''b² - 4a c ³ 0''

where in this case a = 1, b = 2 sinq and c = 3 cos² q.

Therefore, the roots are real if and only if

4 sin² q- 12 cos² q ³ 0

Þ sin² q- 3 cos² q ³ 0

But sin² q = 1 - cos² q and so this is equivalent to

1- 4 cos² q ³ 0

Þ cos² q £ 1/4

Þ -1/2 £ cosq £ 1/2

and then we need 0 £ q £ 2p, and so the required values of q are

p/3 £ q £ 2p/3 or 4p/3 £ q £ 5p/3.

The way I did it is as follows:

x² + (5 cos²q+ 1)x + 9 cos⁴ q = 0

Then seeing as you've got sin² s in your answer to the first part we'll convert the cos² s and cos⁴ s to sin² s and sin⁴ s. So we'll use cos² q = 1 - sin² qand cos 2q = 1 - 2 sin²q, and we get

x² + (5(1 - 2sin² q) + 1)x + 9(1 - sin² q)² = 0

Þ x² + (6 - 10 sin² q)x + (9 - 18 sin²q+ 9sin⁴ q) = 0

Then using the quadratic formula,

x = (1/2)(-(6 - 10 sin² q) ±((6 - 10 sin² q)² - 4(9 - 18 sin² q+ 9 sin⁴ q))^1/2)

= 5 sin² q- 3 ±((9 - 30 sin² q+ 25 sin⁴ q) - (9 - 18 sin² q+ 9 sin⁴ q))^1/2

= 5 sin² q- 3 ±(16 sin⁴ q- 12 sin² q)^1/2

Then, squaring the roots to the first equation, we get

x² = (- sinq±(4 sin² q- 3)^1/2)²

= sin² q±2 sinq(4 sin² q- 3)^1/2 + 4 sin² q- 3

= 5 sin² q- 3 ±(16 sin⁴ q- 12 sin² q)^1/2

which are the roots to the second equation.

I hope that is clear - if not then please write back. That seems like quite a hard question for A level to me!

Good luck with the exams,

2 sinq(4 sin² q- 3)^1/2

= (4 sin² q)^1/2 (4 sin²q- 3)^1/2

= ((4 sin² q)(4 sin²q- 3))^1/2

= (16 sin⁴ q- 12 sin² q)^1/2

I hope that's clear.