What is the maximum value of the function $y = 2 sin 3 x$ $y=2sin3x$ ?

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What is the maximum value of the function $y = 2 sin 3 x$ $y=2sin3x$ ?

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Answer 1 · 2017-01-02T09:19:52

The max value of function $y = 2 sin 3 x$ $y = 2 sin 3 x$ is 2.

Explanation:

We can probe it using derivatives, but it's more easy to think about proporties of function $f (x) = sin x$ $f (x) = sin x$ .

All we know that kind of function has a periodic change between values $- 1$ $- 1$ and $1$ $1$ . Then, changes in the argument of the function as the substitute $x$ $x$ by $3 x$ $3 x$ modify the period of the latter but not its extreme values, which remain $- 1$ $- 1$ and $1$ $1$ .

When multiplying the function by the coefficient $2$ $2$ , what we do is multiply its values by $2$ $2$ , so that the function changes from $- 2$ $- 2$ to $2$ $2$ , and its maximum value will be the latter.

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What is the maximum value of the function $y = 2 sin 3 x$ $y=2sin3x$ ?

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What is the maximum value of the function $y = 2 sin 3 x$ $y=2sin3x$ ?