In the circle, measure of modifying above Upper B Upper C with arc= 62 ° .

Since angle ABC and angle ACD are inscribed angles that subtend the same arc, they are equal.

Therefore, angle BCD = 62°.

Now, angle BCP is just the exterior angle of triangle BCD. The exterior angle of a triangle is equal to the sum of the interior opposite angles. Therefore, angle BCP = angle BCD + angle CBD.

Given angle BCD = 62° and angle CBD = 31°, we have:

angle BCP = 62° + 31° = 93°

Therefore, the measure of angle BCP is 93°.

Therefore, provided options are not correct, and the correct measure of angle BCP is 93°.