Note that Brainly shows a different verified answer? In ABC, the angle bisectors meet at point D. Point E is on AC, and DE is perpendicular to AC. Point F is the location where the perpendicular bisectors of the sides of the triangle meet. What is the radius of the largest circle that can fits inside ABC?
Brainly:
AD is the radius of the largest circle that can fit inside the ABC.
The radius of the largest circle that can fit inside triangle ABC is equal to the length of the shortest perpendicular segment from a vertex of the triangle to one of the sides.
In this case, the shortest perpendicular segment is AD, which is the distance from vertex A to the angle bisector AD.
Therefore, the answer is A. AD.
Learn more about triangles here:
brainly.com/question/2773823for
In ABC, the angle bisectors meet at point D. Point E is on AC, and DE is perpendicular to AC. Point F is the location where the perpendicular bisectors of the sides of the triangle meet. What is the radius of the largest circle that can fits inside ABC?

2 show DE that look more correct- could a diagram be added and wrong answer removed?