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Question

In Figure $ \mathrm{D}$ and $ \mathrm{E}$ are points on side $ \mathrm{BC}$ of a $ \mathrm{\Delta ABC}$ such that $ \mathrm{BD}=\mathrm{CE}$ and $ \mathrm{AD}=\mathrm{AE}$. Show that $ \mathrm{\Delta ABD}\cong \mathrm{\Delta ACE}.$

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Solution

Step 1: Prove ADB=AEC.

Given: BD=CE and AD=AE

InADE,AD=AE (Given)

Since opposite angles to equal sides are equal.

ADE=AED-(1)

Now,

ADB+ADE=180° (Linear Pair)

ADB=180°-ADE-(2)

Similarly,

AEC=180°-AED-(3)

From (1) and (2)

ADB=180°-AED-(4)

From (3) and (4)

ADB=AEC

Step 2: Prove ΔABDΔACE.

InΔABDandΔACE,

AD=AE (Given)

ADB=AEC (From Step 1)

BD=EC (Given)

Hence ΔABDΔACE (by SAS congruency)

Hence proved ΔABDΔACE.


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