In the given figure,AB = AC and BP = CQ. Prov | vedclass

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(N/A) In $	riangle ABC$,$AB = AC$ (Given).$	herefore \angle ABC = \angle ACB$ ($\because$ Angles opposite to equal sides are equal).Since $P$ lies o

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(N/A) In $	riangle ABC$,$AB = AC$ (Given).$	herefore \angle ABC = \angle ACB$ ($\because$ Angles opposite to equal sides are equal).Since $P$ lies on $BC$ and $Q$ lies on $BC$,we have $\angle ABP = \angle ACQ$.Now,in $	riangle ABP$ and $	riangle ACQ$:$AB = AC$ (Given)$BP = CQ$ (Given)$\angle ABP = \angle ACQ$ (Proved above)So,by $SAS$ congruence criterion,$	riangle ABP \cong 	riangle ACQ$.$	herefore AP = AQ$ (by $CPCT$).Now,in $	riangle APQ$,since $AP = AQ$,$\Delta APQ$ is an isosceles triangle.

In the given figure,$AB = AC$ and $BP = CQ$. Prove that $\Delta APQ$ is an isosceles triangle.

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