Prove the following:

(sin A + cos A)² + (sin A - cos A)² = 2

Solving L.H.S. of equation : (sin A + cos A)² + (sin A - cos A)² = 2, we get,

⇒ (sin A + cos A)² + (sin A - cos A)²

⇒ sin² A + cos² A + 2 sin A cos A + sin² A + cos² A - 2 sin A cos A

Since, sin² A + cos² A = 1.

⇒ 1 + 2 sin A cos A + 1 - 2 sin A cos A

⇒ 2.

Since, L.H.S. = R.H.S.

Hence, proved that (sin A + cos A)² + (sin A - cos A)² = 2.