Question

If sin x = -2/3 and x is in the third quadrant, how do you find the value of sin 2x?

Answer 1

`sin2x = (4sqrt(5))/9`

Explanation:

`sin2x` is equivalent to `2sinxcosx`.

We must hence find cosine of `x` to evaluate.

Letting `x` be the adjacent side, `y` be the opposite side and `r` be the hypotenuse, by pythagorean theorem we have:

`x^2 + y^2 = r^2`

`x^2 + (-2)^2 = 3^2`

`x^2 = 5`

`x =+- sqrt(5)`

Since we're in quadrant `3`, cosine is negative. It is impossible to have a negative hypotenuse, so `x` measures `sqrt(5)` units.

Hence, `cosx = -sqrt(5)/3`

We can now evaluate.

`sin(2x) = 2sinxcosx = 2(-2/3)(-sqrt(5)/3) = (4sqrt(5))/9`

Hopefully this helps!