[img]data:image/png;base64,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[/img][br] Name 2 pairs of congruent figures.

[img]data:image/png;base64,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[/img][br]Describe a rigid motion that will take the figure to itself.

[size=150]Noah thinks that triangle [math]DCA[/math]  is congruent to triangle[math]BAC[/math]. [/size][br]Do you agree with Noah? Explain your reasoning.

What are the measures of the 3 angles in triangle [math]CEA[/math]? Show or explain your reasoning.

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[/img][br][br] Select [b]all[/b] statements that [i]must[/i] be true.

Explain why rotating [math]180^{\circ}[/math] using center [math]M[/math] takes [math]A[/math] to[math]C[/math].

Explain why angles [math]BAC[/math] and [math]B'CA[/math] have the same measure.[br]

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

Give an example of a rotation using an angle greater than 0 degrees and less than 360 degrees, that takes both lines to themselves. Explain why your rotation works.

Describe another sequence of transformations that will result in the same image.[br]