Answer:
Exactly one triangle exists with the given conditions, and it must be an isosceles triangle.
Brainliest?
Step-by-step explanation:
Let be the measure of one angle in our triangle; since we have two equal angles in our triangle, their measure will be .
We know from our problem that at least one angle of our triangle measure 52°; since the sum o the interior angles of a triangle is 180°, we can use an equation to relate the quantities and solve for to find the measure of the tow equal angles:
Now how know that the measure of the angles of our triangle are 52°, 64°, and 64°. Since we have tow equal angles in our triangle, we can conclude that our triangle is isosceles. Notice that we don't have any given side, so the sides of our isosceles triangle can vary in length.
We can conclude that the correct answer is: C. Exactly one triangle exists with the given conditions, and all instances must be isosceles triangles.
