The statement that the shortest distance from the center of the circumscribed circle to the vertices of the inscribed triangle is the circle's radius is true
How to determine the true statement?
When a triangle is placed in a circle such that the vertices of the circle touch the circumference of the circle, then the circle is a circumscribed circle.
Having highlighted that, a line drawn from the center of the circle to the vertices of the triangle is the shortest possible line.
However, it is certain that this line is the radius.
This is so because the vertices of the triangle lie on the circumference of the circle
Hence, the statement that the shortest distance from the center of the circle is true
Read more about circumscribed circle at:
https://brainly.com/question/2699432
#SPJ9
