Question

select the correct answer from each drop - down menu. the partial construction for an inscribed circle is shown. the center of the inscribed circle can be found by constructing the circle inscribed in triangle pqr is centimeters. the radius of the submit reset

Explanation:

Step1: Recall in - center property

The center of an inscribed circle in a triangle is the in - center, which is the point of intersection of the angle bisectors of the triangle.

Step2: Recall in - radius property

The radius of the inscribed circle (in - radius) is the perpendicular distance from the in - center to any side of the triangle. From the figure, the perpendicular distance from the in - center (the intersection of the constructed lines) to side PQ is 0.06 cm.

Answer:

The center of the inscribed circle can be found by constructing the angle bisectors of the triangle. The radius of the circle inscribed in triangle PQR is 0.06 centimeters.