AIR MATH

Math Question

Prove the Isosceles Triangle Theorem. It says that if two sides of a triangle are congruent, then the angles opposite those sides are also congruent.
The diagram shows \( \triangle T U V \) with \( \overline{U T} \cong \overline{U V} \). It also shows the angle bisector of \( \angle T U V \) from \( U \) to a point \( W \) along \( \overline{T V} \).
Complete the proof that \( \angle T \cong \angle V \).
2 UW bisects \( \angle \) TuV 101111. 11 Given
3
\( 4 \overline{U W}=\overline{U W} \)
\( 5 . \triangle T U W= \) AVUW
\( 6 \angle T=\angle V \)
Corresponding parts of congruent triangles are congruent

Solution

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