sides and angle given in this picture?

[img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJUAAACnCAYAAAAYEB7pAAAL5UlEQVR4Ae2dPdPVRBiG/Sc6Y62jjoWOM4jWjCVjjRXYaYd/AH+AYI0NNvhiSU9NzVDSQknLca6D98uyb/KeZJP9Su4isznJJtmPa+99nt1Nzgdv3rw5eHMZrMnAB2vezPcynDBgqKzUq/dUhspQGSp3se13sVYqK5WVykplpVq9FRiqHUH19OnTw5MnTwyRu9P1hhR+u337cPePu4bKUK0H1ccffmSlMlBHUVnF+3vx4sUBqAht87Rv8+Suo1Wgevz48RGq3In1/fsAdhWosKWwqVzpfVR67npaBapbN28e/rp/31DZplrHpnr9+vWx62NIIXcL8P37UMLFSvXs2bMjVC9fvjRUVqp1lOqfhw8P3337rYEyUOcMLFaqH69fP/x+5875Dd1F9dFF5aynZKjw9lAoxqfoAnMm0vfuC9RkqOj22GxL9VXhJRpoMlQlEudn9AlsVqgYZmC03WrWJxypjTobVIyyY2+xYXt5XnA/YGWBCmUSUAq9LMZQLfLmDNV+ABrqIrMoFQ8Kuz/U6uzsbBGoQ4n3sTbhzQYVFf7vo0fHbvDPe/eOocez2oRg7caZFSrNC5JolMsGu6Fa3F2FULGagSUybOyv3Tp8v3aALaZUVDowoVZe0NcOADkaY1GoyADjVYDlIYbtglUcKsDi/UA8Qr8nuE2wqkAFWExGA5ZXjG4PrGpQAZY9wu0BRb1WhYoE4A2y0M8e4XYAqw4VMAEVcAGZt/7LoDpUQGSPsH+QQjFoAioShMGO4c76qzCB3u8PuGagAh69Pu+hhv5ACht/U1CRMHuEfQNFHTYHFYnCaGfU3R5hn4A1CdXz588Pn33y6eGnGzcMVocecXNQ6Y1nFvV5jtBKdcFrC5e+hIbc0D7GOeNVrGDQSxK6HtCGrvGxNqGrqlTYTIIJoIa8Po558rlNeMYadXGoUB+GDvj+ArCgTEMwhQm2R2iozrsqdV/hdxfw7IAEkOa8ZKp7zLkmBNP75cAsolTAtRQGukqAZPNQQzlAUhpjEahSEjZ0jeYI/ekiQ3XeHQ6BMvcYYGGL+Ruj7YLVlVIJQHuE7QJFHXUJFQlHqVAsjWkJOIf1gesWKuDBtmLU3WDVBylszF1DZY+wLZgEVlWogILhhniIgGNMzQwpUHyMoQrUinEsZcphXdiqQqVRdSASCIxDYStpY6CUc1IlpnPiLg/QPPlcFyTVH2E1qJiqAQTgEVTy6rSkWO8GAg3HAI5EA1o8yaxrCcMMer88bFWgkrJoXbqgwqOLuzGUCYCIC4TEBa4YKuARhLqfgSoPFGVeBSqgULcWKhVA6biA4JgAAjrAotuM7TDF53rixLaXzjvMD1pxqAAE9REUMVQCSJUPVLF66dxQKNsLcPWMoXg+lg+uolDRLYUQUbHh71NKNRUEYEKtZINNvc7x1gGtKFSyeQAp3jh3mU01t8Jlt8Xd6dz7OP580IpCxZgSahVuwIVnxzkZ7kPeX0rlyiPU/VLu4Wsah2qogsLuj/OAQNclJVuqNADFvQB26Pk+Nh+aU2VWVKmGEoNqxQY1v4FrLQ/OHuH64AzVpY5Vh0oJyR1itIdeZ+7n7fn+u4EK9QMqe4T5VWs3UKEc9gjzA0U57woqMiwPMx5k3XN3tXbedwcVBaihBsK1C9T326FSqdLtEebrCnepVAKLaSHGxOIhDZ0/FXKdxtMUWv12rFQAAxR4g2ypYAk8lM9DFm/Vb9dKBRBreIQY/V5u86473T1UgKXVE0xoS3mmhvIm3e0ZqgvwpHiEUjkPT7wDisZopQo+f4hdhME9Zc4RGwwbyt91eB8oQxUApe5OL6ie+koNXSUAYuRrdeoUGPWcLYdWqgisqR4hAIXrwoZWW2wZnMvyZqgiqCgsvaDqru1i13YZTDpnqAagonBQIrq3FI9QhbvX0FCNQAUQKR7hXkEK822oLoGKgpJBjs0UFpz3x7tGQ3UCKuCRR2jvbhyksJEZqglQTfUIw4Ld876hmgAVgAAW83tz3pbeK1iGaiJUAEL3B1iMvO8VmCn5NlQzoKJA7RGetqsM1UyoAIsJZMaw/ILqMGCGKgEqwPJy5GGgKBtDlQiVPEKv9rwIl6FKhIoWCVh+QdVQre612SM0VKtDhWJpSbE/WfQWMHd/C7o/gNLmTxa9KwtDFYAhQFJDe4RWqnOVSYVo6DqWFy95QXXonr0ds1KtqFRUfugRst8bEGuk11CtDBWVsneP0FBlgAqw9ILqHt8JNFSZoAKsvU4+G6qMUAHWHj1CQ5UZKsBa+ski7tHTZqgKVJgmn9f4ZFEPcBmqAlABgjzCPbygaqgKQSWw9vCCqqEqCBVg7cEjNFSFoQIsvaBKl8jvrW2GqlKl6gXVU58s6hE4Q1UJqi17hIaqElQokD5ZtLUXVA1VRagAC7sKj3BLL6gaqspQAdbWPEJD1QBUgKUXVLfwySJD1QhUgLWVyWdD1RBUW/EIDVVDUKFWgNX7J4sMVWNQAZYmn3v1CA1Vg1ABljzCHl9QNVSNQgVY8gh7+2SRoWoYKsDq0SM0VI1DBVisGO3pk0WGqgOo8Ah7+mSRoeoAKtSqJ4/QUHUCFWDpk0Wtv6BqqDJDxVxeuMWrPfkNJAwd0M0BjzbOxfH1ySKGHBSvtdBQBZWYo3JY1hJu4dopjUUxgk4cQq0EZckxv9nif/LCI/zmq68vAJcj/Sn3NFQZoUJlgCVWIFUUwAAI54mLMa5RdM5JqdjXNYTE+fLzL47Ajd07jF9631BlhEof6RiqVJ0Luze6QcAiPiChZGwhVADFEMOrV6+OYYsvqBqqAlDxkgMwAIiURVCFwIXHgI2ukk3gYU8BmO7BcX5L3cJ71dw3VBmhwj7CHkKBpEJSohAgATB0TOcAiK5UgOm4ruH+OlY7NFQZoYorF4VBWRgaEAxhHA0ZhMe0Tzc3Bo4MfkLFrxkWgSr0fi7br1kQJZ4tqKj8IeWRmsVpIb4ULj6n33SBQ0qm8yXDIlBNyRAFMiVeT3EAR0MEAAU0oU0EKCgQcVCpMfuIeCjbqbxjf3EPPfNU/FznDVXG7g+IaCxUtBQ67MKofIx4nQMeGeGq8CkqpbhcC6S1PUJDlREqKhuF0TamICjamBIB3ZyFejwDiLlOsJUODVVmqJZWKCo2BuPYvWWvxSPxY/HXPm6oGoYK9aIrS6l0uk2AJEy5fsk1hqphqLC/lgxsolSAhXItgWTutVmh+vvBg2Ompsg3mZ+b+K3H18DpknxiW2FjnZ2dHb3PKXWx5Hlcmw2q0KuZ0loM1bslL6pUhgjGDHjFORXiEV69cuXcw6Scl97z1DOzQEVrIPHh9sO1a+dzWZrTCkPihr+9f/vw/dWrh59v3VpULr/+8st79UA5L+lSTwHF+WJQ/fz/NAN2grdyZSC7KmzgXUIFrZo2IDP06aWNxSktai9xStdFFqVSZdF3s5UwDvVMhxdtM8qkZF1khcoVPFzBWy+XRVChQEwhYCPl9ihqVsQelJZB0rgO+Z0yeJoEFfYRI73YS5ppZ3/OHFVNSKY8G5DwQGXgYhfWmvaYkt6lcYbqj2GhlDnE2VCFM+Gh8U0lxDPsSzNa83ryRoGq9WraQ79rpm3tZ5NXoIrzRkOiF5r7vNlQ4UnwsD10CWFh0mCGWnMYp9d9NZgw/dTvEGhhnLH9WVCpYFPoHUtAD8dpyRrv2WJjIm+YMeH4oYYhUupnFlTIY0ivZJNjbCkJaP0a5Y2Q1ZmtpzclfdjHQBXOYtAbpa6QSIIKmEg8ygVo2B6pCUgphJLXkD82uggKOsUbKpnelGfRYOJ8ARhqlXK/JKiGErBlz0gFSx4pbP3eQqjeR0KhPAFaqjc/CyqUSbKorkB2VgyaEtdrSL7itAPU1uxJwKFOw7zKrIlBC+Nctj8LKm4EPCQitDX4nZqAyxJX8xzwYGfQBbCvcbmtGerkL1Zf6pj6TS3/2VDpQbI1tlbIyh/50myBvKKt5lV5XitMhmqtBPg+25sfNFQNr1HvtcEZKkOVbDuNQW+oDJWhGmsdPt6ObWalslJZqaxI7SjSWF1YqaxUVqqx1uHj7SjYfzyKArIzpcgLAAAAAElFTkSuQmCC[/img][br]Which [b]two ratios[/b] could be used to write an equation relating 2 sides and an angle given in this picture?