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[/img][br]Triangle [math]ABC[/math] is congruent to triangle [math]FED[/math].[br]

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[/img][br]Quadrilateral [math]PZJM[/math] is congruent to quadrilateral [math]LYXB[/math].

[img]data:image/png;base64,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[/img][br]Triangle [math]JKL[/math] is congruent to triangle [math]QRS[/math].

[img]data:image/png;base64,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[/img][br]Pentagon [math]ABCDE[/math] is congruent to pentagon [math]PQRST[/math].

Triangle [math]PQR[/math] is congruent to which triangle? Explain your reasoning.[br]

Explain why there can’t be a rigid transformation to the other triangle.[br]

Is angle [math]ADB[/math] congruent to angle [math]CDB[/math]? If so, explain your reasoning.

 If not, which angle is [math]ADB[/math] congruent to?

Is segment [math]KJ[/math] congruent to segment [math]NM[/math]? If so, explain your reasoning.

 If not, which segment is [math]NM[/math] congruent to?

Is angle[math]QRS[/math] congruent to angle [math]ZYW[/math]? If so, explain your reasoning.

If not, which angle is [math]QRS[/math] congruent to?

What can we conclude about the shape of our quadrilaterals? Explain why.

Line [math]SD[/math] is a line of symmetry for figure [math]AXPDZHMS[/math]. Noah says that [math]AXPDS[/math] is congruent to [math]HMZDS[/math] because sides [math]AX[/math] and [math]HM[/math] are corresponding.[br][img]data:image/png;base64,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[/img][br]Why is Noah’s congruence statement incorrect?[br]

Write a correct congruence statement for the pentagons.[br]

Write a congruence statement for the quadrilateral you created in figure [math]AFEKJB[/math] and the image of the quadrilateral in figure [math]MBJKGH[/math].

[img]data:image/png;base64,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[/img][br]Select [b]all[/b] statements that must be true.

[img]data:image/png;base64,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[/img][br]Why are segment [math]AD[/math] and segment [math]AC[/math] congruent?

Line [math]m[/math] is parallel to line [math]l[/math].[br]

Angles [math]BED[/math] and [math]BCA[/math] are congruent.[br]

[img]data:image/png;base64,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[/img][br]Select [b]all[/b] the statements that are a result of corresponding parts of congruent triangles being congruent.

Explain why the hexagons are congruent.