## Congruent Triangles

*This post about congruent triangles is part of a series of posts to help you prepare for the Advanced Algebra and Functions part of the Accuplacer test.*

## Question

Angle *A* in triangle *ABC* is congruent to angle *D* in triangle *DEF*. Which of the statements below, if it’s true, proves that triangles *ABC* and *DEF* are congruent?

A. and

B. and

C. and

D. and

## Solution

Two triangles are congruent if one of these things is true:

- every side of one is congruent to a side of the other (SSS);
- two sides and the angle between them in one are congruent to two sides and the angle between them in the other (SAS); or
- two angles and any side in one are congruent to two angles and any side of the other (ASA or AAS).

Let’s go through the answer choices to see if one of them meets one of those criteria.

A. and .

That’s two angles and the side between them in one triangle being congruent to the corresponding parts in the other triangle. That’s enough to meet the first criterion above, so it looks like that’s the answer. But let’s check the others.

B. and

That’s two sides and an angle, but not the angle **between** them, so it does not do the job.

C. and . Same problem as answer choice B: Two sides and one angle of one are congruent to two sides and one angle of the other, but the angle is not the one between the two sides, so that information is not enough for a proof.

D. and . This gives you only congruent angles. Every proof of congruent triangles requires at least one side.

The correct answer

is **choice A.**

This question is similar to question number 16 in the sample questions for the Accuplacer Advanced Algebra and Functions test.