[tex]\boxed{{\text{Option c}}}[/tex] is correct as to construct a circle inscribed in a triangle and a circle circumscribed about the triangle use the intersection of the bisectors to find the center of circle.
Further explanation:
To construct a circle inscribe in a triangle obtain the angle bisectors of all angles of the triangle.
The center of the circle is obtained from the intersection of the bisectors of angles.
To construct a circle circumscribe over a triangle obtain the perpendicular bisectors of all sides of the triangle.
The center of the circle is obtained from the intersection of the bisectors of all sides of the triangle.
The step similar to construct a circle inscribed in a triangle and a circle circumscribed about the triangle use the intersection of the bisectors to find the center of circle.
Option a is not correct as it is not used to construct a circle inscribed in a triangle and a circle circumscribed about the triangle use the intersection of the bisectors to find the center of circle.
Option b is not correct as it is not used to construct a circle inscribed in a triangle and a circle circumscribed about the triangle use the intersection of the bisectors to find the center of circle.
[tex]\boxed{{\text{Option c}}}[/tex] is correct as to construct a circle inscribed in a triangle and a circle circumscribed about the triangle use the intersection of the bisectors to find the center of circle.
Option d is not correct as it is not used to construct a circle inscribed in a triangle and a circle circumscribed about the triangle use the intersection of the bisectors to find the center of circle..
Learn more:
1. Learn more about rotation of triangle https://brainly.com/question/2992432
2. Learn more about angles https://brainly.com/question/1953744
3. Learn more about coordinates of triangle https://brainly.com/question/7437053
Answer details:
Grade: Middle School
Subject: Mathematics
Chapter: Triangle
Keywords: sum, angle, altitude, triangle, sides, points, perpendicular, inscribed, circumscribe, circle, intersection, construct, similar, angle bisector, right angle, third side, right angled triangle, simplified.
