If you understand how to solve this algebraic equation for y:
2y² - y - 1 = 0
(2y + 1)(y - 1) = 0
2y + 1 = 0; y - 1 = 0
2y = -1; y = 1
y = 
then you can understand how to solve this trigonometric equation
for sin(x):
2sin²(x) - sin(x) - 1 = 0
[2sin(x) + 1][sin(x) - 1] = 0
2sin(x) + 1 = 0; sin(x) - 1 = 0
2sin(x) = -1; sin(x) = 1
sin(x) =
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To solve
sin(x) =
2e remember that sin(30°) = 
then
you know that 30° is the reference angle. The
fact that the sine is a negative number, that
tell you that the angle x is in the 3rd or
4th quadrant.
To get the angle in the 3rd quadrant which has
referent angle 30², we add 30² to 180° and get
210°.
To get the angle in the 4th quadrant which has
referent angle 30², we subtract 30° from 360°
and get 330°.
So two of the solutions are 210° and 330°.
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To solve sin(x) = 1,
we remember that sin(90°) = 1
So the other solution is 90°.
The three solutions are then:
x = 90°, x = 210°, and x = 330°
Edwin
