HW #3 Circumcenter & Incenter

The circumcenter of a triangle is the point where the perpendicular bisectors of the sides intersect. It is equidistant from all three vertices of the triangle.

To find the circumcenter, calculate the midpoints of at least two sides of the triangle, then find the slopes of those sides. Use the negative reciprocal of the slopes to find the equations of the perpendicular bisectors, and solve the equations simultaneously to find the circumcenter.

The incenter of a triangle is the point where the angle bisectors of the triangle intersect. It is equidistant from all three sides of the triangle.

To find the incenter, calculate the lengths of the sides of the triangle, then use the formula: I = (aA + bB + cC) / (a + b + c), where A, B, and C are the vertices and a, b, and c are the lengths of the sides opposite those vertices.

The circumradius is the radius of the circumcircle, which is the circle that passes through all three vertices of the triangle. The circumcenter is the center of this circumcircle.

The circumradius R can be calculated using the formula: R = (abc) / (4K), where a, b, and c are the lengths of the sides of the triangle and K is the area of the triangle.

The circumcenter is significant because it helps in constructing the circumcircle, determining the circumradius, and is used in various geometric proofs and constructions.