By Menelaus' theorem$\dfrac{MA}{AC}\cdot \dfrac{CE}{ED}\cdot \dfrac{DB}{BM}=1\Rightarrow \dfrac{CE}{ED}=\dfrac{CA}{DB}$ Consider that $\angle ACO=\angle ODM\Rightarrow DB=AC\Rightarrow CE=ED$ By Miquel'theorem we can know that $A,O,E,C$ are cyclic $\Rightarrow OO'\bot CD \Rightarrow \angle CEO'=\angle DEO'$ Let $I,J$ be the circumcenters of $\odot(CEO'),\odot(DEO')$ respectively Note that $C,I,O'$are collinear,$D,J,O'$are collinear $\Rightarrow$ $\odot(CEO')$and$\odot(DEO')$are tangent to $\Gamma '$