Question

In a triangle ABC, SegAD is perpendicular bisector of Seg BC, DB=3CD, Prove that 2AB²=2AC²+BC²​

Answer 1

Answer:

Given that AD ⊥ BC and DB = 3CD

To prove : 2AB2 = 2AC2 + BC2

Proof :

BD + DC = BC

3CD + CD = BC

4CD = BC ⇒ CD = BC / 4

DB = 3CD = 3BC / 4.

In a right angle traingle ACD ,

AC2 = AD2 + CD2.

AC2 = AD2 + BC2 / 16 -------(1)

In a right angle traingle ABD ,

AB2 = AD2 + BD2.

AB2 = AD2 + 9BC2 / 16 -------(2).

Substracting (1) from (2) we obtain

AB2  - AC2 = 9BC2 / 16 - BC2 / 16

16(AB2  - AC2 ) = 8BC2

2(AB2  - AC2 ) = BC2

2AB2 = 2AC2 + BC2

Answer 2

HERE IS YOUR ANSWER(See Attachment)

HOPE IT HELPS YOU OUT. PLEASE MARK ME AS BRAINLIEST