Problem:
In right triangle ABC with right angle C,CA=30 and CB=16. Its legs CA and CB are extended beyond A and B. Points O1β and O2β lie in the exterior of the triangle and are the centers of two circles with equal radii. The circle with center O1β is tangent to the hypotenuse and to the extension of leg CA, the circle with center O2β is tangent to the hypotenuse and to the extension of leg CB, and the circles are externally tangent to each other. The length of the radius of either circle can be expressed as p/q, where p and q are relatively prime positive integers. Find p+q.
Solution:
Let T1β and T2β be the points of tangency on AB so that O1βT1ββ and O2βT2ββ are radii of length r. Let circles O1β and O2β be tangent to each other at point T3β, let circle O1β be tangent to the extension of AC at E1β, and let circle O2β be tangent to the extension of BC at E2β. Let D1β be the foot of the perpendicular from O1β to BC, let D2β be the foot of the perpendicular from O2β to AC, and let O1βD1ββ and O2βD2ββ intersect at P. Let r be the radius of O1β and O2β. Note that O1βT3β=O2βT3β=r,CD1β=O1βE1β=r, and CD2β=O2βE2β=r. Because triangles ABC and O1βO2βP are similar, ABO1βO2ββ=ACO1βPβ=BCO2βPβ. Because O1βO2β=2r and AB=302+162β=34,O1βP=1730rβ and O2βP=1716rβ. By equal tangents, AE1β=AT1β=x and BE2β=BT2β=y. Thus
Also, O1βP=E1βD2β, so 1730rβ=AD2β+AE1β=30βr+x, and O2βP=E2βD1β, so 1716rβ=BD1β+BE2β=16βr+y. Adding these two equations produces 1746rβ=46β2r+x+y. Substituting x+y=34β2r yields 1746rβ=80β4r. Thus r=57680β, and p+q=737β.
OR
Draw O1βAβ and O2βBβ and note that these segments bisect the external angles of the triangle at A and B, respectively. Thus β T1βO1βA=21β(β A) and T1βA=rtanβ T1βO1βA=rtan21β(β A). Similarly T2βB=rtan21β(β B). By the half-angle identity for tangent,