Question

Question #71ebe

Answer 1

I have changed the question so that it is an identity. (Without the parentheses it is not.)

Explanation:

Start with

`(1+cosx)/(1-cosx) - (1-cosx)/(1+cosx)`

We want a single quotient, so get a common denominator and simplify.

`(1+cosx)/(1-cosx) - (1-cosx)/(1+cosx) = ((1+cosx)(1+cosx) - (1-cosx)(1-cosx))/((1-cosx)(1+cosx))`

`= ((1+2cosx+cos^2x)-(1-2cosx+cos^2x))/(1-cos^2x)`

It's hard to see whether this helped, so keep simplifying.

`= (1+2cosx+cos^2x-1+2cosx-cos^2x)/(1-cos^2x)`

`= (4cosx)/(1-cos^2x)`

Now, at least I see a `4` in the numerator, so that's good. We want a `sinx` in the denominator, so use the Pythagorean identity to get

`= (4cosx)/sin^2x`

Now, recall that `tanx = sinx/cosx` and rewrite

`= (4cosx)/(sinxsinx) = 4/(sinxsinx/cosx) = 4/(sinxtanx)`