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identify the amplitude and period of the function then graph the function and describe the graph of G as a transformation of the graph of its parent function

identify the amplitude and period of the function then graph the function and describe-example-1
User David Hobs
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1 Answer

10 votes
10 votes

Given the function:


g(x)=cos4x

Let's find the amplitude and period of the function.

Apply the general cosine function:


f(x)=Acos(bx+c)+d

Where A is the amplitude.

Comparing both functions, we have:

A = 1

b = 4

Hence, we have:

Amplitude, A = 1

To find the period, we have:


(2\pi)/(b)=(2\pi)/(4)=(\pi)/(2)

Therefore, the period is = π/2

The graph of the function is shown below:

The parent function of the given function is:


f(x)=cosx

Let's describe the transformation..

Apply the transformation rules for function.

We have:

The transformation that occured from f(x) = cosx to g(x) = cos4x using the rules of transformation can be said to be a horizontal compression.

ANSWER:

Amplitude = 1

Period = π/2

Transformation = horizontal compression.

identify the amplitude and period of the function then graph the function and describe-example-1
User Vicatcu
by
3.2k points