Label the sides of the triangles below with O for Opposite, A for Adjacent and H for Hypotenuse for the indicated angle of interest.
Which side is opposite angle B?[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAHwAAACcCAYAAAC9Ws88AAAM3UlEQVR4Ae2dO2gbSxfHN+/3q9vWkOIzpIg7q8sVpLAS56HEjSEQY74iiFQmxYdIY5ZbBJGHozwRt7ggFwGlCOgWF5QmIBcBOU87iRO5SKEihYoUKlL8P86uRtqVdiU52ses9hjMrvYxO3N+c/57ZnZ2RwH/RcoCSqRKy4UFA49YJWDgDDxiFohYcdnDGXjELBCx4rKHM/CIWSBixQ3Ew69evYqZmZmImVqO4gYCXFEU0P+dO3fksEKEchEo8KNHj2J1dTVC5g6+qIECJy+/cOFC8FaIUA4CBT41NcXS7nNlCxT4xsaGDpyl3T/qgQKnYi4tLenQWdr9gR44cComS7s/sOkqUgAnad+2bRtY2r0HLwVwKub9+/dZ2r3nLYeHi3ImEgmO2oUxPFpK4+FUvq9fv7K0ewRaJCsVcMoUS7tA481SOuBUTJZ2b2BTqlICJ2nfvn07R+0ecJcSOJWTpd0D2rJ6uCjqmTNnOGoXxnBpKa2HU/lY2l2ibEpGauCUz2w2yx0yJmDDrkoPnArI0j4s5vb5oQD+7ds37Nixg6P2NrffXgsFcCodS/tvM7acGBrglOuzZ89y1G7Bt/UfwQP/nkeyOYpVjGa1LGfyqDXLxdK+dcCdZwQPvJmj8qIxdDm5LPACteWk7tGKCfqDBw84au+kuIXf0gAXcM3AgTK0pvdrK+1SsbS3bbHVNcmB15CfIc9PIv+9XTTqkNm5cydH7W2TDLwmOfCmh5skXZSMpV1YYmtLqYEb93UNZYcyTU9Pc9TuYBunzdIBd4rQ7QrA0m5nld7bpANuCdpaTTZnL3/48CFH7b0ZW/bKDZyyuqIZTbNFJ2EHWNotTHv+CA9wxdnLaVz7rl27OGrvidrYKT1w0T43d77YlYul3c4q3dukA66Ypbt1D1dg7njpLoax5dy5cxy1OxmnuT144Caolgi91b/uLOWdZWNp77RI9+/ggXfnaagtjx494qi9hwVHDjiVlaXdmfhIAidp3717N0ftNtxHEjiV021pr73MIjU9DlWPLVSMT6eQfdl+lGtjWyk3jSxwsvb58+ddiNprKF6PQVFnkVutGxB/1VF5OgtVUTG7XJUSrFOmRhr4ly9fhpb2xsu07tWWLl/dmnUU5ujRbQrFZj1wMrJM20caOBn68ePHQ0Xta0sx/fz0q25sxtM807P6vk1MqiCDNzO7rzj8lpEHTiYaRtrrL1I6cPVKHlbxbqB0Q4FyMoOK4CCAH48hfjre9R87rmDiVutocZavy0gAH07aq8hfUQ3ofywgL+7jmzT4MgZtpdEGRsCnch0VQ+yuIDNpUgOx2edlJICTTYeS9l81FG/GmxG6AvVEHLHJeeQ3O2h9z2PhqVUHxBGkFLHFMkzVQ+zydRkZ4GTV35X26j8aklNpFNfXUFxKIXHcGGGrHE8i82qQiI28O4Hchq9sbS8WKeCfP3/Gnj17ttQhU1kiz05avZmaZcspxPQ2eQza695+S9499r9S4N5NNSBSwKnAT548GTxqb5SwQFBtBlFSWtW/m+PmzU/4uvyqityUHN4dSeBUaPrMJz2Z6/u9dhF1OwCH2N8DeOPfBYzdkMO7Iwt8cGmvIHOS7tfzKPzocl3Un89DUVSkXjjdx+Xy7sgCp4IPKu2NFU2/V6vTGkqb4l7dQO2lhoSq9Iy8de++VoRTdeiuQt5vidw93GzSgaW9VkL2WhLUcaIP0lDHEZ9bQK7nwxPy7glkJJvwIdLAP336hL17924pajdXmF7r5N3qXEEq76b8Rho4GWBQae8Ft3ufnN7NwJukLl68OFjU3k3Wdovu3U6Rve0Z/m2MvIeTqd2VdsO7LX3s/vHse6W+wOvrReRuzCN+wr3OAzE6tW/ufDxgqL52H/M57KWcgdcryM6MgfqLteUyqj+HvVT7fBmBU+7clvZ2ieVZswe+WcD8cQWx6wVUf7mfWVmBk7Tv27fPk6jdfSv+XordwH+WoU0q6H7g73CBXzWUllJITo612qiJa1mUbXqmRAqyAqf8jbq0dwGv3KYhPQPer5uVY+JGsSX5jY08ZlVFH/RXMH2mQ8CmpczAKX/JpPFQpG9fu7lQIVm3Am+UkCZYp7Movy9Am4thTH8EOAY7r609m9XhTdy2DtupPo3bbhc2kR34+vr6yEq7FfhrzRjVcSIB7fka6s37d30lo/cbK5MayqbgrfEqjTFFRfzhmmBpLF+lDS++Umh9Y818gOzAKa9uj2s3lz/IdQtw4bGWNzibuROv7Q4yCK818M/hsWEYgFOxR1HarcCbH8KL243L0gftdYzSdKiqlVsTUJSY44ODsAAnad+/f/9IRe0W4MIz7Ty89bC/z7hqQ/7jSP/r/FAwLMCpPo+atFuAYyOHuNOQnl77ID6gp0D5TwLpv0pYC2mzzE60Ll26pMckoxC1W4GD+oHpmW93s6z6F80a2Gt0R9NUjRpKfyagKmOYf2Y/ZDdMHk6lWltbGxlp7wAOYNNoR6vTmVbniYjSY9eLDoPsO/2i99CgsAGn0o2KtHcDp9L9KCN7LYFxapMrCsYm541mWidXx99tibf7NksYgVNRR0Ha7YE7gjTvqCJ/UYX6RwYVMdSrtZv2UWVRob1ubWythBU4SfuBAwdCHbUPAVx82noBpU7gGzkkKPibNL1o18Itf9eqKatdq2H/PNgQwAHxVkZ2td56q6KxWUR60uhLz6131gTDfmH1cEH/8uXLoY3ahwJOBtA/hTEj+tzpfp9EaqmIqnMz3Oh2VYa+tLC/78swS3sgVg+7h1MNC6u0M/Ah9CGM0s7AhwD+8eNHHDx4MFRROwMfAjidGrapOBj4kMDp9JmZmdBE7QzcBeBhknYG7gJwSiIs0s7AXQJOyYRB2hm4i8A/fPggfdTOwF0ETknJPu01A3cZOCUns7QzcA+Ak7QfOnRIyg4ZBu4BcEpSVmln4B4Bp2Rl7Gtn4B4Cf//+vXTSzsA9BE5JyybtDNxj4JS8TNLOwH0ATtJ++PBhKaJ2Bu4DcLrE/fv39Sdq9DHAIP8YuI/Wl2FcOwP3EbgM0s7AfQROlwpa2hm4z8DpckFKOwMPAPi7d+9w5MiRQKJ2Bh4AcLrk0tJSIFE7Aw8IOF02iG/IMPAAgQch7Qw8QOB0ab+lnYH7BXxFg+3HknyWdgbuC3DxRQz7mYXfvn2rR+xHjx7F6qq3k6QwcD+Ai/nNFAXd85AbGbh3754vUTsD9wF4bVlDfoVmI3ae5ZCy4UfUzsA9B16G1pz/pGuC+Y5r+yHtDLzD6K7/XNHaMk6BG3m5wzdo6dpeSzsDd52wNcHyojlQEx9CMm+zHk+/vJyKI1Dg4tMfvZanTp3qtkhYtlCw1uHN4qvUdt+vE8V68+YNjh075klfu/TAqTKE9U/Ata3QfeY180raA7GmMEA/kIMe1y+dYPa3gzXr9UWbPIm8wxQh4ngvpJ2BC+u6vTQHax1pC893apOLw72QdgYurOvq0gjOHIG2OmL6e/ndu3dd7ZBh4K6CBiCaXtT80v+tUI22uNhnLB0rRjNvA097PUBZGPgARgr6EJJ26md3o6+dgQdNc8DruyXtDHxAg8twmBvSzsBlIDlgHujR6bDSHihw0c7mpTWIG8Qev/vKUiDAqbt0kELxMc4V4Xe7nAMBPqCC8WEeWICBe2BUmZNk4DLT8SBvDNwDo8qcJAOXmY4HeYs28EYN5eUMUjRJz41Sa2YmD+wsTZKRBV59voC4qiL+3yyK6+1puKQh41FGIgi8gfKfcahqApnXPeba8sjgQScbOeDV5VmoSgzaiv0kel1A6lUUb80jfkI1OovUccTnMijVuo4MxYZoAf9RREpVoA56v94sIkWzLE6mUNhoVpAfFeSvx6BspdJIVBUiBdyYA13BwosqSkspJJpeq56Y1WdPtvp8DYUr5NUTyHS+7tUoQztJ022mUPwhEc0BshIh4ASQ+qZVxK7lUP7exNuooqB7rIrZZdME9xs5xGnEyumc7ZzpldsTusT3G60yAANfD4kQ8Ao0fT5065Aj3drCY5V5FJoeW3+RMu7ZN8u2QGrPZo39HePObQ+WaGOEgIu3PmymvwZQvmk8mUq9MCJ3MbLU8bUgMXatz/hyiVjrWYkQ8AoydN9VbDycgC8awIVEs4fLVlW3nJ8GSjeMe3j3az42+/rdw2/xPXzLCPw+ofEyDVWxaZY1SkjT/X0yg0orU+INEZso/WcZaY7SW5aSeKWB8qLRhk49rxp95yJKp563VWvDDJt5zOoVIY2iiOp/VJCbG9Pb4al/wtf7EqF7uKiHDaw91zA/SdCoLT2OxLWsc89ZfQ2FRWtPGx1f3OyoHCJ5yZcRBC45EY+zx8A9NrBsyTNw2Yh4nB8G7rGBZUuegctGxOP8MHCPDSxb8v8HBOL3u/4qqFMAAAAASUVORK5CYII=[/img]
Which side is adjacent to angle B?[br][img]data:image/png;base64,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[/img]
Which side is adjacent to angle A?[br][img]data:image/png;base64,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[/img]
Which side is opposite to angle A?[br][img]data:image/png;base64,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[/img]
What do we call the side that has length 87?[br][img]data:image/png;base64,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[/img]