Suppose P is on BC $AE=BE \Rightarrow BP=BE=c-AE=c-\dfrac {a+c-b} 2=\dfrac {b+c-a} 2$ Similarly, we have $CP=\dfrac {b+c-a} 2$ so we are done

Six other circles congruent to the incircle. Let $ABC$ be a triangle and $A'B'C'$ the antimedial triangle. Draw two circles ($A_b$) and ($A_c$) outside $A'B'C'$, congruent to the circle inscribed in triangle $ABC$ and tangent to line $B'C', AB , AC$ and such that $A_b$ lies on the perpendicular through $A$ to the interior bisector at $B$, and $A_c$ lies on the perpendicular through $A$ to the interior bisector at $C$. Define $B_c, B_a$ and $C_a, C_b$ cyclically. The six points $A_b, A_c, B_c, B_a, C_a, C_b$ lie on a conic with center X(31312) and barycentric equation: $(a^3+3 a^2 (b+c)+b c (b+c)+a (2 b^2+7 b c+2 c^2)) x^2+(3 a+b+c) (a^2+3 a (b+c)+2 (b^2+3 b c+c^2)) y z + cyclic sum = 0.$

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