Answer:
The proof is derived from the summarily following equations;
∠FBE + ∠EBD = ∠CBA + ∠CBD
∠FBE + ∠EBD = ∠FBD
∠CBA + ∠CBD = ∠ABD
Therefore;
∠ABD ≅ ∠FBD
Step-by-step explanation:
The two column proof is given as follows;
Statement [tex]{}[/tex] Reason
[tex]\underset{BD}{\rightarrow}[/tex] bisects ∠CBE [tex]{}[/tex] Given
Therefore;
∠EBD ≅ ∠CBD [tex]{}[/tex] Definition of angle bisector
∠FBE ≅ ∠CBA [tex]{}[/tex] Vertically opposite angles are congruent
Therefore, we have;
∠FBE + ∠EBD = ∠CBA + ∠CBD [tex]{}[/tex] Transitive property
∠FBE + ∠EBD = ∠FBD [tex]{}[/tex] Angle addition postulate
∠CBA + ∠CBD = ∠ABD [tex]{}[/tex] Angle addition postulate
Therefore;
∠ABD ≅ ∠FBD [tex]{}[/tex] Transitive property.
