How do you find the maximum of f(x) = 2sin(x^2)?

1 Answer
Jim H
Mar 6, 2015

The maximum value of f(x)=2sin(x^2) is 2.

This is an example of a kind of problem sometimes asked in a calculus class. It is a kind of a trap question. You do not need calculus to answer this question.

The maximum value of the sine function is 1. This happens when x^2=pi/2+2 pi k for any integer k.

I also know that x^2= pi/2 when x=sqrt(pi/2).

So the maximum value of this function is 2.

If you need to know where else the maximum occurs, then you need to solve: x^2=pi/2+2 pi k=pi/2 (1+4k) for any integer k.

The solutions are x=+-sqrt(pi/2)sqrt (1+4k) which might be easier to read written: x=+-sqrt (1+4k)sqrt(pi/2) for any integer k.

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