Question

In a right angled triangle ABC , BD perpendicular to AC , then Prove that AB^2 - BC^2 + AC^2 = 2 AC × AD

Answer 1

Answer:

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Since these are Right Angled triangles, we have

AB^2 = BD^2 + AD^2 —— 1 and

AC^2 = CD^2 + AD^2 —— 2

From 1, we get

AD^2 = AB^2 - BD^2 —— 3

and from 2, we get

AD^2 = AC^2 - CD^2 —— 4

Since both 3 and 4 are about AD^2, we get

AB^2 - BD^2 = AC^2 - CD^2

On rearranging BD^2 and CD^2, we get

AB^2 + CD^2 = AC^2 + BD^2

Hence proved!

Step-by-step explanation: