Math, asked by anujkumar840gmailcom, 9 months ago

8 If the bisector of an angle of a triangle bisects the opposite side, prove
that the triangle is isosceles.

Answers

Answered by contactaditihazarika
0

Answer:

Step-by-step explanation:

Consider the ∆ABC, let AD be the bisector of ∠A and BD = CD. It is required to prove ∆ABC is an isosceles triangle i.e. AB = AC. For this draw a line from C parallel AD and extend BA. Let they meet at E.

It is given that

∠BAD = ∠CAD    ... (1)

CE||AD

∴ ∠BAD = ∠AEC  (Corresponding angles)  ... (2)

And ∠CAD = ∠ACE (Alternate interior angles)  ... (3)

From (1), (2) and (3)

∠ACE = ∠AEC

In ∆ACE, ∠ACE = ∠AEC

∴ AE = OAC (Sides opposite to equal angles)  ... (4)

In ∆BEC, AD||CE and D is the mid-point of BC using converse of mid-point theorem A is the mid-point of BE.

∴ AB = AE

⇒ AB = AC  [Using (4)]

In ∆ABC, AB = AC

∴ ∆ABC is an isosceles triangle.

Hence, proved

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Answered by MausamMagar
1

Answer:

NOTE: At the last of the solution, please write

Triangle ABC is an isosceles with AB = BC

Hence proved.

I hope it helped you.

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