In a A B C , it is given that A B=A C a...

In a ` A B C ,` it is given that `A B=A C` and the bisectors of `/_B\ a n d\ C` intersect at `Odot` If `M` is a point on `B O` produced, prove that `/_M O C=\ /_A B C`

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In a ` A B C ,` it is given that `A B=A C` and the bisectors of `/_B\ a n d\ C` intersect at `Odot` If `M` is a point on `B O` produced, prove that `/_M O C=\ /_A B C`

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