The discussion focuses on solving the inequality sin x > cos x within the interval [0, 2π]. Participants clarify that the correct critical points where sin x = cos x are π/4 and 5π/4. The valid intervals for which sin x > cos x are determined to be (π/4, 5π/4). The importance of identifying these critical points is emphasized, as they segment the interval into subintervals where the inequality can be tested.
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Mark44 said:No, and no. pi/3 is not larger than 7pi/6, and neither value is correct for sin x = cos x. You need to find all solutions of this equation in the interval [0, 2pi], and then find the intervals for which sin x > cos x.
This is your problem, and is what Char. limit and I have been trying to get across to you. In order to find out where sin x > cos x, you need to first find out where sin x = cos x. There are two values of x in [0, 2pi] that satisfy this equation. The interval you specify for which sin x > cos x will have to use these values.huntingrdr said:I am not trying to find where sinx = cosx.
It is not true that sinx = cosx at all of these values. Some of them, yes, but not all of them.huntingrdr said:I know pi/4, 3pi/4, 5pi/4, and 7pi/4: sinx=cosx though.
pi/3 and 7pi/6 are totally irrelevant to this problem.huntingrdr said:Ok I'm not sure how to write it in inequality format but I know starting at pi/3 and going to 7pi/6, the sinx value is great than the cosx value. Right? Now how can I write this in inequality notation?
Maybe it is 7pi/6 > x > pi/3