question 25 of 40
what is the missing justification in the proof of the angle bisector construction?

statement | justification
--- | ---
$\overline{bm}$ is congruent to $\overline{bn}$. | the segments were drawn by the same compass setting.
$\overline{mp}$ is congruent to $\overline{np}$. | the segments were drawn by the same compass setting.
$\overline{bp}$ is congruent to $\overline{bp}$. |
$\triangle bmp$ is congruent to $\triangle bnp$. | sss congruence
$\angle mbp$ is congruent to $\angle nbp$. | cpctc
$\overrightarrow{bp}$ bisects $\angle abc$. | $\angle mbp$ and $\angle nbp$ are congruent and adjacent.

a. transitive property
b. symmetric property
c. congruence property
d. reflexive property

Question

question 25 of 40
what is the missing justification in the proof of the angle bisector construction?

statement | justification
--- | ---
$\overline{bm}$ is congruent to $\overline{bn}$. | the segments were drawn by the same compass setting.
$\overline{mp}$ is congruent to $\overline{np}$. | the segments were drawn by the same compass setting.
$\overline{bp}$ is congruent to $\overline{bp}$. |
$\triangle bmp$ is congruent to $\triangle bnp$. | sss congruence
$\angle mbp$ is congruent to $\angle nbp$. | cpctc
$\overrightarrow{bp}$ bisects $\angle abc$. | $\angle mbp$ and $\angle nbp$ are congruent and adjacent.

a. transitive property
b. symmetric property
c. congruence property
d. reflexive property

Accepted Answer

# Brief Explanations:
The statement $\overline{BP} \cong \overline{BP}$ refers to a segment being congruent to itself. The property that states any geometric figure is congruent to itself is the Reflexive Property, which is the correct justification here.
# Answer:
D. Reflexive Property

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