The discussion revolves around finding values of x in the interval [0, 2pi] that satisfy the inequality sin x > cos x, using concepts from the unit circle.
Participants are actively questioning the validity of proposed intervals and assumptions. Some have suggested methods for determining the intervals based on critical points, while others express confusion about how to express their findings in inequality notation.
There is some uncertainty regarding the endpoints of the intervals and the correct interpretation of the inequality. Participants are also navigating the challenge of expressing their reasoning clearly in mathematical notation.
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