1) Construct a parallelogram with one vertex at point A. Make sure to show all 5 characteristics of a parallelogram. If I move any point, it should stay a parallelogram.[br]2) Find the measure of all four interior angles and make conjectures about them.[br]3) Find the lengths of four sides and make conjectures about them.
List 4 characteristics of a parallelogram.
1) opposite sides parallel[br]2) opposite sides congruent[br]3) opposite angles congruent[br]4) consecutive angles supplementary[br]
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[/img]
angle G = 60 degrees; FG = 8
Find the value of x and y in the given parallelogram.[br][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAZ4AAADGCAYAAADi1uYhAAAgAElEQVR4Ae2dfdRVRb3Hn2qt2x/dld7bWrVWd60gNVHxBTXA8AUkUCy44PIFtVuS70qFaVdFU3xSpPtoIiK+UVIqpphAGpqZUL4gyJMPaYEKgikQ4lJEEEmzues7zzPD7+yz9zl7nzOzz375zlpnnXP2ntfP7DnfMzO/mWlTdCRAAiRAAiSQIoG2FNNiUiRAAiRAAiSgKDx8CEiABEiABFIlQOFJFTcTIwESIAESoPDwGSABEiABEkiVAIUnVdxMjARIgARIgMLDZ4AESIAESCBVAhSeVHEzMRIgARIgAQoPnwESIAESIIFUCVB4UsXNxEiABEiABCg8fAZIgARIgARSJUDhSRU3EyMBEiABEqDw8BkgARIgARJIlQCFJ1XcTIwESIAESIDCw2eABEiABEggVQIUnlRxMzESIAESIAEKD58BEiABEiCBVAlQeFLFzcRIgARIgAQoPHwGSIAESIAEUiVA4UkVNxMjARIgARKg8PAZIAESIAESSJUAhSdV3EyMBEiABEiAwsNngARIgARIIFUCFJ5UcTMxEiABEiABCg+fAUvgpRdfUkueeUb9qbPTXgv7AD/mtXXr1jAvvEYCJBBBoOu553T7WblyZYSP4l+m8BS/jmOX8OivDlN79Oqtxh53fGiY7e+9p751yje0H/i7+kdXhfrjRRIggXAC27dvt+1n0mU/DPdUgqsUnhJUcpwibtu2zTaIa66eXBXknXfeUcf992jr55YZM6r88AIJkEBtAsueXWbb0K/uv7+25wLfpfAUuHKTFG3x00/bBvHIgocrgm7atEl97aij7P177/llxX1+IQESiEfgZzNn2na0etWqeIEK6IvCU8BKbaRIM6ZPtw1iw4YNNgp8HnLoYfreXrvvoX77yCP2Hj+QAAkkIzD+3HN1W9q3z17qo48+Sha4QL4pPAWqzGaKctYZZ+gGMaj/ABvNqpdfVviO+Zy+e/ZRTz7xpL3HDyRAAskJHPGVQbo9fWPsSckDFygEhadAldlMUfofeKBuEOPPPkdH89e//EUdtN/++hrely9f3kz0DEsCpSfw9ltv6/aEP3JTJlfPo5YJEIWnTLUdUdZ169bZBjHztttV57Jlar+999HXBh50sFq9enVESF4mARKIS+B3jz5q29nDv1kQN1gh/VF4ClmtyQqFRoB/YXj9+Jpr7GfM7fzt1VeTRUbfJEACoQSu67jWti382Suzo/CUufZ7yj75qqttgzACNGjAQPXGG2+QDgmQgCMC3zz5FN3OBhx4kKMY8xsNhSe/decs51gwCsFBD2fYkCFWhJ5ZvNhZGoyIBMpOYP99+uq2dea3Tys7CkXhKf0joKzQ/OCCCxQs2WDBBiH68gH91BsbN5IQCZBAkwSwHZUZTZg29YYmY8t/cApP/uuwqRK88PzztkHc9Ytf6LjunzPHXhv99ZHqww8/bCoNBiaBshOYc++9tk0tWriw7DjY4yn7E3D3nXfaBvH8n5+3OND7Mf/QyrynlAXCDyTQBIFLL7nEtidurKsoPE08S4UIagQGuxLIns2OHTvUiGHDbWP59fz5hSgvC0ECrSAw8ugRui1hHpWOwlP6Z+CoI4fqBhG2I/WaNWsUtvYwPZ8yb+Ne+geFABomgF3dTRv67vjxDcdTpICc4ylSbSYsC7r8pkHApDrMYcNQ42fIYYerLVu2hHnjNdcETj69fow/vr6+H/poOYFnly61bWjixRfbs6zMmVbmvd45WC0viMMMUHgcwsxbVNh7zYhKrZXUV15xhfV3+qnj8lbMfOZ3yCil6olPW5tS103PZ/lKlOvbb73Nth/T3sLejx01qjRUKDylqerqgt50484dqdevX1/tQVwZdczXbOO58YZp4g4/eiEA4YGw1BIf3Mdr2i1essBI3RD4zjndO1KHiY28BgOEsjgKT1lqmuXMFwEjPLXExwgP3mfMzFf5mNtSE6DwlLr6WfjMEpDCEyU+Unjw+fafZ7Y4zBgJSAIUHkmDn0kgKwSCwhMmPkHhwfdZd2elBMwHCUQSoPBEouENEmghgTDhCYpPmPDg2j1zWphxJk0C9QlQeOozoo86BP7whz8ovtwy2Nr3UBX1envoSM076j6ur/rRNayTlJ/LzZs312kpvG0IUHgMCb43RGDq1Kmqra2NLzIo9TNw6qmnNtR+yhqIwlPWmndQ7nnz5tkfmwMOOEANHjyYL0cMvn9Qf9Xsa4ijvLBeq59rPO/mDxf40CUjQOFJxou+ewh0dXWpXXfdVTe+0aNHk4trAoN71vGEzePMfag7tbB7uHbCOKU++MB1jhhfDwEMqfXr108/+xAgDrElfzQoPMmZlT4EGpoRHTY8T49DlHGBER0kGyY8Y/5Hqe3bPWWK0YLAmDFjtOjssssuCn/A6JIToPAkZ1bqEPLfHhre2rVrS83DW+HDhEeKDhIOCs/IsUpt2eotS4xYqXHjxtkhtkWLFhFJgwQoPA2CK2sw0/D4b8/zExAUnqDoIHkpPEPHKPXW254zVe7oZ82aZUUHn+kaJ0DhaZxd6UJOmjSJDS+tWpdzPGGig3wY4Rk0Qqk3NqWVs1Kmg96NMSaYMGFCKRm4LDSFxyXNAscl/+1BgOg8EzA9nijRQfIQnv0HK7Vhg+fMuIl+8/v/VIvWvlv39dzfa89R4f4dXW+qyx5fr+NCvLXc9Ys3qn4/XalOemCNWrgm+VAkDWlq0W3sHoWnMW6lCoWGZ/7tcb1CSlUP4aklOshG7wFKvfZ6ShlqPhn86LdNXFL3dcDMlaGJQXA+O/2F6vDtnepnz71ZFQaCBP+fmf6Cvg8/bR1d6rrFG6v8Rl2Qc5o0pImilPw6hSc5s1KFgPEALdhaUOX1RAdZeiVfhh3NCM/azTtUW3vnTtFp79SCIoUsKD7nLnhNDbvr5YrK0/FMXKLwHscZs2ka0sShFd8PhSc+q9L5lP/20PDwnY4EGiUghSfpkBeGyozIXPb4OmWG13ScRpDaO+115LGtY3no0Bp6QHNX1H+WaUjTaE3XD0fhqc+otD6GDBmih9howVbaR8BpwRsVHoiMEZ2wYTgIkbkvez0YVgsTGAy/hV2XhZVbQdGCTZJx85nC44Zj4WIx//Ywt4OtcehIoFkCjQqPnpvpmRsKEwwpTHJoDUNt6ClJZ3pItYba5FZQNKSR9Nx9pvC4Y1mYmKQFG/750ZGACwKNCg/ExPRoEEeYQ+/G+DH3IUg6bHunOm/Ba2r47O54ahkXSAs2GtIYku7fKTzumeY6RrlegQ0v11WZucxL4cGPP0yr563crN9rZRbDa0FRCfqXfoLm2OjdID0MydXq6WAOk4Y0QbJ+vlN4/HDNZazy3x5MR+lIwCUBKTxGSOQ71uUYowGZrrRmk9fl57G/WmPFKapXJP0HP0tDml69etGQJgjI8XcKj2OgeY0ODa93797amIANL6+1mO18VwhPe6eSvRQjQJj4D4qPuRdmWGBKLA0MGhEeM6dJQxpD1O87hccv39zELtcroOdDRwKuCUBQIApBYcE1mDgbgYFRgHTmui/hkVtB0ZBGkvf3mcLjj21uYjb/9mDBxh13c1NthcooxChqSM1cryU8cQwQwoDRkCaMiv9rFB7/jDOdAtcrZLp6SpU59HRM70YOl9khufbOSB7WT4JdCbgVVCRO7zcoPN4RZzcB+W+PFmzZraey5AyWZ2HCIw0HoqzSTK8I73Gc3AqKR1fHIebWD4XHLc/cxCYt2NjwclNthc6o7PFIgZELSOXOBAaGHqbrWWAKkarnpAUbN/6sR8vPfQqPH66ZjpXrFTJdPaXMXMUcT6DXIoUF+68FnbRoCxOmoH8eXR0kkv53Ck/6zFuaovy3xx13W1oVpUscCzuDZ+igZ4PzciAoZpgtTDzkcBt2IDA9IpzLY4fZOrqqLOaCkKUhDa03g3TS+07hSY91JlIy//ZgwcaGl4kqKU0m5ByOFhmzq7Q4owe9lzCnez1iWxwjUvI9bB83GZec08RnutYRoPC0jn3qKePIXnOgGxte6vhLn6CeqwkRG4gHrNKkJVsYLIiP7PkY0cEaoHph5VZQPLo6jG661yg86fJuWWry3x4bXsuqgQn3EIBQmFdSKBAgEza4L1tYXNKQZvTo0WFeeC1lAhSelIG3Ijk0PNPTYcNrRQ0wzVYRkHOatGBrVS1Up0vhqWaiJygxCYpXvS48gmOiE35PemCNPv8Dk59xw4Yk7/SS/LfHhucULSPLAQG5FRREiC4bBCg8gXpA1x0bFZrx46jJThMMAmP8hr1DhDA00Aon/+3x6OpW1ADTbCUBY8HGjT9bWQvhaVN4BBdYxVjTzB5Lm1rCU2Gl096pD52Cfz0BKixwID6tcDy6uhXUmWYWCHArqCzUQnQeKDw9bGTPRe6UW0t4bA+nvVMFJzkx/CZFzKw7iK4Kt3fMvz3M7dCCzS1bxpZtAtKQhkdXZ7OuKDxK6aEwc3QuzDr1moE6PR7M/RjhCW7jbqpabgESZ67IhGv2Xf7bY8NrlibD54mAnNPk/oPZrTkKT0/doMciBcSISlSPR/doesQpaihNrjkI9oh8PRI4T8RYsLHh+aLMeLNIAHOa8ujqLOaReeomQOGJeBLqCQ+CySG54DYfEBoz1IZeVBpO/tvj0dVpEGcaWSEgDWl4gm5WaiU6HxSeCDZxhEeKC/z3++lKPddTcT1k/iciyaYuo+Hx6OqmEDJwjgmYOU1asOWjEik8EfUUR3gQFCIjD6HS4Xq2BcH1NIwK5L89NryICuXlwhKQW0Hx6Op8VDOFJ6Ke4goPDBG0RVzIHlToAaVhVGD+7WFuhw0vokJ5uZAEpAUbrTfzU8UUnoi6iiM86O0EF5tCaII9oOD8T0SSDV2G1ZoxJoA1Gx0JlIWA3AqKhjT5qnUKT0R9xREee4ZIe2dVzya4Ey9EyrWT//bY8FzTZXxZJsCjq7NcO/XzRuGJYFRPeLSw9JhTYweDMCfX+sC02qWT//Z4dLVLsowr6wTknCb3H8x6bYXnj8ITzsUuDo1axyMXh9YyIDAm1RiSc+Xkvz02PFdUGU9eCMitoNAW6PJHgMITUWf1ejxSeKIMCOQiU1dreeS/PVqwRVQeLxeWgDSkQa+fLp8EKDwR9VZPePSGonV2LkBvqV48EclHXpZHV+NURToSKAsBOadJC7Z81zqFJ6L+4giG3LkAQ2nmDJ55Kzfrs3nMMBveXRgXyH97bHgRFcfLhSTAo6uLVa0Unoj6jCM8WMMjxceEqXjv6KqyeItIsuZl+W+PFmw1UfFmwQjIraD47Bejcik8EfWIORm84qzBwbDbsLtetnuzQYxg6eail4PsLV26VA0YMEB96lOfUjy6OqLCeLmQBORWUDSkKU4VU3haVZd/fEqpuQ8p9dNfKPXj65X6weVKjTtPqa+fqFS/I5X6xF5KtbWpLZ/rqw780p56kegFQ4YqNEQ6Esg1gd8vUur+uUrdOkupKT9R6sIfdj/7I8cqdfAwpXbZT6m2T+rn/8ov7KGffRjS8NnPda1XZJ7CU4Ej5S9/6tKNCwIT9Ro9YKBueEcNOER9NHtOyhlkciTgicADD0Y+86YtzDnkCCs6f7v5Nk8ZYbStIEDhaQV1meaaV5Xqe1hoIzz/yGG64e25225qDcRpOhufRMfPOSewtFOptk+EPvtPDRmhn31sB7Vu+GilZt+X88Iy+5IAhUfSaNXnzVuUOuWMigY4dcRI2/Ce+q99uu9dflWrcsh0ScAPgbV/U+qYEyue/VeO/Lp99leM7rl3461+0mesLSFA4WkJ9ohEv3eRboDzBw5WH//4x3Xju2/g4Tsb5RnfjQjIyySQYwLbtyt11gT9nG/vP0z928c+pp/9B48csfPZn3RNjgvIrAcJUHiCRFr8fdm3z1K79f6ibnhTBg/b2fAw1IZ/hnQkUFACb509QfXZ5T/0sz9zyPDKZ3/8hQUtdXWxsExj0dp39av6bjGuUHgyVI9mD7ZDDz1UfXPgIZUND8KDuSA6EiggAbkV1Jlf2luptn+vfP5PGFfAUu8sEhaf4/wuu+i8Z1cUrAlM61yvnbnx/4nC459xrBRkw8N6hfd/+5hSbf9Z2fjaPh8rLnoigbwRMBt/wpjg3SsnB577NqWOGJm3IiXKb5XghBwsifWCRXEUnozUpGl4FRt/wuJt+LGVjTAj+WU2SMAVgdCtoB5baNfyaPPqL/Z3lVzT8WCDYFeLw01mECdeEBcMtcEhDSxEtzuhtHfaeyZcXt8pPBmoOdnwqjb+fHerUt+/ZKf4ZCC/zAIJuCIgt4LCaboV7s/PKzV0TM+z/7mKW638gh1Nonak95GvODvh+0jXZ5wUHp90Y8QtG17NjT+xwhvzPFu2xoiVXkgg+wTmzZunDQkwvBa5B9v6DUqd/p3uZz8jRUpbeORO+FHng2UETexsUHhio3LvUe64G9nwZLLYXmeV25NMZfT8TAJpEZAbf9bdg+2DD5S6tD00a/KU31q9ED1xjwn7jq6mh6vSFh7Z4ynKPA+FJ/Rx9n9RNrxEG38uXuo/c0yBBDwSgCFN7969dW+n2T3YMB9i5kCiNvSVx9RH+UlS3DSFB/M81vDAgWgmKadPvxQen3Qj4pYNr+6/vYg4eJkE8kqgX79+VnRcnCJqfpijhqHaOpZrcYJguHC+hMes37mj60113oLXus2rjVm1ozO9XJTfRRwUHhcUE8YhGx7PjE8Ij95zTUAa0mCOx4WDEKDXg6NJgk5ahdUaiguGq/Xdl/DIYUPTi4OoYqjNWLrVylee7lF4Uq4t0/AqzKZTzgOTI4FWEIDVGgwJ8Jo6daqzLIz91RotPDgFWDo9DNezHgZ+kjjMCUW9IAZIK+p+o8N5GFbTItrRZYcPtQB1LNenGyfJf9b9UnhSrCE0NtPwalqwpZgnJkUCaRCQ1puxDGkSZApDbKaHIIPZ6w2sf0HYqBcMFCBkUfdd9KwgmjAkMKKK8p30QDLxlCyy9pnCk1KNyIZXtV4hpTwwGRJoBQFpSDN48GDnWZBDVGs379Dx492IEQTCpfM11BaVR326cc9cj+uFq1Fp+r5O4fFNWCklG57rf3spZJ9JkEDDBGBIs+uuu+qevi9DGm351fPDbHobtqfQ0dVw3qMCpi08Ulhdi2hUGX1fp/B4JpxGw/NcBEZPAg0RwLMvDWlcWLBFZUT2bqQQ+Vj3QuGJqoX41yk88Vkl9ikbXq9evXhmfGKCDJBnAsaQBvOaPkUHjD4z/QU9tAYLMLNYFALhw6UtPNIyr1HDBR8cmomTwtMMvTphx4wZo4cYaMFWBxRvF47AhAkTUjWkgRjoXo/Y1dnM97iG61p40Cu7fvHG0I1Hcd2sU0L5OMfjujYLFp9seK7WKxQMEYtTUALSkAbtIA2HuQ8z3IZ39Hx8OdfCU5H39k7dY4O5tiwPPhelt4N6YY/Hw9MpG57L9QoessooScApAQypmSUDaRrS4EfZ/lA3YD6dBALSctmbknux2TKIHQsgdD7mqpKU2bVfCo9joq1qeI6LwehIIDEBc4IuhMeXBVtUpqTlF+ZE8ugwjAaBQQ8I7y7FLWs8KDwOawSiY0xHfaxXcJhVRkUCTglIQ5pmN/5sJGO21+DBfLqR/DBMbQIUntp8Yt+VDS/tf3uxM0mPJOCJQOgJup7SCkYreztmHU/QD79niwCFx1F9tLLhOSoCoyGBhghIs+k0DWkwFHXZ4+ut1ZdPg4KGwDBQJAEKTySa+Ddkw/O9XiF+ruiTBPwTaJUhjTQxxoQ81vEUbQdn/7XXuhQoPE2ylw0Pn+lIoCwEEp+g6wgMejrG+guCA2OCIk/EO8KWqWgoPE1UhzwzPq31Ck1kl0FJwBkBGtI4Q1nKiCg8DVa7bHiJjq5uMD0GI4GsEIAhjTm6moY0WamVfOWDwtNAfWW94WHYYdHadwuzvUYDVcQgHgmktfGnxyIw6hYToPA0UAGy4UGEajmIQMUZ6h3L9ZYYOFPdx7i0tvLpmWzF+De23uCka60a4r0kBKQhDeZ46EigEQIUnoTUTMOLs/FnxR5MZguMwLvLVdZ6F9uOroqeDvKQ9NjfhEjovSQEeIJuSSo6hWJSeBJAlmfGx7FgM/tHmWNysbgN1+SJgrDOcbXora1jedVGgvrc+Y4u9noS1DO9VhOgIU01E15pnACFJyY7aTYdd+NP/OhHDXMZUYLwYBNAFw5xhaWH4TZX4uYin4wjXwRoSJOv+spDbik8MWpJNjyXO+62dXTZ9QgxslHXC+Z0MLQmHeaRkA4dCTRCAHOYZv9BWrA1QpBhwghQeMKoiGvBHXfFraY/yiG3YE8FPSKcpIhX2OFPuGbuG7FBrwYrumFgYIwa0NvhViJNV1UpI4DoJDGkKSUkFrohAhSeGthkw/NxdLXd9iOkR6J7Kj2GCEHjAIiUCRvcKgTig6E7vbK7o0v3gIKiVqPIvEUClkASQxobiB9IIAYBCk8NSD6Prta9kwhhMVmC4GgBEQdbQUTs6YQ0GjCo+O6YQFJDGsfJM7qCE6DwRFSwPLra9XoF3WPpWF4lKsGsSHHC0BvcSQ/sFKOwIbhgHPxOAkkJNGJIkzQN+i83AQpPSP3LhhfHbDokipqXrHhMXKI3OKzl2Qybmbka0wOi6NSixnuNEoAhTSuOrm40vwyXTwIUnkC9+d5xV4pOcO4mkBX9VZpda9GZuKRqrU5YOF4jgaQEfBrSJM0L/RebAIVH1K80m/ax8WdS0UHW9LCc2O3AWLCJbPMjCTRNQBrS0Gy6aZyMoA4BCk8PIN8Nz54Jn3DBKEymTU8H7/hORwKuCfg0pHGdV8aXfwIUnp46lEdXY8jBpZM9naD5c610ZDgz1wPx8bG5aK188F6xCRizacztuDakKTY5lq5RAhQepZRseBhuc+mkeGDBaNw1NXrDz4C5tVm7E2duyGUZGFdxCfg2pCkuOZasGQKlFx5fO+5CYIbPftkOkyURC2lQIPdxw/yOGXbLfa9n5UvNPLcM64CANKThCboOgDKK2ARKLTxyx10smHPp5Bocs40NtrKJesE/HMykTc8mOCwnDQ2SCJnLcsWOa8pPant9crFSFJ/ajDze9W1I4zHrjLoABEorPLLhudz40zwTFcIjrNJMjyX4jt6M3ianvdMuLA3r1UBwTNiw+yb9lr8PGaXUtTdGZwPC84X+FJ9oQt7u+Dak8ZZxRlwYAqUUHjQ83zvuQhQgJnFfEKq5KzZb/1ELRGW8ppeUyacRwtPWptQNN4dnD8KD+xSfcD4er/o0pPGYbUZdIAKlEx75bw+niOI7nQcCRnggLjfdXp3AU890Cw/Fp5qNxyvGkCbOCboes8GoS06gdMLDhpfSEy+FB+Jy66zKhKXwUHwq2Xj65suQxlN2GW2BCZRKeOSOuzAsoPNIICg8EJc77tqZYFB4KD472Xj45NOQxkN2GWXBCZRGeOR6hbhHVxe87v0WL0x4IC6z7+tON0x4KD5e6sS3IY2XTDPSQhMohfCg4XHH3ZSf4yjhgbjcP1+pKOGh+DitKMxh9u7dWz//2IONjgSyQKDwwiN33DXiw/c2K8S+WJgjk6PiP+6442rmYd9991Wf/vSna/qJipvXq+vXxwm6WfgBYx7ySaDQwiMt2PhjVP1j5JNJPeExm1LWyoP5p17LD+/Vr1dasOXzx7nIuS608KC3g21B+GoBg/0GqicOHBT6WvjNM9QvL77U3nuyX6U/fH/owktYb46eXQw105FAlggUWniyBLp0eYma47n62m4UteZ4FjxaOlwsMAmUiUCuhWfWz+5Q06ZOVfMemFumOstHWcOEx4gOShAlPI8+no/yFSCXy55dptsP2hBeTz35VOxSvbjyxYqwCL99+/bY4emx3ARyKzzvv/++2vOLu6k9evVWP7ryynLXYhZLP7hnyxxYqeElRQf5rRKeTyq18IkslqSwebrgexN0+0Ebwuv873w3Vln/9a9/qVEjjqkI2//AA2OFpScSAIHcCs/SJUvsg//Qgw+yNrNGQApPUHSQ1wrh+bxS2LuNLlUCgwcdatsQhGfk0SNipT/n3nsrwiHsWaedFissPZEACORWeG6/9Tb78K9fv561mTUCZqgtTHSQV7NJaNueSj3zbNZyX/j8vLFxo20/R3xlkP7cd88+dcu9bds2NfCgg7V/Ew7CM2P69Lph6YEEDIHcCs/4s8/RDz+7+KYqM/YO4YkSHWQVwvPZfkotey5jGS9Hdh7+zQIrPJifgXjg9eraV2sCuKq93fq98YZp9nOS+aGaCfBmKQjkVnggOGgo5511dikqKneFrCU6KAyE58/P565YRcmwEZAD9umrXnrxJSsgv//dY5FFXL1qleqz2+7a76TLr1D/N2WKDbd1a/dBhpGBeYMEBIFcCs/fN/zdPvAYcqPLIQGePtrSShszcpRuQ2d++zT1j3/8w7anW2bMiMzXSccfr/3hTx+G3E45caz+fvTQr0aG4Q0SCCOQS+F55OGHbUOBSSgdCZBAfAI7duywFqG33Nx9UN/QIwbrNnXB+eeHRrTgod/YNoflCx999JHat89e+tpFF1wYGoYXSSCKQC6FR3bx0YjoSIAE4hN4ZvFiKyKdy7r/uMEqDUPXx44aVRUR1uccdsgh+v7JJ5yg769cudLGcfdd4riLqtC8QALVBHIpPCefcGJkI6kuIq+QAAlIAtOn3ajbT5/d91D//PBDfWvK5Mn62t57fEl61Z9/cu113f5321298sor+tovZ9+jr0Gs/vLCC1VheIEEahHIpfDst9fe+qFvnzSpVtl4jwRIIITAad86VbcfzNkYN+e++6yQvP766+ayev211+x1jDQYd8lFF+vrcUywTRi+k4AhkDvhWfHXv9qG8Ov58005+E4CJBCDAOZmYMmGnooUkj91dtp2tWjhQhvTmaefrq9/5cv9FXYLMe6Y4Ufp62OP26hW1ssAAAMESURBVCle5h7fSaAegdwJzz2zZ9sGgn9jdCRAAvEJyLmZxx/7vQ343rb3bLuaedvt+jrW5kCg8IJBj3EQIHN98lVXm8t8J4HYBHInPOPPPVc/9Icc/OXYhaRHEiCBbgKz777bisY777xTgQVtCoIy8X8v0te/Orjb0g1Dc9ItfvppGwcWotKRQFICuRKeN9980z7wEy++OGlZ6Z8ESk8A5tIQFwyVBZ1Zl3P8mGPVbbfcattacGQBa31Mj2fdunXBaPidBOoSyJXw3HD99faBDzaGuiWlBxIgATXksMN1G7p84qVVNK649DJ9b/99+to1OtOm3lDl75wzztT+uF1VFRpeiEkg08KDbdrvvvNO9btHH1VoKOZfFixq6EiABJIR2LRpk21D8+fOqwr88ztm2ftoa0cefkSVH1wwQ3IQIDoSaIRAZoVn7Zq1FY3AiA72itqwYUMjZWUYEig1AbkxaNiIwRN//GNFm8NC06CDqbVpizffdFPwNr+TQCwCmRUerKg2Zp940LFy+rKJE9Xq1atjFYyeSIAEKglg0SfmcWAiHeZwVALu44VNRMMc2qXxs7yrK8wLr5FAXQKZFR6T8xUrVqi33nrLfOU7CZAACZBAzglkXnhyzpfZJwESIAESCBCg8ASA8CsJkAAJkIBfAhQev3wZOwmQAAmQQIAAhScAhF9JgARIgAT8EqDw+OXL2EmABEiABAIEKDwBIPxKAiRAAiTglwCFxy9fxk4CJEACJBAgQOEJAOFXEiABEiABvwQoPH75MnYSIAESIIEAAQpPAAi/kgAJkAAJ+CVA4fHLl7GTAAmQAAkECFB4AkD4lQRIgARIwC8BCo9fvoydBEiABEggQIDCEwDCryRAAiRAAn4JUHj88mXsJEACJEACAQIUngAQfiUBEiABEvBLgMLjly9jJwESIAESCBCg8ASA8CsJkAAJkIBfAhQev3wZOwmQAAmQQIAAhScAhF9JgARIgAT8EqDw+OXL2EmABEiABAIEKDwBIPxKAiRAAiTgl8D/A0N9j9I0ljhVAAAAAElFTkSuQmCC[/img]
What can be concluded about the diagonals of a parallelogram?
The diagonals of a parallelogram bisect each other.
Find the coordinates of the intersection of the diagonals of parallelogram STUV if S(-2,3), T(1,5), U(6,3), and V(3,1).
3 vertices of parallelogram ABCD are A(2,4), B(5,2), and C(3,-1). What are the coordinates of D?