How do you use transformation to graph the cosine function and determine the amplitude and period of $y = - 4 cos (- 3 x)$ $y=-4cos(-3x)$ ?

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How do you use transformation to graph the cosine function and determine the amplitude and period of $y = - 4 cos (- 3 x)$ $y=-4cos(-3x)$ ?

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Answer 1 · 2017-05-29T11:32:41

As cosine is an even function we have that $cos (- x) = cos x$ $cos(-x) = cosx$

so, $cos (- 3 x) = cos (3 x)$ $cos(-3x) = cos(3x)$

Hence, $y = - 4 cos (- 3 x) = - 4 cos (3 x)$ $y = -4cos(-3x) = -4cos(3x)$

If we start with the graph of $y = cos x$ $y = cosx$ , we need to apply a horizontal squash factor of $\frac{1}{3}$ $1/3$ to get $y = cos (3 x)$ $y = cos(3x)$

i.e. the period changes from 360 degrees to 120 degrees

From $y = cos (3 x) \to y = - 4 cos (3 x)$ $y = cos(3x) to y = -4cos(3x)$ we apply a stretch factor of 4 parallel to the y-axis and reflect about the x-axis due to the -4

The amplitude is 4.

See the graph below: desmos graphing

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How do you use transformation to graph the cosine function and determine the amplitude and period of $y = - 4 cos (- 3 x)$ $y=-4cos(-3x)$ ?

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How do you use transformation to graph the cosine function and determine the amplitude and period of y=-4cos(-3x)y=−4cos(−3x)y=-4cos(-3x)?

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How do you use transformation to graph the cosine function and determine the amplitude and period of $y = - 4 cos (- 3 x)$ $y=-4cos(-3x)$ ?