Triangle [i]ABC[/i] is congruent to triangle [i]EDF[/i]. So, Kiran knows that there is a sequence of rigid motions that takes [i]ABC[/i] to [i]EDF[/i].  Select [b]all[/b] true statements after the transformations:[br][img]data:image/png;base64,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[/img]

The triangles are congruent. Which sequence of rigid motions will take triangle [i]XYZ[/i] onto triangle [i]BCA[/i]?[br][img]data:image/png;base64,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[/img]

Line [i]DE [/i]is parallel to line [i]BC[/i].[br][img]data:image/png;base64,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[/img][br][br][br]a. What is the measure of angle [i]EAC[/i]? [br]b. What is the measure of angle [i]DAB[/i]?

Line [i]SD[/i] is a line of symmetry for figure [i]ASMHZDPX[/i]. Tyler says that [i]ASDPX[/i] is congruent to S[i]MDZH[/i] because sides [i]AS[/i] and [i]MS[/i] are corresponding.[br][img]data:image/png;base64,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[/img][br]a. Why is Tyler's congruence statement incorrect?[br]b. Write a correct congruence statement for the pentagons.