Asked by Hanu
Solve the inequality sinx>square root x.
Answers
Answered by
Reiny
sin x > √x
we can say immediately that x≥0 , since we can't take the square root of a negative.
so I would graph y = sinx
and y = √x and look at the region where the sinx is above the √x
http://www.wolframalpha.com/input/?i=y+%3D+sin%28x%29+%2C+y+%3D+√x+for+x≥0
notice that they both pass though the origin, but after that they never intersect or touch again, and the sine is always above the square root function.
so x ≥ 0
we can say immediately that x≥0 , since we can't take the square root of a negative.
so I would graph y = sinx
and y = √x and look at the region where the sinx is above the √x
http://www.wolframalpha.com/input/?i=y+%3D+sin%28x%29+%2C+y+%3D+√x+for+x≥0
notice that they both pass though the origin, but after that they never intersect or touch again, and the sine is always above the square root function.
so x ≥ 0
Answered by
Reiny
mis-stated the result of the graph
notice that the sin(x) is always below y = √x
so there is no solution to
sin(x) > √x
notice that the sin(x) is always below y = √x
so there is no solution to
sin(x) > √x
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