sin 4A = sin (2A + 2A)

We know that,

sin(A + B) = sin A cos B + cos A sin B

Therefore, sin 4A = sin 2A cos 2A + cos 2A sin 2A

⇒ sin 4A = 2 sin 2A cos 2A

From T-ratios of multiple angle,

We get,

sin 2A = 2 sin A cos A and cos 2A = cos²A – sin²A

⇒ sin 4A = 2(2 sin A cos A)(cos²A – sin²A)

⇒ sin 4A = 4 sin A cos³A – 4 cos A sin³A

Hence, sin 4A = 4 sin A cos³A – 4 cos A sin³A

L.H.S. = sin 4A

= 2 sin 2A- cos 2A 

= 2(2 sin A cosA)(cos² A – sin² A)

= 4 sin A • cos³ A – 4 cos A sin³ A = R.H.S.