Congruency Proving
This lesson is an extension of the introductory course on Congruency and Similarity – An Introduction. In the introductory course, you learned what congruent and similar triangles are.
In this lesson, you will learn how to prove that two triangles are congruent.
Related Lessons:
Proving Congruency
When proving that two triangles are congruent, we can use the following criteria:
- SSS
- SAS
- SAA
- ASA
- RHS
Note that RHS is used specifically for right-angled triangles. If a triangle is right-angled, it is usually best to try using RHS first, unless it cannot be applied.
Proving Congruency Example 1
In the diagram, β π΄πΈπ·=β π΄πΆπ΅=90Β° and AE=AC.
- Name a pair of congruent triangles and state the reason.
- If β πΆπ΄πΈ=35Β°, find β CPD
Proving Congruency Example 2
- In the diagram ACX and YBC are straight lines. It is given that AB=AC=CX and YB=BC. Showing your working clearly, prove that two triangles are congruent.
- State the angle which has the same value as β πΆπ΅π