Question

Differentiate the function `y=log_e(cos2x)`. What is the area of the region enclosed by the curve `f (x)= tan(2x)`, the x axis and the lines `x=0 and x=\pi/8`?

Answer 1

`dy/dx = (-2sin(2x))/cos(2x)`

Explanation:

I will answer the question about differentiating `y = log_e(cos2x)`.

First of all, `y= log_e(cos2x)` is equivalent to `y = ln(cos2x)`. Instead of using the chain rule to differentiate this twice, I would recommend changing this into exponential form.

`e^y = cos2x`

By the chain rule and implicit differentiation, we can differentiate. I'll start by showing you how to use the chain rule for `cos2x`.

We let `y = cosu` and `u = 2x`, then `dy/(du) = -sinu` and `(du)/dx= 2`.

`dy/dx= 2 xx -sinu`

`dy/dx = -2sin(2x)`

The entire function, now:

`e^y(dy/dx) = -2sin(2x)`

`dy/dx= (-2sin(2x))/e^y`

`dy/dx = (-2sin(2x))/(e^(ln(cos2x)))`

`dy/dx = (-2sin(2x))/cos(2x)`

Hopefully this helps!