Answer :

The true statement is Quadrilateral WXYZ can be mapped onto quadrilateral MATH using a sequence of rigid motions.

How to get the true statement

The statement holds true: Quadrilateral WXYZ can be transformed into quadrilateral MATH through a series of rigid motions.

Definition of Congruency:

When two triangles have corresponding angles and one side that are identical, they are considered congruent.

Given:

Quadrilateral MATH is congruent to quadrilateral WXYZ.

Therefore, the congruent sides are:

MA = WX

AT = XY

TH = YZ

and the congruent angles are:

∠M = ∠W

∠A = ∠X

∠T = ∠Y

∠H = ∠Z

Consequently, if the quadrilaterals are congruent, it implies that their measurements are equal.

Hence, the statement "Quadrilateral WXYZ can be mapped onto quadrilateral MATH using a sequence of rigid motions" is true.

Read more on quadrilaterals here:https://brainly.com/question/23935806

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Quadrilateral MATH is congruent to quadrilateral WXYZ. Which

statement is always true?

(1) MA - XY

(2) m/H=mZW

(3) Quadrilateral WXYZ can be mapped onto quadrilateral MATH using a

sequence of rigid motions.

(4) Quadrilateral MATH and quadrilateral WXYZ are the same shape, but

not necessarily the same size.​

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