Question

How do you solve `tanx=1` and find all exact general solutions?

Answer 1

`x in {((2n+1)pi)/2, n in ZZ}`

Explanation:

If `tan x = 1`, then `sin x = cos x`.

We know this is true for `x = pi/4` as a base case.

Now, the tangent function is periodic with it's period
`p = npi`, where `n` is an integer.

So `tan x = tan (x+npi)`. Go back to the original equality :

`tan x = tan (x+npi) = 1`

The first positive value `x_0` for which `tan x = 1` is, as stated before, `pi/4`.

`tan x_0 = tan(x_0 + npi) =1`

`tan(pi/4 + npi) = tan (((4n+1)pi)/4) = 1`

Which means `tan x = 1` if and only if `x` is a number of the form
`((4n+1)pi)/4`:

`x in {((4n+1)pi)/4 , n in ZZ}`.