Question

If `sintheta + 4csctheta + 5 = 0`, what is the value of `theta`, on `[0, 2pi)`?

Answer 1

By the reciprocal identity `cscbeta = 1/sinbeta`:

`sintheta + 4/sintheta + 5 = 0`

Put on a common denominator.

`(sin^2theta + 4 + 5sintheta)/sintheta = 0`

`sin^2theta + 5sintheta + 4 = 0`

Let `t = sintheta`.

`t^2 + 5t + 4 = 0`

`(t + 4)(t + 1) = 0`

`t = -4 and -1`

`sintheta = -4 and sin theta = -1`

However, since the domain of `y = arcsinx` are `-1 ≤ x ≤ 1`, there is no real solution to `sintheta = -4`.

Hence, the only solution is `270˚` ( by the unit circle).

Hopefully this helps!