Parent+Graphs+of+Trig+Functions PDF

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Summary

Precalc...

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Parent Graphs of Trig Functions Recall the terminal points of special angles on the unit circle:

Graphing Trig Functions, y = f(x), Input (x) = ____________ Terminology 

Sinusoidal:



Periodic Function:



Period of a Function:



Frequency:



Midline:



Amplitude:



Even/Odd Functions:

Output (y) = ____________

1. y  sin x Plot points,

 x ,sin x  on the axes below where x in an angle in radians and sketch the curve of y  sin x .

Domain: ___________________

Range: ___________________

Period: ___________________

Frequency: ___________________

Amplitude: ____________

Midline: _____________

Odd/Even: ___________

Anchor Points in the Fundamental Period  0, 2  :

2. y  csc x

Domain: ___________________

Range: ___________________

Period: ___________________

Frequency: ___________________

Odd/Even: ___________ Anchor Points/Features in the Fundamental Period 0, 2  :

3. y  cos x

Domain: ___________________

Range: ___________________

Period: ___________________

Frequency: ___________________

Amplitude: ____________

Midline: _____________

Odd/Even: ___________

Anchor Points in the Fundamental Period  0, 2  :

4. y  sec x

Domain: ___________________

Range: ___________________

Period: ___________________

Frequency: ___________________

Odd/Even: ___________ Anchor Points/Features in the Fundamental Period 0, 2  :

5. y  tan x

Domain: ___________________

Range: ___________________

Period: ___________________

Frequency: ___________________

Odd/Even: ___________    Anchor Points/Features in the Fundamental Period   ,  :  2 2

6. y  cot x

Domain: ___________________

Range: ___________________

Period: ___________________

Frequency: ___________________

Odd/Even: ___________ Anchor Points/Features in the Fundamental Period 0,   :...