# Congruent Angles

A theorem is a true statement that can be proven.

Angle congruence is reflexive, symmetric, and transitive.

- Reflexive - For any \(\; \angle A\; \), \(\; \angle A\; = \angle A \)
- Symmetric - If \(\; \angle A = \angle B \; \) , then \(\; \angle B = \angle A \; \)
- Transitive - If \(\; \angle A = \angle B \; \) and \(\; \angle B = \angle C \; \), then \(\; \angle A = \angle C \; \)