Trignometry Inequalities in [0, 2pi)?

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Homework Statement



Solve the following equations or inequalities in the interval [0, 2pi).

2sin2x - 5sinx + 3 < 0


Homework Equations





The Attempt at a Solution



(2sin2x - 3)(sinx - 1)
sinx = 3/2 or sinx = 1

Not sure what to do now

sinx = 3/2 is impossible?
sinx = 1 then x = 90 = pi/2
 
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just correcting your square...

2sin2x - 5sinx + 3 = (2sinx-3)(sinx-1)

However rather than finding the bounding points (=0, though your thinking was correct) you have an inequality
(2sinx-3)(sinx-1) < 0

so what conditions need to be satisfied for (2sinx-3)(sinx-1) to be negative?
 
Do I need to sub in points to see rather it is positive or negative before and after sinx - 1?
 
Your inequality in factored form is (2sinx-3)(sinx-1) < 0.
As you have already noticed, the first factor can't be zero, which means that it is either always positive or always negative, no matter what x value you substitute. Determine which of these it is.

For the product of the two factors to be negative, they have to be opposite in sign.
 
following on from what Mark said, if the sin's are confusing, first solve for y, ie
(2y-3)(y-1)<0

then translate that to the original problem, by y = sinx, knowing that only y values in the range [-1,1] are allowable solutions for x
 
So I think that (2sinx-3) is always neagative, this means that I need to find values of x where (sinx -1) is positive to satisfy the inequality?
 
Does this mean I need to solve sinx > 1?
I don't think there are any values where sinx > 1. Or am I confused about what I'm doing?
sinx is 1 when x is 90
 
sin(x) = 1 when x = (90 + k*360) degrees, but are there any values of x for which sin(x) > 1? If you're not sure, see lanedance's post 5.
 
What happens if there are no values where sinx > 1?
 
Then the inequality has no solutions.