Given, (2x)2y=4.e2x−2y
Taking natural logarithm on both sides, we get
2yloge2x=loge4+(2x−2y)
⇒2y=(1+loge2xloge4+2x)
Differentiating both sides with respect to x, we get
dx2dy=(1+loge2x)2(1+loge2x).2−(loge4+2x)x1 (Using quotient rule)
⇒(1+loge2x)2dxdy=(xx.loge2x−loge2).