Question

How do you simplify `cot^2x-csc^2x`?

Answer 1

`-1`

Explanation:

One of the fundamental identities is `1+cot^2(x) = csc^2(x)`.

Starting with your given:

`cot^2(x)-csc^2(x)`

Replace `csc^2(x)` with `1+cot^2(x)`:

`cot^2(x)-(1+cot^2(x))`

`=cot^2(x)-1-cot^2(x))`

`=-1`

Answer 2

`cot^2x-csc^2x=-1`

Explanation:

Use the identity `1+cot^2x=csc^2x`

Subtract `cot^2x` to both sides:

`1=csc^2x-cot^2x`

Rewrite as:

`1=-cot^2x+csc^2x`

Divde both sides by a negative `(-)`

`-1=cot^2x-csc^2x`

Answer 3

`-1`

Explanation:

Another way is to reduce all the functions to sine and cosines

`cot^2x-csc^2x=cos^2x/sin^2x-1/sin^2x`

`=(cos^2x-1)/sin^2x`

`= -(1-cos^2x)/sin^2x=-sin^2x/sin^2x`

`=-1`