Given △ABC with circumcenter O. Let D be a point satisfying ∠ABD=∠DCA and M be the midpoint of AD. Suppose that BM,CM intersect circle (O) at another points E,F, respectively. Let P be a point on EF so that AP is tangent to circle (O). Prove that A,P,M,O are concyclic.
https://2.bp.blogspot.com/-gSgUG6oywAU/XnSKTnH1yqI/AAAAAAAALdw/3NuPFuouCUMO_6KbydE-KIt6gCJ4OgWdACK4BGAYYCw/s320/imoc2017%2Bg7.png geometrycircumcircleConcyclicequal angles