AIR MATH

Math Question

What is the missing justification in the proof of the angle bisector construction?
\begin{tabular}{|l|l|}
\hline \multicolumn{1}{|c|}{ Statement } \\
\( \overline{B M} \) is congruent to \( \overline{B N} . \) & Tustification the segments were drawn by \\
\( \overline{M P} \) is congruent to \( \overline{N P} . \) & The segments were drawn by the same compass setting. \\
\( \overline{B P} \) is congruent to \( \overline{B P} . \) & SSS Congruence \\
\( \triangle B M P \) is congruent to \( \triangle B N P . \) & CPCTC \\
\( \angle M B P \) is congruent to \( \angle N B P . \) & \( \angle M B P \) and \( \angle N B P \) are congruent and adjacent.
\end{tabular}
A. Symmetric Property
B. Transitive Property
C. Reflexive Property
D. Congruence Property

Solution

solution

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