Respuesta :

CrescM

Answer: C, 120°

Step-by-step explanation:

If MATH is an isosceles Trapezoid, and the measurement of Angle A is 60°, then the Measurement of Angle M would be equivalent to the Measurement of Angle A. Then, using the Same Side Interior Theorem, the Measurement of Angle H would be equal to 180°- 60° (The Measurement of Angle M), which is equal to 120°, C.

Hrishii

Answer:

C 120°

Step-by-step explanation:

In an isosceles trapezoid, base angles are congruent.

[tex]\therefore m \angle A = m\angle M= 60°..(1)\\

\&\: m \angle T = m\angle H..(2)\\

m\angle M +m\angle A + m\angle T +m\angle H= 360°\\

\therefore 60° + 60° +m\angle H +m\angle H= 360°\\

[From\: equations\: (1)\: \& \:(2)] \\

\therefore 120° +2m \angle H = 360°\\

\therefore 2m \angle H = 360°-120°\\

\therefore 2m \angle H = 240°\\

\therefore m \angle H = \frac{240°} {2} \\

\huge\purple {\boxed {\therefore m \angle H = 120°}} [/tex]

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