How do you find the amplitude and period of $y = cos 4 x$ $y = cos 4x$ ?

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How do you find the amplitude and period of $y = cos 4 x$ $y = cos 4x$ ?

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Answer 1 · 2015-08-13T00:24:46

They can be determined by looking at the coefficients and their location.

Explanation:

Let's look at this equation:

$y = A cos (B x)$ $y = Acos(Bx)$

The $A$ $A$ and $B$ $B$ coefficients can tell us what the amplitude and period are.

First, $A$ $A$ tells us what the amplitude is. For example, the amplitude of $y = 2 cos (x)$ $y = 2cos(x)$ would be simply $2$ $2$ .

Second, $B$ $B$ tells us what the period is. In this case, we have to divide the normal period by $B$ $B$ in order to find the period.

For example, the period of cosine is $2 π$ $2pi$ . Therefore, the period would be $\frac{2 π}{B}$ $[2pi]/B$

For your specific question, $y = cos 4 x$ $y = cos4x$ , the amplitude would be $1$ $1$ and the period would be $\frac{2 π}{4}$ $[2pi]/4$ , or $\frac{π}{2}$ $pi/2$ .

NOTE: I wanted to mention to be careful when finding the period of tangent, as the normal period of tangent is $π$ $pi$ . Therefore, to find the period, you would do $\frac{π}{B}$ $pi/B$ instead.

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How do you find the amplitude and period of $y = cos 4 x$ $y = cos 4x$ ?

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Explanation:

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How do you find the amplitude and period of $y = cos 4 x$ $y = cos 4x$ ?