Consider a triangle PQR whose incircle touches the sides QR, RP and PQ respectively at the points S, T and U.

J is a point which is located inside the triangle PQR such that the incircle of the triangle QJR touches QR, RJ and JQ respectively at the points S, K and L.

Determine whether or not the quadrilateral TULK is cyclic.

Let I and M be the incenters of triangles PQR and QJR
respectively. For the incircle of triangle QJR to touch
QR at point S, incenter M must lie on line segment SI.

Circles (Q,|QS|) and (R,|RS|) are tangent at point S
and incircles (I,|IS|) and (M,|MS|) are tangent at point S
with SI perpendicular to QR.

The intersections of these four circles (excluding point S)
are the points T, U, L, and K.

Inversion through a circle with center S inverts these four
circles  into four lines Q', R', I', and M' with Q' and R'
perpendicular to QR and I' and M' parallel to QR.

These four lines determine a rectangle whose vertices are the
inversions of points T, U, L, and K.

A circle W can be easily be circumscribed about this rectangle.
Since vertex J is located inside triangle PQR, circle W does
not pass through point S.

Therefore, the points T, U, L, and K lie on a circle which is
the inversion of circle W. 

Edited on July 28, 2007, 10:14 pm

Posted by Bractals on 2007-07-28 22:09:13