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Q: When looking at a curve smaller than a semi circle you use angle bisectors to find the rest of the circle?
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Related questions

When looking at a curve smaller than a semi circle can you use the angle bisectors to find the rest of the circles?

When looking at a curve smaller than a semicircle, you use angle bisectors to find the rest of the circle.


When looking at a curve smaller than a semicircle you use angle bisectors to find the rest of the circle true or false?

false


When looking at a curve smaller than a semicircle you use angle bisectors to find the rest of the circle?

Yes yes yes yes yes... No ... Yes yes yes yes!


The angle bisectors of a triangle share a common point of what?

The three bisectors meet at a point which is the centre of the circle. is you draw the circle that has that point as centre and 1 of the corners as a point on the circle, all corners will be on the circle


What do you called the intersection point of angle bisector?

The three angle bisectors in a triangle always intersect in one point, and this intersection point always lies in the interior of the triangle. The intersection of the three angle bisectors forms the center of the circle in- scribed in the triangle. (The circle which is tangent to all three sides.) The angle bisectors meet at the incenter which has trilinear coordinates.


What describes the point where three angle bisectors of a triangle meet?

The point where all three angle bisectors meet is the centre of the incircle - the circle which touches all the sides of the triangle (alternatively described as the circle for which the sides of the triangle are tangents).


What is the common intersection of the angle bisectors of a triangle.?

The common intersection of the angle bisectors of a triangle is called the incenter. It is the center of the inscribed circle of the triangle, and is equidistant from the three sides of the triangle.


Is the distance from the point of concurrency of the angle bisectors of a triangle to a point on the inscribed circle is the radius of the circle True or False?

false


Is the distance from the point of concurrency of the angle bisectors of a triangle to a point on the inscribed circle is the radius of the cirlce?

yes


What is the center of the largest circle that you could draw inside a given triangle?

The incentre, which is the point at which the angle bisectors meet.


At what point are the angle bisectors of a triangle concurrent?

Angle bisectors intersect at the incenter which is equidistant from the sides


What is the intersection of the angle bisectors called?

The 3 angle bisectors of a triangle intersect in a point known as the INCENTER.