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6.5 & 6.7 Notes Determining the transformations to trigonometric functions.

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Presentation on theme: "6.5 & 6.7 Notes Determining the transformations to trigonometric functions."— Presentation transcript:

1 6.5 & 6.7 Notes Determining the transformations to trigonometric functions

2 6.5 & 6.7 Notes Find the amplitude, period, phase shift, and vertical shift of the trigonometric function.

3 6.5 & 6.7 Notes The amplitude of a trigonometric function is the absolute value of the coefficient of trigonometric function. amplitude:

4 6.5 & 6.7 Notes The period of a trigonometric function is found by dividing the parent graph’s period by the coefficient of the angle variable, θ.

5 6.5 & 6.7 Notes The phase shift is in the direction indicated by the opposite sign of C in an amount equal to the value of C. It may be necessary to factor to find C.

6 6.5 & 6.7 Notes The vertical shift is in the direction indicated by the sign of D in an amount equal to the value of D.

7 6.5 & 6.7 Notes Find the amplitude, period, phase shift, and vertical shift of the trigonometric function.

8 6.5 & 6.7 Notes Find the amplitude, period, phase shift, and vertical shift of the trigonometric function.

9 6.5 & 6.7 Notes Find the amplitude, period, phase shift, and vertical shift of the trigonometric function.

10 6.5 & 6.7 Notes Find the amplitude, period, phase shift, and vertical shift of the trigonometric function.


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