Let us study about Intersecting circles,

Two circles may intersect in two imaginary points, a single degenerate point, or two distinct points.
The intersections of two circles determine a line known as the radical line. If three circles mutually intersect in a single point, their point of intersection is the intersection of their pairwise radical lines, known as the radical center.
The two circles are said to intersect orthogonally if the angle between the tangents at their point of intersection is 900.

I hope the above explanation was useful.

Two circles may intersect in two imaginary points, a single degenerate point, or two distinct points.
The intersections of two circles determine a line known as the radical line. If three circles mutually intersect in a single point, their point of intersection is the intersection of their pairwise radical lines, known as the radical center.
The two circles are said to intersect orthogonally if the angle between the tangents at their point of intersection is 900.
I hope the above explanation was useful.
No comments:
Post a Comment