Proofs about Quadrilaterals: IM Geo.2.12
[url=https://im.kendallhunt.com/HS/teachers/2/2/12/preparation.html]“Proofs about Quadrilaterals”[/url] from IM Geometry © 2019 [url=https://www.illustrativemathematics.org/]Illustrative Mathematics[/url]. Licensed under the [url=https://creativecommons.org/licenses/by/4.0/]Creative Commons Attribution 4.0[/url] license.
Table of Contents
- Geo.2.12 Lesson
- IM Geo.2.12 Lesson: Proofs about Quadrilaterals
- Geo.2.12 Practice
- IM Geo.2.12 Practice: Proofs about Quadrilaterals
IM Geo.2.12 Lesson: Proofs about Quadrilaterals
Which figures (if any) are always rectangles? Which figures can be dragged to make a rectangle?[br]
Which figures (if any) are always parallelograms? Which figures can be dragged to make a parallelogram?[br]
[list][/list]Here are some conjectures:[br][list][*]All rectangles are parallelograms.[/*][*]If a parallelogram has (at least) one right angle, then it is a rectangle.[/*][*]If a quadrilateral has 2 pairs of opposite sides that are congruent, then it is a parallelogram.[/*][*]If the diagonals of a quadrilateral both bisect each other, then the quadrilateral is a parallelogram.[/*][*]If the diagonals of a quadrilateral both bisect each other and they are perpendicular, then the quadrilateral is a rhombus.[/*][/list]Pick one conjecture and use technology to convince yourself it is true.[br]
Rewrite the conjecture to identify the given information and the statement to prove.[br]
Draw a diagram of the situation. Mark the given information and any information you can figure out for sure.
Write a rough draft of how you might prove your conjecture is true.[br]
Exchange proofs with your partner. Read the rough draft of their proof. If it convinces you, write a detailed proof together following their plan. If it does not convince you, suggest changes that will make the proof convincing.
Draw 2 circles (of different sizes) that intersect in 2 places. Label the centers [math]A[/math] and [math]B[/math] and the points of intersection [math]C[/math] and [math]D[/math]. Prove that segment [math]AB[/math] must be perpendicular to segment [math]CD[/math].
IM Geo.2.12 Practice: Proofs about Quadrilaterals
Lin is using the diagram to prove the statement, “If a parallelogram has one right angle, it is a rectangle.”[br][img]data:image/png;base64,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[/img][br][br]Given that [math]EFGH[/math] is a parallelogram and angle [math]HEF[/math] is right, which reasoning about angles will help her prove that angle [math]FGH[/math] is also a right angle?
[math]ABDE[/math] is an isosceles trapezoid. 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[/img][br]Select [b]all [/b]pairs of congruent triangles.
Match each conjecture with the rephrased statement of proof connected to the diagram.
[img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAVIAAACuCAYAAABk8oU5AAAgAElEQVR4Ae2dCfxOVRrHUxMaRZQWk0LZGkMylhlNQzJpkqaGMEZkKJQsMVQqZWnS0GaYasqSLSQmshatNBEpGUpCk0S2kinpzOd7mnPd9/2/+/ve/Xk+n//nvv+7nHvO75z7u88951mOUSKCgCAgCAgCeSFwTF5Xy8WCgCAgCAgCSohUBoEgIAgIAnkiIESaJ4ByuSAgCAgCQqQyBgQBQUAQyBMBIdI8AZTLBQFBQBAQIpUxIAgIAoJAnggIkeYJoFwuCAgCgoAQqYwBQUAQEATyRECINE8A5fLCIrBmzRq1fPnypH8cFxEE/IaAEKnfeiTi9SlTpow65phjkv7dfffdEUdImu9HBIRI/dgrEa3Tli1bNIGec845CsJM9CcaaUQHh8+bLUTq8w6KUvWee+45TaSdOnWKUrOlrSFAQIg0BJ0YliaggfJZ/+CDD4alSdKOiCAgRBqRjg5CM3/9619rIpXP9yD0ltTRjoAQqR0N+e0pAmaRydNKyM1DgUDv3r1VkyZNkv4VetFSiDQUwyb4jUALhUgvuOCChKZPoqUGv4/dbIF5KSfbCpG62RtyL9cQGD9+vCbSZANfFqBc64rA38i8lJkqcktEI3ULablPSgQgSkiUbSKzp2XLlqW8Xg4KAgYBFisZS4XWOk35ibZCpIlQkX2uI1CnTh09+OUT3nXoQ3dD81LGnM4tESJ1C2m5T0oE0CDwahIRBPJFwLyUcfBwS4RI3UJa7pMUAT7bIVI357SSVkYOBBqBvXv36rHk9ktZiDTQwyYclfdiTiscyEkr4hHw6qUsRBrfE/K/6whcddVVWotwc07L9UbKDV1BgAUmvm6S/WFf6oQIkTqBqpSZFQIEKWHgz5kzJ6ENqZtzXVlVXE72HQLmpcw8KVNF8X9OvayFSH03FKJVITOnlUyDYD82piKCQCYImJcy48pNESJ1E225VxEE0DYT2Y3a94lGWgQ22ZEAAcYJL17I1G0RInUbcbmfICAIOIKACcPI573bIkTqNuJyP0FAEHAEAbPQ5EUYRiFSR7pUChUEBAG3EWBhiU97L9yJhUjd7m25X0oEVq9erYYPH6769u2rV/FTniwHBQEbAmbB0rbLtZ9CpK5BLTdKh8DAgQOL2P/99Kc/VWvXrk13qRyPOAIm4hNmT16IEKkXqMs9iyAwffr0IiRqNIx69eoVOV92CAJ+QkCI1E+9EeG6tGzZMimRQqj333+/+uc//6mWLl2qXn/9dYUGsnHjRrVt2za1e/dudfDgwQijJ033GgEhUq97QO6vETCG1EYLzXX74x//WJ1yyimqYsWKqlq1ajri/i9/+UvVrFkzdeWVV6q2bduqzp07q549e6pbb71V3Xnnneq+++5TDz30kHr88cfV5MmT1bPPPqsWLFigvaz+9a9/qXfffVdt3rxZffrpp2rfvn3qm2++kV4TBGIQECKNgUP+8QqB5s2bp9RIL730UnXFFVeopk2bqgYNGqhatWqpKlWqqDPOOEOddNJJ6rjjjkt5fa7EnOy6448/XpUuXVrfn3owl1u/fn3tktiiRQt1zTXXqA4dOqhu3bop/LsHDRqk7r33XvXXv/5V/e1vf9PeWkxnoGUvWbJEvfbaa+rtt99WGzZsUFu3blWff/65+vLLL9WRI0e86hK5bxYICJFmAZac6gwCy5cvV+eee25SIqxZs2ZGN4Z0Dhw4oDXHDz/8UK1bt06tWLFCvfjii+r5559XzzzzjHrqqafUmDFj1MiRI9WQIUPUgAED1E033aSuv/56ra0yxXDJJZeoRo0aqdq1a+t6nXnmmTpWKuSZjFid3J+Llj1ixAitZT/22GPq6aefVrNmzVLz58/XpkErV67U2HzwwQfqk08+UXv27FGHDh3KCOMgnHT48GHdtz/5yU/UCSecoL9EaLuTIkTqJLpSdloERo0apQxB/exnPytCVHzyQ4Z+km+//VaTz/bt27UGuWrVKj0NwMM6Y8YMNWHCBK11PvDAA+qee+5RWCPcfPPNqkuXLqpdu3aqVatWeqrhF7/4hWKVuWrVqqpChQrq5JNPVsWLFy+CgZMkbS87Gy37lltu0e2ifbyUeDk9+eSTaurUqdpsbdGiRerVV19VYLN+/XqF++Znn32mX3QQnZNSt27dhBg++uijjt1WiNQxaKXgVAiwSPSHP/xBD/iSJUuqKVOm6NNfeuklTSo84NiSRlm+/vpr/YkPCb333nsKTRLteu7cuZqwmNPFi2fo0KF66gBy+9Of/qTat2+vcJNkuoT5YTKzMl981llnqbJly6oSJUokJBo7qTr9O5GWzYuFuWy+Cq699lqdv6t79+6qX79+6o477tD2xaNHj1bjxo1TEydO1C+tefPmaUx42WImx3mp6u7UeBIidQpZKTcpAoTLq1Gjhh7wPDgff/xxzLk8UDwMzB+KOIvA999/r7XEHTt2KD71ISPma9EoZ8+erSZNmqSJC+2aqZD+/furHj16qI4dO+p54N/85jfqoosuUhdeeKGqXr26XuRjsY9P6lSE5tUxpnicECFSJ1CVMpMiwCq5eYj4nUiESBOhEux9TIcQ2o7pkH//+9/6k//ll1/W87ZMhzB3zaf3X/7yFzV48GD9NcJCHV8tZiqkYcOGepGxUqVKqnz58gqt1oylTLe8GJwQIVInUJUyiyDAws9vf/tbPfCZD1y4cGGRc8wOIVKDhGzTIcDXDdpxpqSK7bETIkTqBKpSZgwCBGY+/fTTNYm2adNGf0rGnBD3jxBpHCDybwwCvITRVsuVKxejkcb/H6+lstjnlAiROoWslKu9jXr16mUN9kzDmwmRyuCJRwATOcYSXzN2gqxcubI2W2NBzezH6QJbY/P/scceq21548ss5P9CpIVEU8qyEHjllVf0ijGDGbMmPIQyFSHSTJEK93lYKWDni8ODIUW22PViTga58nLGIYP9OGfYczKxePbGG28orB+cFiFSpxGOYPkMbmMbeuONN2aNgBBp1pCF5gKsBliEPP/882PIE7Otrl27atddGoulx3XXXWedc/XVV2s7Va+AECL1CvkQ3hcvmT/+8Y96cGP+kusKqRBpCAdHiiaxik8MWkyo7JonY4jxZNcyKYb/8Toz5xLQxmsRIvW6B0Jyf2w+ceVkcBOpHBfNXEWINFfkgnMdGiVebTgMGEJkW6xYMdW6dWs1bdo0hclUvJh0IpxLfAOmkPwgQqR+6IWA18E+uG+77ba8WyNEmjeEviwAF1ECthDLwE6e/MabCesOYiUkEj75Tc56zucz32lX00T1SLZPiDQZMrI/LQK4LZo4oiwA4K5XCBEiLQSK/ihj//792gff2BDbCZSIXrh7EukqlRC7wIRZxL0Vn36/iRCp33okIPXB15lVUh4MJvqJIFQoESItFJLelEO8VoKXEErQTpz8xp2UxUhiLaQTSLhPnz5WGRdffLEOgJLuOi+OC5F6gXqA70m4NYJjmAeE+JqFFiHSQiPqTnn45hODNT4oys9//nMdPHvTpk0ZVwT30SZNmljjjAhafhYhUj/3js/qRjALNApIlIUlbPScECFSJ1B1pswXXnhBR5wiBKB5ubIl8DZz57gGZysPP/ywZRvKlBFuoH4XIVK/95BP6sfgNrahhGpzUoRInUQ3/7IJdUgwbDO1YwiU4Nxojtk4X9hrw+c+AbZNeV7bhtrrlu63EGk6hCJ+nDxFxvAZuz6i9DgtQqROI5x9+Xx9kOOKyEuG6NgShZ5UKvmaIWE+Z3fzJFh0kESINEi95XJdWYXHVo8HpnHjxjr8mRtVECJ1A+X09yCHFIGSTexYQ6DEG73hhhvU4sWL0xeSwRlE2TdlMyVAZP2giRBp0HrMpfraB/ef//xnl+76w22ESF2FO+Zm77//vo64b9cOIblSpUrpL5NCBtsmOyuf74ZEiej03XffxdQnKP8IkQalp1yqJw8SgXQZ3F5N9AuRutTZ/7/NRx99pIiAT8I/Q2psycxKyg+SBhY6mynuw8Y2lFiifrQNzaYXhEizQSvk55Jt0iwgkAM+naG0U3AIkTqF7NFymfsmIr3dxMiQKC9S7IQPHjx49IIC/SLFNDmYzL1wJ+blHXQRIg16Dxag/hhQ2w2fSffgpQiROoM+ThNPPPGEatGihUVkhtDIvUTq5t27dztzc6X03KfdPXTQoEGO3cvtgoVI3UbcZ/djNfZXv/qVfrCwDc139bUQzRMiLQSKP5RBLE6+NH73u98VIU88hTBrI2qX04L2yzwrxE020yDYhmaDiRBpNmiF7FwGt7EN7dy5c8HnwXKFS4g0V+R+uI7MoDNnzlTt2rWz+tdonkSOJ+xcPtG5sqkdJI3dsbk/bqM7d+7MpohAnCtEGohuKmwlicIDcTK4sQ0lP7qfRIg0t94g1TD9aiLGG/IididWGASZcVMwn7PHGGVBK6wiRBrWnk3Srvnz51u2ocSCdPvhSlKtmN1CpDFwpPxnyZIlqnv37jo9sSFOttWqVVOENFy1alXK6506OGzYMEsLJdUM7sVhFiHSMPduXNuGDh1qDW5WTv0qQqSpewZSYnGwYsWKVn9CnmeffbbOB+8laa1fv179/ve/t+oVZNvQ1L0Qe1SINBaPUP5HKgez2IBt6KxZsxxpJ4F3MadJJrgScpwAvqlEiLQoOmiWaJhVq1a1SAryLF++vOrRo4daunRp0Ytc3jNlyhRN5tTrxBNPdMWd2OUmJr2dEGlSaMJxgMFtbEMJrrtjxw5HGrZ37179gGNknUg6deqkj7NNJ0KkPyDEtAtzm/b8RJAUc6AE9yhUIO10/ZHuOJYB/fv3twiel+WGDRvSXRaq40KkoerOo40h343d8Jk5KyeFhGQ85ImIMhsSpY5RJlJW01lVt+dlB1esK1iFd+prItex8frrrysi3VNH/sJkG5oNJkKk2aAVkHPJB25sQ0lrS9gzp8XkbSL6uV2yJVGujRqRYiKEPSd2nYaQzJYpmcmTJysCavtNyL+Eeyd1ZX527ty5fquia/URInUNanduxOA2tqGkssVryQ3B1Y8HatmyZdbtciFRLo4CkeJBhCcRHkWGNM0WzyM8kJgu8aPgXsoikqkvi0teuRP7BR8hUr/0RJ71YCB36dJFD25sQ8eOHZtnidldXqZMGX1vc1WuJMr1YSXSr776Svuwm6AwhojYMq+Ig4RTc9imX/LdEhHfHhnKiVQz+dbRi+uFSL1AvcD3XLBgQYxt6DvvvFPgO6Qubs2aNZpE0UqRfEiU68NEpISFI3oSUZSIpmQnT6ItYaRO9KUgyIgRI6z6Q6Zemln5DS8hUr/1SJb1GT58uDW4SUrnhWDOBEFg3mRIFFOoXCUMRMp8IZkFjH+5IVAICHveIEU8YgWeF4FpA0GdCx1WL9ex4pfrhEj90hNZ1oOMjMY2tEKFCmr69OlZllC40yFQHjJ7AjRSUuQqQSXSRYsW6cjxRJA3pMOWCPNEmififNBk2rRpOsgI7WD6Jp0NcNDaV6j6CpEWCkkXy2Fw221Dt2/f7uLdi97KLDRhQ8pnvvnfvvBU9Krke4JEpKQN5kuA3EV28uRFQo4jpzKtJkevMEf++9//KjIjmDYR/i5qtqHZIClEmg1aHp/LfJvd8HnIkCEe1+iH2xttxawym0/9XD/v/U6kb775piYZsmYaomHLy43smm6YmznZ8ZjPNWvWzGobHlUiqREQIk2Nj2+OkuLWbhtKsAo/CFonJGIWmkydzCr+li1bzK6Mt34kUhbw7rrrLmtRzxAo0xmEiWM1Owwybtw4VbJkSd2nlStXVoXM0RQGfJK1QYg0GTI+2s/gNrahHTp0cCQFRK7NxQAfUsEg3y7GQJ/502zFL0S6ceNGxUp1vXr1LO2MtkI09MPs2bOzbZpvzydG6I033mi1s3Xr1mrXrl2+ra/fKiZE6rcesdUHo20TFBcPkkceecR21B8/zSo9LqJ2QROFdNDYzCe//Xiq314S6bZt29To0aN1+mmjdZothudTp051zckhFUaFPLZw4UJVp04di0TFNjR7dIVIs8fMlStYATY55Ykbunr1alfum+1NTCbIRJ/wzJFCQtmu9LpNpDgzoPXbfcYNeRLo5amnnlL79+/PFppAnE9+LtNWNG9850WyR0CINHvMHL/CbvjM4oVfJV3EJxPIJFtTKDeI9MCBA5rgW7ZsaRGJIRRWqPEMC2NKDDOWmLaw24byWU+KEpHcEBAizQ03R64i8o/dNpQQeH4Ws9CUanXeaKzZmEI5RaRExMJ0jPm/YsWKxRAoWv+oUaPU1q1b/Qx5QeqGp5Ux1ypbtmzWXwwFqUTIChEi9UmHMriNbegVV1yhEn0q+6Sqjlej0ESKZkwAF2IQGK2TLfmE8AxDO4uC8CLBlMlg0Lx5c0XQb5H8ERAizR/DvErgc8pu+Dx48OC8ygvDxYUgUuIPdO3aVaFxGeJgS1jBO++8U61duzYMUGXcBszn7Dnlb7/99oyvlRPTIyBEmh4jx8546623YmxDefhFcg9awvTBzTffrEinYifPKlWqqAEDBigMzaMoZIktUaKExgQnArKNihQWASHSwuKZcWnEorTbhoZ1VThjQGwnZqORrlixQnt7YTxuJ0/iD/Tq1UstX77cVnK0fmIHSoZRgwuLS2Ib6swYECJ1Btekpe7ZsyfGNjQ+onzSCyNyAPMbo1GS1I15vXjBn58pkJo1a1okAVmUK1dOBxzGLjLqsnjxYkUaZHA59thj9UJa1DFxsv1CpE6iG1c2bp3GNrRx48YKn22RowgQns1oT2Z72mmnaa2SgBnknapbt27MOTgqdOzYUc2ZM+doQRH/NXLkSAuj+vXrBzZwSpC6UYjUpd6yGz772TbUJTiK3AZ3S0Oe8Vvj+232o2G1adNGhw48fPhwkbKiuuODDz7Qpl0GJz7rxTbUndEgROowzkQ/t9uGTpw40eE7BrP4a665JimRGmK48sor1YQJE9SXX34ZzEY6WOuZM2daUyKnnnqqxsnB20nRcQgIkcYBUsh/Gdx221A0BpGiCOAhxcNvCDPRFv93kaIIEFqRoNEGs8suuywydrFF0fBujxCpQ9iLbWhqYAkcTJrhq6++2iIBQwaJtuvWrUtdYASPrlq1SifNM3hBqCLeICBEWmDcCS5i4oaysCQ2e7EAz5o1S7Vv396yazQkcN555yUlVBbmRGIR+Mc//mGZz1WrVk3GWSw8rv8nRFpAyMlFbrcNxdRJRKn58+frVNEm2LMhz1q1auk4pu+++66GiYj/5pjZNmjQQNwYbYPoiy++iIkbykuJcIsi3iIgRFoA/Pft2xdjGyrxHJV68cUXVc+ePdXpp58eQ45ongMHDlR4dSUSfL+JFgWRkm1T5CgCYMrLB2x+9KMf6bipR4/KLy8RECLNE30Gt902NMrxHGl7v379lIn4ZLTKs846S6dqfuWVVzJCOxvPpowKDMFJvJwNno0aNRLbUJ/1qRBpHh1y//33W4MbH+8oCnPCBMCoXr26hQUPPKvwxLjEwyZbESI9ihjmc0TmNyQqNshHsfHTLyHSHHrj448/tmxDiev45JNP5lBKcC9Zv369uvfee2PSU/Cgn3jiiYrUI/kmTBMi/WFsPPvss5b5HB5eYoPs32dGiDTLvrEPbuKGRiWe4+bNmxWuhw0bNrS0I8iTubq2bduqGTNmqCNHjmSJZuLTo06keCOh5RstlHQnmzZtSgyW7PUFAkKkWXRD1GxD//Of/+iEe6RaNg+12RIVf9KkSY5kNI0ykb799ts6tbXBmdipIv5HQIg0gz4i2pDdNjQ+Y2YGRQTmFMxriF+Jh4x5mM2WfRzjHCclqkRKkj00fPCuUaOGmjdvnpMwS9kFRECINA2YdsNn0lWQcTJscvDgQa1dmqyfhjjZoo2SBhrt1C2JGpHiItutWzfrxcU4c/pl5VZfRuU+QqRJeposkyanfKlSpVTYbEOZz2Rek/lNowUZAmUelPlQ5kW9kCgRKVH9SX8C9kSxl/i0Xoy4/O8pRJoAQwa33Tb05ZdfTnBWMHexos7KOivshjjZ1q5dW6/EsyLvtUSFSO22oWQxJdq/SDARECKN67d421Ci6wRdsOXEpjM+whI+2qwOYwvqJwk7kWI+Zw/Wcsstt/gJfqlLDggIkf4ftG3btoXKNhQvot69e6uKFSvGaJ5nn3226tu3r/KzB1aYiZSFSmxC+QogpQqWDyLBR0CIVCnF4DZxQ1u2bKnee++9QPYsKXcHDRqkqlatGkOePLjkP1q6dGkg2hVWIqVvzHQK40xsQwMxHDOqZOSJNOi2oUROImqSSXRmHtTSpUur66+/PpAmNGEj0rVr11rmc/QP/SUSLgQiS6TvvPOONbhZWMJjKShCpH1yQJHYzBAn2+LFi+tYn8T8DLKEiUjHjx+vs3jSP4wzQgqKhA+BSBJpvG3op59+6vue3b59u3rooYcs8rcTKAsXRJs/dOiQ79uRSQXDQKT79+9XXbt2tV501113ndiGZtL5AT0nUkT61VdfxdiGjho1ytfdtmvXLvX3v/9dNW/e3HogDYFefvnlihcCxtxhk6ATKeZyNWvW1H1GuuiHH344bF0k7YlDIDJEyuA2tqEXXXSReumll+Kg8Me/ZMgkUyYZMw1pmm3Tpk3VmDFj1I4dO/xRWYdqEWQifeCBB6x+w6145cqVDqEkxfoJgUgQabxtKInX/CTkZp8+fbrO1U7OdkOcbCEVDLe3bNnipyo7WpcgEqndfI5+69Onj6MYSeH+QiDURMq8oskp78e4oXPmzFEdO3ZUfP7ZybNu3bpq2LBhasOGDf4aLS7VJmhEirdY+fLldR+SDeDpp592CSm5jV8QCC2RxtuGYoLiB1m4cKEOUFGuXLkY8mRObfDgwYpIU1GXIBEp+afMS5CgL1hUiEQPgVASqd021A/xHJcvX6569eqlKlSoYD10PHyVK1dW/fv3Fx/ruOcuCESK/S5z7YZEyRggEl0EQkWkDG4TN5Rsi17ahrLIMGDAAFWlShXrYeOhw4OK/E4ERhFJjIDfiZTUMsWKFdP9iiOE2IYm7sco7Q0NkcbbhjL577YwfYAGbMKiGW3l5JNP1mZXCxYscLtKgbyfX4kUi4ouXbpYL0Y8x/bs2RNIjKXShUUg8ET69ddfe2obSs6m4cOHq3r16lkPGARasmRJ1aFDBzV79uzC9lgESvMjkb766qtWplRCEGKGJiIIGAQCTaREOLLbhpJj3g0hDBrG/I0bN44hTwiU1LlTp05V3377rRtVCeU9/EakdvM5Mga8+eabocRdGpU7AoElUvvgZiEHryUnZefOnWrs2LGqWbNmRciTbKLk28EtUCR/BPxCpJ988olq1aqV1d+33npr/o2TEkKJQOCIlNxBxjYUmz0nc8pDjBAkRGnmO80WQoVYIViRwiLgByLFxveUU07R/U4MV74yRASBZAgEikjjbUNJXVto+eabb/RDwye6IU2z5VN+9OjRauvWrYW+rZRnQ8BrIsXawvQ5AWE+/PBDW+3kpyBQFIHAEKnTtqEsCrE4xCKReYjYsog0YsQItXHjxqLoyR5HEPCKSMlXRe4k0/8sIooIApkg4HsiJVq9U7ahL7zwgl7xxzzJPDxsWcC66667FDFLRdxHwAsixXzOjIELLrhA4YEmIghkioCvidRuG4pP+kcffZRpu5KeR9Snm266yUotYh6ec889V6H1yopsUuhcO+AmkWI+hz2oGQek4A5jaELXOi+iN/IlkRKdyeSUx2Yv37ihb7zxhmLFtVKlStYDw4NDIBMyOIYp3XIYxrFbRIptKJlUGQtlypRR48aNCwN80gYPEPAdkcbbhuYaN5SFqDvuuEPVqFEjhjxZib3hhhvUokWLPIBbbpkJAm4QKalajBZ6ySWXKBIHiggCuSLgKyKNtw3N1i7z/fffV0OHDlXMcZmHhC1h6kj1MHfu3FxxkutcRMBJIiWtjD1oNiv0IoJAvgj4gkiJ+J6rbSjzpkQlb9SoUQx5EiC5TZs26plnnlHfffddvjjJ9S4i4BSRYj5nwhcSeYuxISIIFAIBz4nUbhuKppCJbShaxaOPPqqaNGkSQ55on5QxceJExz2dCgG+lJEYASeIlHCF5iuldevWYhuaGHrZmyMCnhJpNrahRNl54oknVIsWLawHwjwYJIcjSdzu3btzhEEu8xMChSRSbENNeYyX++67z09NlbqEBAFPiDTeNjRZhCRMU0jbgHeJIU2zxbaU9MSkExEJFwKG+EjhkY88/vjj1rjBsWLx4sX5FCfXCgJJEXCdSNPZhn7//fdq1qxZqn379qp48eLWgwCB1q9fX7HaKukckvZnKA7kS6SYz3Xq1MkaO1hp7Nu3LxTYSCP8iYBrRIoPeyrb0Hnz5mnD6NKlS1sPAORJBPIhQ4Yoot+LRAOBfIgUm+DzzjtPj6GyZcuqxx57LBqgSSs9RcAVIrXbhvJJbmxDly5dqnr06KFOO+20GPKsWrWqGjRokHrrrbc8BUdu7g0CuRIpMRHM1A/z5qtWrfKmAXLXyCFQMCLlc+r5559X48ePj/FRj7cNJd1G3759FaHJzKBnW7FiRZ0LHG8TkWgjkC2RfvbZZzGhDnkJiwgCbiJQECJlUh8XOzsxsrresmVLvQ+Nk5iexh3PnEcu8O7du6slS5a42Wa5l88RyIZISXBogs4QL2HmzJk+b51UL4wI5E2kfJ4bYky0jZ/zPOmkk1Tnzp219hpGQKVN+SOQKZH269fPGnvXXnttQYLa5F97KSGKCORNpG3btrUGcyIiZd/xxx+v2rVrp7UFVuVFBIFUCKQjUsznGjZsqMcdHmwjR45MVZwcEwQcRyBvIsXVLhmBJtoPqfIpRuQlPvUvvPBCHW+UqQCi0uMT37NnT50TntV63D+JyjNp0iSdp544kcyjrlmzRgdbxo4UQ3xsTkXCgbsyE50AAAaESURBVEAqImUV3owrzOHcSngYDmSlFU4hkDeRmkFvBnf8lmhLmKHER56PP6/Q/xcrVkwRgu+MM85QzJ3Vrl1be7hceuml2q+faPjYF7LwRS567FNxOyVHEz7YmGPxkK5YsUKRr37Tpk3a+P+LL74Q0nZqNP6/XDOm7Ab5ZGXlJWvGCXPrYhvqcEdI8RkjkDeR2lflzSA3WxaZzKc824MHD6pdu3apbdu2aW0SrZJYoRAWK/4zZszQfvK4e5IbiVQPgwcPVsyFYSbF3CpTCfjTQ4jkUKpbt64OlXfOOedoMyrI87jjjrMeOFMXJ7cnnHCCOvXUUxV1OP/881WDBg1U06ZN9WIb9cV+lrint912mxo2bJhuG1o2MQFoM6SNSRikTVR+SJsMlpD2oUOHMu7MMJzIYpFJOse8J/mxli9frl+G9CE449QhIgj4CYG8iZTGYLOXiKgmT57sSVsPHz6sUyMTVYroUMypYZOKsTZTA7ikTpkyRT+QjzzyiOJlwDTCwIEDFamdu3btqvM34ZrKlAO5zCHHWrVq6Qe6QoUKenqiRIkSCdudCItC7DPTImRPrV69ujUtcvnllysCcaCxoanx4iEWKy8iXki8mCBtSMqQ9sqVKzVp4yUGaRPLwGvSvuqqq1Liedlll+kpHU8GldxUEEiBQEGIlPLxe0dLxBOpW7duigc1CgL5QEKQEZokGiWaJRompAV5QWJooJAaGikkB9lBergyonlhKkaKZ5KvoWVDlNjaYiJWqlQpxaJKIcg4kzK4F9YVZlqkTp06elqEAMjUk/CE1NuQNl8NkPaDDz6oSZv5bNo9f/58jQNjYd26ddq1l3Ta4IXdsV24JlXdbr/9dvvp8lsQ8BUCBSNSX7UqhJU5cuSIDg34+eef68/dDRs2qNWrV6vXXntNB+MgaPW0adP0HO+YMWP0SvY999yjtWymFexaNprdxRdfrGMXkOivSpUq6swzz9Radnx8g1TkVohjTIvwKZ9Ou+fzXkQQ8CsCQqR+7RkP68XCDgs5TI1s3rxZxzkgFQdkhmcaRvBM2+CIwZcIoelYsCPmJxYXJJOzz2XHa9nMc6JlsyCYKRnjMSciCPgVASFSv/ZMROqF2RqLaq1atUpJqkybiAgCfkVAiNSvPROxehErNJl2SkhFEUHAzwjkTaR8cvEA9O7dO2U7WbDgvC1btqQ8Tw5GF4GxY8cq5kzthMri1s6dO6MLirQ8EAjkTaQQKAM/3RwW52BnKSIIpELgwIEDOrA3868sqIkIAkFAIG8izUTTXLZsmSZb7ARFBAFBQBAIGwJ5EymaJiH0Usndd9+tiZStiCAgCAgCYUMgLyI1miaeP6nEeKxwvoggIAgIAmFDIC8ixZMFjTSdpsncKOeJCALZIMCLd86cOdpWFRtWYjOICAJ+RCAvdjOa5nPPPZe0bazSQ6LMpYoIAukQ2Lt3r457YKLeM3bsf+znBS4iCPgJgbyI1Gia9oGe7De+2SKCQCoE0DgNgTLvzpcOpMmLmt/mxZ3uCyjVPeSYIOAEAjkTKZoDpMmAZ4402Z/J5SRahBPdF54y+Yw3JApRMr4SCfuTHUt0vuwTBNxAIGciRUuASNOZNEGwnCfzW250ZzDvATEaEk1njxzMFkqtw45AzkSK1gBBptM0OYc/EUEgGQLGqSPdSznZ9bJfEPAagZwZzmiaqUya0EIhUc4VEQQSIYA2al624j6cCCHZFwQEciZSM/eZqpGZ+uGnKkOOhRsBM0bkZRvufg5763Ii0kxNmswnWyrzqLADLO1LjYBZiU80RYS2iv1o/F/qEuWoIOA+AjkRqdEiJOKT+x0WtjummiKCXM1nv9mKPXLYRkA42pMTkRpNM90KK4OfKQARQSAZAmaKKNFcu7EftduQij1yMiRlv5cI5EykaBKpTJo4xjnptFYvGy/39h4Bo2mmsw3N9OXtfYukBlFEICcijSJQ0mZnEDBEmkgjtd/RTAGkennbz5ffgoCbCAiRuom23KsIAoYg07l9yjRREehkh48QECL1UWdEsSpm4RLPpmR2pGirECmkKyII+BEBIVI/9krE6mSyLFSqVElNmDAhxpcecu3Tp48m0nRaa8Rgk+b6CAEhUh91RlSrwkKT+cQ3c6aJtmKPHNUR4v92C5H6v48iU0M+4Vmdh1TNH//z+Z/ssz8y4EhDfY2AEKmvu0cqJwgIAkFAQIg0CL0kdRQEBAFfI/A/bMCne7ZG5dUAAAAASUVORK5CYII=[/img]
Which of the following criteria always proves triangles congruent?
Select [b]all [/b]that apply.
Here is a diagram
[img]data:image/png;base64,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[/img][br][br]Select [b]all [/b]true statements based on the diagram.
Diego states that diagonal WY bisects angles ZWX and ZYX.
[img]data:image/png;base64,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[/img][br][br]Is he correct? Explain your reasoning.
Sketch the unique triangles that can be made with angle measures 80° and 20° and side length 5.
How do you know you have sketched all possibilities?