Math, asked by luckykumar84, 10 months ago

please solve this question ​

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Answers

Answered by sparkle133
1

Step-by-step explanation:

sorry dear I am somewhat bad in maths

Answered by Anonymous
0

ANSWER:-

Given:

P is a point on the bisector of ∠ABC. If the line through P, parallel to BA meets BC at Q.

To prove:

Prove that BPQ is an Isosceles triangle.

Proof:

Given that P is the point on the bisector of an ∠ABC, & PQ||AB.

Since,

BP is the bisector of ∠ABC=∠ABP=∠PBC........(1)

Now,

PQ||AB

∠BPQ = ∠ABP......(2) [Alternate Angles]

From (1) & (2), we get;

∠BPQ = ∠PBC

Or

∠BPQ = ∠PBQ

Now,

In ∆BPQ

∠BPQ = ∠PBQ

So,

∆BPQ is an Isosceles triangle.

Hence, proved.

Hope it helps ☺️

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