Triangle CDE is similar to Triangle pqr angle C measures 13° angle D measure 65 degrees what are the measures of angles p q and r
Since triangles CDE and PQR are similar, their corresponding angles are equal.
Given that angle C measures 13° in triangle CDE, angle P will also measure 13° in triangle PQR.
Similarly, since angle D measures 65° in triangle CDE, angle Q will measure 65° in triangle PQR.
To find the measure of angle R, we can use the property that the sum of angles in a triangle is always 180°. Therefore, we can calculate the measure of angle R by subtracting the measures of angles P and Q from 180°:
Angle R = 180° - (angle P + angle Q)
Angle R = 180° - (13° + 65°)
Angle R = 180° - 78°
Angle R = 102°
Therefore, the measures of angles P, Q, and R in triangle PQR are 13°, 65°, and 102° respectively.