Question

How do you solve `-2sinx=-sinxcosx` for `0<=x<=2pi`?

Answer 1

There is no solution because it reduces to `cos(x) = 2`, which cannot be.

Answer 2

`x in {0, pi, 2pi}`

Explanation:

`-2sin(x)=-sin(x)cos(x)`

`=> sin(x)cos(x)-2sin(x) = 0`

`=> sin(x)(cos(x)-2) = 0`

`=> sin(x) = 0 or cos(x)-2 = 0`

The second equation has no solutions, so we have

`sin(x) = 0`

In general, `sin(x) = 0 <=> x = pin, n in ZZ`.

On the interval `[0, 2pi]`, there are three such values, corresponding to `n=0, n=1, n=2`. Thus, our solution set is

`x in {0, pi, 2pi}`