Given $A(a,b),B(0,0),C(c,0)$. The equation of the angle bisector of $B\ :\ bx-(a+u)y=0$ with $u=\sqrt{a^{2}+b^{2}}$. The equation of the angle bisector of $C\ :\ bx-(a-c+w)y-bc=0$ with $w=\sqrt{(a-c)^{2}+b^{2}}$. Point $K(\frac{c(a+u)}{c+u-w},\frac{bc}{c+u-w})$. Point $O(\frac{c}{2},\frac{c(a-c+w)(c+u+w)}{2b(c+u-w)})$. The equation of the line $KO$ is ugly and on control, $A \in KO$.