Given:
[tex]\overline {DC}[/tex] bisects ∠ACB
[tex]\overline {A C} \cong \overline{B C}[/tex]
To prove:
[tex]\triangle A C D \cong \triangle B C D[/tex]
Solution:
Now writing statement with reason in step by step.
In [tex]\triangle A C D\ \text{and} \ \triangle B C D,[/tex]
Step 1: Given
[tex]\overline {DC}[/tex] bisects ∠ACB
[tex]\Rightarrow \angle ACD \cong \angle BCD[/tex] (Angle)
Step 2: Given
[tex]\overline {A C} \cong \overline{B C}[/tex] (Side)
Step 3: By reflexive property,
[tex]\overline {D C} \cong \overline{D C}[/tex] (Side)
Step 4: By SAS congruence rule
[tex]\triangle A C D \cong \triangle B C D[/tex]
Hence proved.
