(1) Let $C,D$ be the centers of $U,V$ respectively. $AB,CD$ intersect at $Q.$ $AC\parallel BD, \triangle ACQ\sim\triangle BDQ, \frac{CQ}{AC}=\frac{DQ}{BD}=\frac{CQ+CD}{BD}, CQ=\frac{CD.AC}{BD-AC}$ is constant, $Q$ is a fixed point. (2) Let $P,E$ be the mid-points of $AB,CD$ respectively. $\triangle PEQ\sim\triangle ACQ, PE=\tfrac12(AC+BD)$ is constant, the locus of $P$ is a circle with center at $E$ and radius $PE.\ \ \blacksquare$