the figure shows a circle inscribed in a triangle. to construct the inscribed circle, angle bisectors were…

the figure shows a circle inscribed in a triangle. to construct the inscribed circle, angle bisectors were first constructed at each angle of the triangle. which happened next? a circle was constructed using the intersection of the angle bisectors as the center of the circle and the obtuse vertex as a point on the circumference of the circle. a circle was constructed using a vertex as the center of the circle and the intersection of the angle bisectors as a point on the circumference of the circle. segments perpendicular to the sides of the triangle through the intersection of the angle bisectors were constructed. segments bisecting each side of the triangle were constructed through the intersection of the angle bisectors.
Answer
Brief Explanations:
The in - center of a triangle (center of the inscribed circle) is the intersection of the angle bisectors. To find the radius of the inscribed circle, we construct perpendiculars from the in - center to the sides of the triangle.
Answer:
Segments perpendicular to the sides of the triangle through the intersection of the angle bisectors were constructed.