Problem:
Circle C1β has its center O lying on circle C2β. The two circles meet at X and Y. Point Z in the exterior of C1β lies on circle C2β and XZ=13,OZ=11, and YZ=7. What is the radius of circle C1β ?
Answer Choices:
A. 5
B. 26β
C. 33β
D. 27β
E. 30β Solution:
Let r be the radius of C1β. Because OX=OY=r, it follows that β OZY=β XZO. Applying the Law of Cosines to triangles XZO and OZY gives
Let P be the point on XZ such that ZP=ZY=7. Because OZ is the bisector of β XZY, it follows that β³OPZβ β³OYZ. Therefore OP=OY=r and thus P is on C1β. By the Power of a Point Theorem, 13β 7=ZXβ ZP=OZ2βr2=112βr2. Solving for r2 gives r2=30 and so r=30ββ.
