QUESTION IMAGE
Question
mnpq is a trapezoid. find ( mangle pqm ).
Step1: Identify trapezoid parallel sides
$MN \parallel PQ$ (marked with congruent segment indicators)
Step2: Use alternate interior angles
$\angle NMP = \angle QPM = 32^\circ$ (alternate interior angles for parallel lines $MN \parallel PQ$ cut by transversal $MP$)
Step3: Analyze $\triangle MNP$
$MN = NP$ (marked congruent), so $\triangle MNP$ is isosceles. Thus $\angle NMP = \angle NPM = 32^\circ$.
Step4: Calculate $\angle MPQ$
$\angle MPQ = 32^\circ$ (from Step2)
Step5: Find $\angle NPQ$
$\angle NPQ = \angle NPM + \angle MPQ = 32^\circ + 32^\circ = 64^\circ$
Step6: Use isosceles trapezoid property
In trapezoid $MNPQ$, $MN \parallel PQ$ and $NP = MQ$ (marked congruent), so it is isosceles. $\angle PQM = \angle NPQ$
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$64^\circ$