Question
Choose an option that relates to AD, in the given figure.
![](data:image/png;base64,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)
- Median
- Altitude
- Perpendicular bisector
- Midsegment
Hint:
AD= altitude of the given triangle.
The correct answer is: Altitude
In the given figure AD is the altitude.
Related Questions to study
From the given figure:
![](data:image/png;base64,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)
Find the length of the sides of the triangle.
We can find the triangle side lengths by using the Pythagorean theorem.
Side length =
13, 13 and base =10
From the given figure:
![](data:image/png;base64,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)
Find the length of the sides of the triangle.
We can find the triangle side lengths by using the Pythagorean theorem.
Side length =
13, 13 and base =10
Find the value of x.
![](data:image/png;base64,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)
Find the value of x.
![](data:image/png;base64,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)
Find the value of x.
![](data:image/png;base64,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)
Find the value of x.
![](data:image/png;base64,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)
Find the value of x.
![](data:image/png;base64,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)
Find the value of x.
![](data:image/png;base64,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)
Find the value of x in the given figure.
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJUAAAB4CAYAAAD7eLATAAAgAElEQVR4nO2deXxU5b3/3885Z2Yy2SFACDsE2YLgAsiuAVkEqbi0Wr29VmuL2nqv2tvltlZta+/P1trdWq3602v707qAC4sIikRB0KDIlgTCHpAlhADJZGbOOc/398eZGSYxCGiAAPN5vSYzOetzzvmc7/N9vtujRERIIYUWhHGqG5DCmYcUqVJocaRIlUKLI0WqFFocKVKl0OJIkSqFFkeKVCm0OFKkSqHFkSJVCi2OFKlSaHGkSJVCiyNFqhRaHClSpdDiOGNIJSKkAi5aB1o1qZJJIiJorROfptu4rptYHt82RbJTA+tUN+DzECeFUgqlFCJCQ0MDWmt8Ph8igt/vxzRNTNNM7Oc4DlprLMtqtDyFk4NWTSrDMD7z/8qVK5k3bx5paWkMHTqUnj170qtXL0zTRCkFeGS0LOsz+6dwcqBac+Sn1johpeIIhUK89tpr/Pa3v2Xnzp107tyZ7OxsunXrRseOHRk8eDBjxoyhoKAgId1S5Dq5OG0kleu6AASDQSZOnMj+/fv5+c9/zrZt2wgGg2zZsoUuXbowZMgQsrOzE11nilAnH62aVMmIk0MpRdu2bbnmmmswDIOHHnoI27ZxHIfq6mrC4TAiktClXNf9jLRL/p1Cy6NVd3/NIT7CMwyDffv28eyzz/LQQw/Rq1cvBg4cyAcffEDfvn25/fbbGT16dLPHEJEUsU4gzPvvv//+U92I40X8PQgGg3Tv3h0RIS0tjdtuu43s7GyqqqooKSlh7dq1+P1+8vPzsSwLrXXC9JAaFZ44HFFSHQJcIPfktueYECdHvEvcu3cvpaWlTJ06Fdu2KSsrY9GiRSxevJiGhgZGjBjBlVdeyaBBgxL7p3StE4cjkqoasIGCk9ueo6I5y7lhGNTV1REIBPD5fInt3nrrLV599VUqKyvJz89nzJgxjBkzhj59+pyKpp81OCKpIoAAaSe3PUdFUyu7YRg4joNlWUSjUXw+X6Pura6ujsWLFzNz5kw2bNhAUVEREydOZMTwUbQv6BA/EoaAEu+aRSlQIAKG9zOF48Bpp6gfD5K7udraWmbPns3MmTPZX1PLyOFjGDphDOddMJhObdrjE42yBY3CtQx0jFSW8j4pHDvOeFIBjUwKe/bsYc7rs3ny8SepVw5fv/7rTJk4ie4dO5GZkQmWiYOgxZNQllIYKVIdF85oUsFhHSxuPI3rXNs2beUfLzzPSzNn0jYnh2umX8W48cUUdO2ClebHUGCiMJWBUiml/nhwxpMKSJBKKYVpmojrenqSaVJ3sIHfPfw7/vrXR+jesyvfu+sOJl82mdzsLHBdTDEw/K1Ns2zdOONJFQ+BSe4CtXZAuyjDj8IgEgmzcdNm/vcfT/PGgnl079aZf7/+BiaMm0BO2/aQklTHhTOeVM1B0Li4mPi8EZ8CEY3jRClb+wl/+eOfeWPeAkYMG81/3nUXo4o9y7zjOI2MpvGBQDzGy7KslKWes5ZUgoOLkeT6VICBRtth9lXvY+myj5j5ynzWlpdR1K8rN910M6NGjcKyrIThNR4MaBhGI9/k2Y6zklQawY2RKnHxAoZEMQCtLUJRh+179zF73ts88+dfoQyTKVOm8K1vfYs+ffo0Glk2DSY823FWksrrADVgopMXOw2YjuAqP3bAYu2OA7zzXikDMkLsqd7HrFmzqKmpobi4mOuvv55+/fp5R4uNMFOk8nDahL60KERhxMLztQKISxqNUiaGZVIdclm9+xDRtu2ZMr6IulADfc45h9lz5rBs2TI+WbmSy6ZM4bIpl9G9W3eUUrium3JUc7ZKKol9cBExcRQ4SvDjgDYImSbv79jNqvVVjBnYh4vaB5GIgQoY7K6upnTpMhaWLmPDipVkBtK4ePIEpl4xnW75+YlTNHVaNxfFeqbitAx9aQkIgHIQbeICrlJY2sQ1DDZHbD7auo0MsZnUrycQAe3HAbIz0+nTtw8DL7qIDGWxsXwdyz/6kO1bt2JhkJWTTXp6ekLXin8nd4/JOtiZiLNWUomAqzRhMTCVpwf4bIj4YN6aTWzcvZdLzuvLgHa5+IlQ71oEtMIShYnC9oMP2Lp5E2+9PZ9FL85i7869DLxsIlMmTWL48OGkp6d7p2tCojOdVGeppBKUCK5h0KDAQgi4niTZFLb5ZNMOOqWlMbZvNyxXMFzFIUvwi+DXgjYE0S4RHNq1bc8FRUV0PlRPxZrVfFC1nVUrV2LbNunp6aSlpREIBM6qUeJZI6niF+k9ShfEQRMgpMDn2ARch4ZAkKfWb8YNu1zdsxsF6X4MG7QDdRkOaaKx0DQYQlAromJjObDz6Vnsr1xL3vQJHGjXjX8+8zQlJSXk5+dzxRVXUFxcTPv27fH7/Wc8oeAsklQacABvbCZ41iqLgOtiiQbToKKugRUVlfQM+rioWwFiuDimYPgM0uyYgdPwzBCuESUgNmrjNmpmLULlZZD/tcl0zu/B+PHjueCCC3j33XeZOXMmNTU1iAgZGRlkZGQkFPijxcqfrrH0rVdSiUskHCJqa8xAJml+MykERRDHoSEcxdEuKAWmj/S0NKxjcdOJxrWjhPxpZNbV4/h9GH4/z731PsGDYS4u6kFel1zCfkXY9KMljTzbAMOzxosIYV8t6RFY//SL+HcfotNXxqHO74/hBjBNrxG2bbNs2TL+9Kc/UVZWxnnnnce3v/1thg4dSjAYTDTnsE/ysJ/SMAyi0ehnsq9PB7ROT6l2YfPb3HtVZ/JycrnsN0tYXZu0PrKH8lf+wpWDzyMnJ4ecnDbkjL+DmWvCRNxjOYHC8PlxxIVAAKUMth2oY9vOPWxY8DabXn2d+vJyrLoQytUgDrbSuK4gSqGUgakM2LCV+vWbkMKu+IsGABZmzBdo2zaWZTF8+HCeeuopfv3rX3PgwAG++93vcv/997Ny5Uqi0WhC14pHURiGkSBZPG0/nsZ/2kBaGXT4kKz/0xjJSjPj1iQZ98BiWVkT28BeKwt+c630PGxt8j6GJYx4WJZU14t7DOdxXVdqdYPoeltqtMgvZs6Vfyz7WHatqJBtDz8ic667Rt75yX+LVG4W7YalVrSERCQsIq6IuFIra2+7S3bceZ/oijUi4oiOiGjRorUWERHHcURrLY7jSDQaldraWnnuuefk0ksvlX79+sqdd90lZWXlSY2yRfTh/ZO/479PB7QySaWJhDcw+9kDTLzrSX7+rWyyDXCSX1I3RK2RTeeJP2ZeWR27t5cz/29Xetr0+/9iflk9B47yUms0tkTJcExC6RbvV+xAMgro3qsnbQd0oevXvsLoW++ina897/zkIdb/8TFk21aCdhifHUKo42DJSkKhCNaoodR3K6DODqOU14U5jgPgxW7FbFQ+n49gMMiVV17J3/72KLffcTcVa0q5vHgw7fPa0r7bQPre/CrVSjU6RrKP8bTBqWZ1Y2jRTkj2Vm6SXQdsWfTj9tLOQMb8IklS6ZAc2LdLtu3YL1EREYlIePWvZQgIXC5/3LBPDjU5alhE6hudJSquHBSxtVSIyH3zVsv8qho52CASbmiQiB0SaYhIdNc+2fvBCvn4oftlyahpsv93fxHZtkUkVCv7vv0T2fXs/8qB/VskJHUS1rY4IqJdVyKRiLjuYXmptRbXdRPfUS1S/f5jcveEkULgEikY0FsA6dOmj3z1yXUn7vaeJLQy359CmUHaFfYEYBPqs5ksKkh22yDZ8f8dm9Uv/YFKoOP132Zi+ywym+ziE40pGtfwRoGGCKYNIUNYtOZTgmlptM9OJ2CCiYk2DbQy8eW1pW1uECvPQuf0Y3fFWjY+8n/JyMgkUltLt769Cea2RWHioLBFk2YYiZDlRs1Osqb7FLj7N7DP3s95//4rHrqjgAVPPsJLj/2D+X+4m6eN65g+/Qpyc3MbZWQ3B2lmnHWqpVor6/4aQzjSwDS2XDew/eW7+NafPqV2xH/xi3uLKcz67AM1RGPoCFFsojg4WpCoYq8tLF3yEf16tCEvI4BYDqZlYGIiKpZfaAUI9OpH2ysnUfDVa+laNBR3/W7aXzKCjK7dsbQFWhA08WfZXO2G+P9xcgTS0pE6A+1kMvzc4fzXjDH0C0Nej4E8+dRT3HzzzcyePZtoNJoIBHQc5zMpaq0RrUxSHQMEz4RAHRv/9WNu+dkTrOpxBz/9zQ/5et8sPkspvIQ+I5YdI97oLewPsLJiOxf0LqBPxyyyDC/RATFQxIhgAqIwtQltMsg+ry/ZPbuSnt+GtAFdibbPJKoEJQqlfASO4zJyhl7F1PFlVDz7PaZ/6zzaHNrN+hH/wZ/u/R5VpW9QUvIOjz32GEuXLqW4uJhhw4aRk5PT+Fa0UjtWqyZVZsB7wFYgk6x4/r2CQztWsuSpX/PkGyWUD/4f/nLP9/nu+c3SCQCtDFxl4hMTwzUIK4MtuJRVbmT6+BF08PkICphigMS6XJU4HX5t4FgGEEXn+cmcOIwwDjYuCgOfSsPav5aSN2by0vJDtO95DoMvv5mvFJpAhIoXH+bFj2upDWvUBddw8+Sh9G83mEnfvh0j63kWbgGjexHfuP12Lh/SDn3Bt5l66SW8/PpcFpeUsHr1asaNG0ebNm3YsmULtm3Tp08fbrzxxlYprVoZqQTXrqbsjdcorbFY/2GIBoGq91/g6T98zPARFzP83GwqXv8dd977PBWBzoy6vRPdK5/nmY9tHO2Se/40JgzMJzugEAFRggMgFqY2sZWixtYsLN9E+3bZ5AcDBB1NwIzZhySW8BdnloDWEHUFy/TjagftaBBF0PCjTB++Q1soff8dZr6/ltXvL6fisT20rejDyL+Owb/uWX5x558oH3QhXfVG3py7Dpxfcs83LiSn8BKu+eklXNPkLhiGQXlOX757Z18uvOB83n5nMfPmzePdd98lHA4DkJOTQ25uLldccUXrI9apGyM0B1caat+T+3o0sUHFPh2v/aO8tXSZPDujb7PrAcn57puybrc38nJdLSGxJSRRcVxHHFukxhVZtveQzPh/C2TdwXqJOCJO2BEd0RIbvoloW0Q73m9XxI5qCUVtsV1v9OaGbNER7dmlXBHZOFtefu0VebJSRHa9LvcOQMz0u2WuRKXsgf5Cxg9krisislH+emk7Gfv1X8sLmz7/Tvyo9IB8XOtdx0crVsjIkSMT16iU8q41JyexfdyWFR9lnkq0MkmlMKw2nHPJhYwoM3E0CeU3Wn+Agef3IK9NLtJvOH2LguRk+JP2FbRj07OoHXFdXeJdmAblKqImVEdt1m6v4tw+hXTKSsfnurEMLIVWcSEVf34mokD5FGlY2K6gDAMJGCjtxc8oF+g1lat6eefa9/Eh7GxF2/6F5KPI7N2f/J71bHp9IcsKfdhtMnGNgxysjQLJ7W+MBy/M5skqzbk58LOf/oSlS5c2is0CT6ItWLCAQYMG0aFDB1TMxgWNY+fj/580nFJKnyh4Jm/RWiQqrtiOI27Ylb2OyNy9++TumfNlVcSVsCsikQaRaES049mPbHFES0REIiLiiKu9Xzp22KiINMQ+3hZy2IJ/cKW88cBk6ZZzgdz6Zii21zJ5aEAv6dGmrbRtnyN+kM5XPSjPrzu6NHl9v8jm2nqZNOHSz0hky7KkZ8+e0r9/f/nxj38s5eXlcvDgQYlGPetdXHKdCul1BpHK8T6u96W190i1iIitJRoV+bimTh5Y+rH85cM1EtLidXmRehEdEde1Jay1RMQVV2yJ08WWmOE0TlRXJBRbFhaPWN5jPCCrnv+RXNWnqwy6c6HUNdvGVfKHkb3k2lselwV7j35F9SLSr6ioUZcX/0yYMEGi0ag8+uijMnbsWBk5cqQ88MADUlZWJqFQKEGkZGKdLJxhpLJFxJVG72TUlmjEkT2OyOzKKvnZyyXyqYjHBNf1CCW2OOKKLbqR31CLSES0HNK2t32cQXGRFfVUL5GwfPzMDJnQo6sM/s83pFZEXNsWV4uIdsW2bXFFZN+LN8igvClyy+PLZfcxXFGPHj2a1RunTZvmXVpMKtXX18vDDz8shYWF0rdvX3n00Udlz549orWWcDgsDQ0NKUn1xeCRyhVXouJJKtEiErYlYmsprTkof31/rcxZs11qHS0SCYtoWxxxJOLaEhVHHK09xdv19nXFI1WDjopEXBFbi3ZEbO3p8mLHJOG2WfKrG/o3evAZHbrL3W+JyLwZkpPujy3vJjc8skTKI0e/moKCgiMORiZNmiQi4pHVdcVxHAmHw7J69Wp58MEHZfjw4TJu3Dj5+9//Lnv3eiLRcZwWv+NHQovEU8kxGuFObFlEF8+ubeCIwsJzFygH9muX2eUVbNy8k9sun0CO2KRh4xom2vQhAqZSGKJQSSGiGnCVgDj4HAWGgSgD2wCf6yn1okBLiLpQPaEGF58y0aJRhkUwO49MDrH3QINn3hCLjNwc0gPmUV0ZeXl51NTUJP6PK95XXXUVL7/8cmK5xBT3uNU9Go1SWVnJY489xty5c+nVqxe33XYb06ZNa9Z9lPzsjvU5Hg3HRar4BSRnihxpPXjlpi3LarQuOV6oZWGjARsLnyO4hvd/wAiwZOdeFm7azuj89lzcuyuWK2AKKIXErJxHapHE/qqEJT9m1G+yTUte0cCBA1m3bl2jmHYR4cYbb+Tvf/97s+RIhtaaffv28dFHHzFv3jxKS0vJy8vjpptuYvr06Yltkp9HUxp8mWd03JJKmgSUxZfFv5OXgxf9GC+ZGG/siSCVaBsAx/Dhi0SxLcE1LcJRg/nrNrEnVM83Rw4i6IJyNGbgBLs9HRe27obCTkdve9KLOGTIEFasWJFYF3/gM2bM4Le//S2ZmU3d5c0fD7x7Hy+y+9prr7F69WqKioq49dZbGTZsWCPh0JJ5icctqZJZnVw+Ojnk9dChQ+zYsQOfz0fPnj0TjT5xUgrP7A1oMTC0jTYNxDB5Y81GNlTtZfTA3pzfOc+TOCIY5gkmlRY4FIKcjGPafOfOndxwww288847n1l39913c88999CmTZtj6qKSewylFNFolE2bNrFkyRIWLVpEVVUVhYWFzJgxg2HDhjXaD768TesLkaopq13Xpbq6msrKStasWcOaNWswTZMf/ehHFBScuvrGtRpe+KCMzICP68/vfcracSzYvHkzvXr1anbd22+/TXFxcYucZ8OGDcydO5fFixeTnp7OqFGjKC4upk+fPolKNl+WVMdtUY93fa7rsm3bNsrKyli3bh1btmxh586dbN26lV27dtG1a1dKSkoSs1vF++8TBSUG4gqW1uiAxo36WLejhnJl0b19HrMq1qIIIWkBNJ6VvbXA5/OxefPmZtcVFBSwfPlyQqEQkUjkmI+ZXOIoLjfizyIvL4+ePXuydOlSKioqKCkpYdSoUUyYMIHCwsKEHvxFcdx7x4t7RaNR1qxZw6uvvsrixYvZsWMHgUCAzMxMMjMzCQaDzJ49m9raWgKBAI7j4Pf7cV33hDhAlbbA0aRph2hQY0fSqaoJs7djezZk5LC5eieW7yANAR9aGZ57pRmciLYdDYZhEA6H6datG9u2bUss79SpE2PHjmXVqlUsX778mCVIcm8SJ5VpmliWRTgcxu/307ZtW9q1a8eaNWtYuXIlGzdupEOHDnTu3PmY9LbPw3GTKll36tKlC8XFxXTr1o3169ezYcMG9uzZQygUQinFuHHjEop6vCLKCcsK0QaGgOVqoj4bQzKocSze2b6DLMvHlOKh4NQSsQw0iuYG9aeCUHEYhsGVV17Ja6+9lqgNP3XqVILBILZtH3eXdKQUe5/PRzQaZevWrZSWliae09ixY+nevXuLXMsXGv0115V9+umnLF68mJKSEsrLy+nYsSNPPPFEop7AqYAGnl+xnlA4wrWjziXrlLWkdUBE2LNnD+Xl5bz++uuUlpYyYMAAbrrpJoYMGdLIYf1lVJXjIlXcthGXVk2LtMYbtW3bNrZv306nTp3o1atXQhSfSOOnEq8trrKwXBvHBMew2LwvxAcbdpCTaXJZUSE6HCWY5v+cUOUWaMtJigg40qOL3+/4eq01+/fv55NPPuGf//wn69atazT6i7/48bLgX3aU/oUt6nHdKLkB8WXJxrl4Hx6f6uOEKeviWdRdZWE5Lo6hsZWBT5nMr9jKuh17uHHkYNr4/KioixU8vbJ+jwfJdsO6ujrKysp49dVXeeWVV+jQoQPf+973uOaaa3BdN6GeNE3FP2mkOtJwM5lgyY1LNnjG07hPHLFsNEIUPwHbxTFsxFD4CfDR/hBz162ja0OIr18yFlODeTwB5achRISKigqeeeYZZs2aRX5+PnfccQcTJ04kIyMjkZMYl2hNzUSnRFK1OsR0ATEMwoAfF8vV4GjCfj9vVm1jSVkZXx0xiq7pmeRHHPCZuKYCQ+Fqbw4ao+ndUJ5/T7nEo4txYkkUhj68vfbKG5/09KTkLituiN6yZQvPPfccr732GqZpcu2113L99deTl5d3UtrUqlO0jhexya8wAcFAKwUGBERzXn4B5/U4hw/XbkaZCiwLTANTCYYIPiPm2mvyEUXM7+cRxzUgCoTxyKW9XImjzra17/mv0b/g3/nlwk2EgfVPz+DyCRO5+umNX+ha4+4ywzASo8NwOMzvf/97Lr/8cl544QWuvfZa/vGPf/Cd73yHNm3afKHzfBG0snDiL4GkJ2oQKxakFMoyEQ15pp+uGZmUV2xhy4F6crIyMLVgGbGwYMNAlEpyDkssHFk1OoVKWtL0+/OQd903mHTXTcybdTVf67Se2bPXsFaP4ddTCr/4Jce6q3A4zPPPP8+LL75IdXU106ZNY/r06fTv35+MjIxmHcYnFMcXKdOaEQ/49SKrwqIlIo7YOiJuJCo6IrLHduVfG6vkpzPnyy4RCdmOaLtBxImKOK64WscC/LxgLDc5aC8WY6XFi/hsEC8kUB/e/KiofHiKXDDwHOnUMVsKi2+SH728/Utf9Zw5c2T06NHSr18/+elPfyrLly+X6urqRkF5J7vAxxkjqXSsIrrg6Tk+pby5+2LzylhRTXbAoLB9Wzakp/NJtc2IPAtlazDMpDAYjUpUVzcQFC6xYmk6lgcoIEbjTK5jQeHdd3P1zG/yszUHGXzlGKZN7vKFr/fgwYP88Ic/ZNOmTRQWFnLbbbcxatSohAFTkmajONk4Y0ilktTDw92UgUKhLEDAJ9AtGGBIn97MWfIhQ64YiSMmpigaD3YkcZzD/8V+aEkcX8x4wrRCtHjrPi/6YdsGKtvmkEUVezdUsmpzlFFF/kbxWJ8XgqK15oMPPmD+/Pls2rSJhoYGbrjhBkaOHElhYWFCWW+JEdyXwZkz+jsaYsG4joLt9VEemb+U6Rf04fwuHfAbhue2MWIF+j2XM4cllcb0ZkVCuQKGgRtT2iVW6thyxTvGEUv5beFfN0zi4fSvMjltM++8+ynG1B/yyq8mN5r8PK58JxNCRPjkk0944403WLFiBbZtc+655zJlyhRGjBjR6CytoV77GSOpjorYPTY05KX5mHzRQD76aA29O3ckQyBgetVYYmU0SAz9EK9YB8R+a0C8gv6xDEEDwVSf/27ue/0H3DvPYexv/o17vunjnNu+yb3zn+H3V1zMz4d5pRqlmajayspKFi1axKJFi9i7dy+DBw/myiuvZMiQIQQCgUQ3F/dynGpCwdlEKkjwRJSiqFMe5SsV5VXV9OnUBsP0YeGiJGZwgsP9nvLmsjExQBkoDAxxUErHJu82MOIp80fAnmqLYd+5l6+P74zfyuLSr1/Lxrzt6Op9QJdGUQUAO3bsoKSkhPfee4/KykoKCgqYMWMGkyZNIisrCxHBtu0EmaRJKPepxNnT/cXgAPsFAlGHlbv28tbyMq669CK6tc0gS2wsMTxlyRNSaISI6eDXGlN8uAdD1H1aTWa7XFRukCguhmniMwyUVmA29542iWLXNLIQai2ejU0pampqqKioYM6cOcydO5eCggJuueUWJkyYkAhJiUsnrXXCJZZcve9UE+vsklR4F9xeAQGLc7oWMGv5WtbtqCEvK40cC0SLZx0XT1/yuj4bM6KIbNrMno/XsWHJB/QbOpSOl40irU0GEkubF9VMkTa8dY1gNI72MAzFwYMHKSsrY+HChSxatAiAW2+9lWnTpiWiZ+OTWMZJFZ97ME4k0zSb1clONs46SZUMCWs+TDOYNedDLh/Wl2G52WixCfvAFoUWl3S3geD+KiKr69nyxBPUHjqEf0BXnIo99P/vb5E5YhAufpA0DDGa1a2adm1xuK5LNBqlpqaGefPm8cc//pGGhgZuu+02brnlls/UozpdcNZJqkYwNQUYFKSnsa06RJdgOp39EGyI4hfBqAtRV7aWssVvs79yN/3Gj2LAhHGQl8Xaex+iYcMW0nt0x8hvhzY0cgSv15ECFHfv3s2CBQt44YUX2LVrF9dccw3XXXcdhYWFjaQOnPqSi8eDs5pUto6Qqy2KLyjisVkLyDAHUtAzH7/j4GzbStlLr7KmZBnDx45l6IP/ic5Lx/GBZTt0vGoKq59/gd7t29Nl0sU4eL5BJUl2rRj8fn8iDCUtLQ3btpk/fz5/+9vfqKioYOrUqTzyyCP06NEDx3EazUx/OuI06/5aNm3zgITIctOpNeC5D9eQnpbBeFsTefM1qspL6TboPDqOKia9U3ei7bOoSwsQAgocF8PdT/n9vyfNn0GXb0xH+vTD1iaZqvnwP6UUjuMwf/58nn76abZt28awYcO4+uqrOf/88/H7/fh8vkY6U3J4yukkqVp3lEKonCfuHMHALulM++UcPtx3OEMYohz6+BW+N+kyunTtSvfu3en0lR8yuzyCfQyviQCuCiIqhCV1XD2kL3s3rOXZJ57ioKsYdtvtdL7xBtT5fanrmIkOppEWhQKtsCyLUNDgnOlTqT94kD2lZfijYfxGmKakjxPi3Xff5dZbb+X73/8+hmFwzz33cN999zF69K1XAG8AAAkzSURBVGiysrLw+/2Nury4lDoVbpYvi9bZ/Wlh3+u3csU9c/iobAcNLgT31xGOZcAovYN1sx7hP771R946EDq8345HuNHtyazHv8HYzp+fEaKAdO0ZroLKINuEXl07UDliMLp/HzIGF6GVQdT0XC8WnrVAKSGkXBQWvvOKyFpVjvpkPdI1H9+YCxJumzhKS0t59NFH+fjjjykqKuK+++5j6NChdOnShbS0NKBxtGVzXd7pJKWgVZJK0HoLs/9SghpwA9f2forXZld7frz4vXVq2bNvF9vajOPBR/+LC9vWsXX5n5nxy/nUzH2GN9dcxoBOmbQ7yrPwAxg+LHHBcRg6qIjNtrDJ5+c8y4cp3g0SvDkBlSFo0TjKxYdFhAj5Fw5m24qX2PTuUrpd2BtfupeRvGHDBl566SUWLlxIIBDgpptuYvz48fTq1atZMsVxqv12LYFWSCpQZhuG3PkHBhWN4sA/X6FkfjVOcpdmdWHAxDt4dEA6F43u6xXj71PJ337zFqWOoAOSKM3YPBwggkEGjmFi2AYq6tIx3UfH7l3Ys7eeLXsOcU5+FobtRSR42acuCo2F4I8IEcPE6nsOuQP7c2B7OeEtVRzslM7jf32Et956i2AwyOTJkxk5ciRFRUXk5npevqa1KM40tEJSKZTKpWjqJABWKeMz2cRi5NChx/mM73F42c6lszlU7xC84Gtc3LMdnxc4Gy/0pBVEUfhQGMog0ABDO3Ri0c51lFZupiB/EOkWuHiTRyIKJQYB18AUEwkoogGTDtOK2f1iNU/87lE2pGeyIZat8pWvfIWxY8eSne3NT+E4ToJMp7MkOhpaIakaw2lmWdPHUV/6FD/5n4VUdB/Pdx/4KhcVZH3+CEQsz6akNJYYaBPCBqTZDuf4LLblZfPJ9p2Ubt/J6O6dABuFDx2LDDVEodMgA6iuqWHmR+8x9+032buxil7jx3DLLbdQXFxMfmz297iPLm6riivjKUnVSnFgxbM89NPv8Uz1WMY98Cd+OLkbuUcRAgowtQGmA2IQURAxwFQ2PoSBhV3ZEbVZveVTBnfvRC4aVyt0bBZLE9h54ADbV6xhxfL3+dfSN4lEwnzzOzP46s3X0y6vHXA4VSqeoR2XUPF8yTMVrZ5UAcvzpxmmn0Da4eV2Qw1bFr3Ay0/dy682jeHyXz/Gv77Zg2POh45F2WkFhhLSEAxRoCHPB/3btKF0v82yHbWM75yBox2Chg87GqW8bD2vz5vL8pJ3iTo206ZM5oorptOnp1e1JU6Y5C4u2URwpkqoOFonqSTCvk0V7LaDrN4eJixg7drAmg8qaN+vLfmdMvn03Ue48+p7mRvNY+z/eYC/jg6xedUnOFrjb9+L7h1ySD9SwbmYwxhRaONwBo5yvTwsQ0P3drlU7g2x+IP1jJo2EO1A1datVKxay0v/fI6y8jImTJ7E17/xbwwcNAgUibDjM1lfOiacnFD444EW114jvx9yhFkfpv63zFy2Qd6596IjFlrNu+UFWVb1+YVTY3kMYid9HDskEmmQaMSRehFZseuA/P71pTL/vUWyoGSxTL/6KulT2Fv+45ZbZdXyFeKEverAtm1LxPYqsKfQahMfLDI7tCU/N8Ihx8CMvfiRukN0yssh6DfxZ7QB5Scrs3GqsRuuo1ObIH7zyNLCRXBxMZoKasNEuzaWMsBWdPb56GREuffee9m5tYqRQ4fx2OOPM3rESKy0AGK7iO1iWSa21mhXn7b+upbEaeb7axkIgouDia+RO9FxIpiGxsBk9cq1PPb4U8x7cwE9BvbiJz/4EcMuuJA0fwCf8iJA49mrWmsEwTDNFi0oe7rijCaVNCnnLLGgOBGNxsXAh7iCMhTKgEi0gcrKcl7814vMfX0ueW3a8W83fpPiaZfRPreNVxY7nvsueH+SKhZzlCzlswVnNKmARNhtYjjvuhiG8jJmlC/BgkjY4eHf/4bHn3yMgo4d+PZN32TSpZNp36EAI5geT4XwNm82DOGkXVKrxxlNKmkmGUBrDRLTfZTB7k/3MmvmLGbOfAlRmpGXjGHipIkM7N+P7PR0lDJxlad7NUp7P9JdS5GrlZoUWgjxgrcSK9QmIigUhuXDDkX416uz+PNf/wKO5rLxlzJp0iTOKepPMCsL0zRxFOAKltU4kitRp/+MfR2/HM4KSZUco1Szr4Yl7y1h7pw3WLd9I7379uLii0Yx4eJiCgo6gYKoCK6Il3olR84PbTbVLyWpzgxSxbs4aWLJTu76GhoaWLFiBS+88AJrVq+loGMXxky9lEvGjaFnQVf8SqFsvOxj0zNkIl4U45GsE41IFRdlKVKdfqRqqifFyws23SbuColEIqxYsYK3336bVatW4bou5513PpMmXcawYRfGBnKCdlxMw0t10sTqUoFHLPU5unmcTJK88OzGaalTJRMr/h0Oh/H5fInQEtu22bx5MyUlJSxcuJBdu3YxdOhQvva1rzF06BDiTz8+rUhyQfpGvZ1q9PVZHE+RqrMEp62kAhKF5w8cOEBZWRkXXXQRruuyY8cOlixZwltvvUVVVRW9evXiiiuuoLi4mLS0tISJIbkmafJ3Cl8Op52kiivecXfIvn37mDNnDh988AHdu3dn8+bNzJw5kwULFtC7d+9E8dRAIEAkEkkQKZmYwGcIlsIXx2kpqeLzCNbX1/P888/z4IMP0q1bNy688ELeffdd2rVrx3XXXcdll11G27ZtgcMhvECi/DYcJlVTe1YKXxynHanAI4jjOJSWlnLjjTcmAt9s2+YHP/gBN998MxkZGYn8uTihfD7fZyZmTCZTilQtg9MmWixOEPBGfLNnz+bWW28lGo2ilCIUCpGbm0sgEKCurq5R9xZP1ITG9ZuS48VThGo5nDakSpYs7733Hr/73e+oqqrC5/NhWRbnnnsugwYNorq6moMHDyZK66TIcvLR6ru/prrOhx9+yJtvvolhGAwYMIDc3Fw6dOhAZmYm2dnZWJZFIODFWJ0NobutEa2eVMlwXZe6ujoaGhrw+XwEg8HEvCqmaeI4TrNVUlLS6uTitCFVchmepjpQfDRn23ajWb7O5ITN1ozTxk6VTKTk9yDZJWNZVso00Apw2kiqFE4fpPqGFFocKVKl0OJIkSqFFkeKVCm0OP4/faLP2bAZpZkAAAAASUVORK5CYII=)
By angle bisector theorem, x =
>>>Therefore, the value of x is 29 degrees.
Find the value of x in the given figure.
![](data:image/png;base64,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)
By angle bisector theorem, x =
>>>Therefore, the value of x is 29 degrees.
Where should the goalkeeper in a hockey match stand from the person hitting the ball?
Where should the goalkeeper in a hockey match stand from the person hitting the ball?
The point on an angle bisector is ____ from the two sides of the angle.
The point on an angle bisector is ____ from the two sides of the angle.
The point at which the angle bisectors intersect in a triangle is ____ from the ____ of the triangle.
The point at which the angle bisectors intersect is equidistant from the sides of the triangle.
The point at which the angle bisectors intersect in a triangle is ____ from the ____ of the triangle.
The point at which the angle bisectors intersect is equidistant from the sides of the triangle.
What is the perimeter of the triangle?
What is the perimeter of the triangle?
In the given figure,
, a person must start from home and reach school, grocery store and reach home. The road is in a circular path.
Which concept is used to solve this problem?
In the given figure,
, a person must start from home and reach school, grocery store and reach home. The road is in a circular path.
Which concept is used to solve this problem?
In the given figure, what is the point of concurrency?
In the given figure, what is the point of concurrency?
![](data:image/png;base64,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)
In the given figure, what is the perimeter of PDE?
![](data:image/png;base64,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)
In the given figure, what is the perimeter of PDE?
Find x. ![](data:image/png;base64,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![](data:image/png;base64,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)
Find x.
Find x.
Find x.
From angle bisector theorem, x =
>Therefore, the value of x is 22 degrees.
Find x.
From angle bisector theorem, x =
>Therefore, the value of x is 22 degrees.