To determine whether triangles are similar recall what "similar" means by the AA criterion. To be "similar" triangles need to have congruent angles. Also recall that all triangles have interior angles that sum to 180 degrees. 

 is given below. By the figure it is known that  and by the statement, . Knowing this information, the measure of the last angle can be calculated.

Therefore, for a triangle to be similar to  by the AA criterion, the triangle must have angle measurements of 42, 92, and 46 degrees. Thus,  is a similar triangle.

To determine whether triangles are similar recall what "similar" means and the AA criterion. To be "similar" triangles need to have congruent angles. Also recall that all triangles have interior angles that sum to 180 degrees. 

Knowing this, look at triangle A.

Two angles are given and the third can be calculated.

Now, look at triangle B.

Now, look at triangle C.

Since triangles A and B have the same angle measurements, they are considered to be similar. Triangle C only has one angle that is congruent to the other triangles thus, triangle C is not similar to either of the other two triangles.

To determine whether triangles are similar recall what "similar" means and the AA criterion. To be "similar" triangles need to have congruent angles. Also recall that all triangles have interior angles that sum to 180 degrees. 

Knowing this, look at triangle A.

Two angles are given and the third can be calculated.

Now, look at triangle B.

Now, look at triangle C.

Since triangles A, B, and C do not have any angles that are congruent, none of these triangles are similar.

To determine whether triangles are similar recall what "similar" means and the AA criterion. To be "similar" triangles need to have congruent angles. Also recall that all triangles have interior angles that sum to 180 degrees. 

Knowing this, look at triangle A.

Two angles are given and the third can be calculated.

Now, look at triangle C.

Since triangles A and C have the same angle measurements, they are considered to be similar. Therefore, the answer to the question is "yes".

To determine whether triangles are similar recall what "similar" means and the AA identity. To be "similar" triangles need to have congruent angles. Also recall that all triangles have interior angles that sum to 180 degrees. 

In  , and in  the . 

Since only one angle is known from each triangle there is not enough information to determine whether these two triangles are similar by the AA criterion.

Consider the triangle below

First we must understand the definition of complementary angles.  Complementary angles are a pair of angles that add up to 90 degrees.  Looking at the triangle above, we see that and  add up to 90, so they are complementary.

Recall that the definition of sine is  and cosine is .  

Next, list out the sine and cosine of  and .

Notice that 

And 

We have just shown that the sine of the two angles is equal to the cosines of their complements.  This is true for any acute angles.

You know that .  We use this information to set up our work in the following way:

To solve for , we need to use the definition of complementary.  Both of these angles should add up to be 90, so we can set up this problem by setting the sum of the two angles equal to 90.

This relationship is true for any pair of angles that are complementary (i.e. any two angles that add up to 90). We can see this in obtuse triangles that have two acute angles that add up to 90, we can see it in acute triangles, and equilateral triangles as well.  Beyond triangles this relationship is also true.

We will use the definition of complementary to solve for .   and  must sum up to be 90 by the definition of complementary angles.  We are able to set up the following equation:

 (combine like terms)