How to Find Period of Trig Function?

Identify the base trig function: sine, cosine, tangent, cotangent, secant, or cosecant

Use the standard period:

Sine: (2pi)

Cosine: (2pi)

Tangent: (pi)

Cotangent: (pi)

Secant: (2pi)

Cosecant: (2pi)

For (f(x)=asin(bx+c)), (f(x)=acos(bx+c)), (f(x)=asec(bx+c)), or (f(x)=acsc(bx+c)), use period (= frac{2pi}{|b|})

For (f(x)=atan(bx+c)) or (f(x)=acot(bx+c)), use period (= frac{pi}{|b|})

Ignore vertical shifts and amplitude when finding period

If the function is a sum of trig functions, find the period of each term

If the terms have different periods, use the least common multiple when it exists

If the function includes nested trig or transformations, rewrite it into standard form first

For expressions with degrees, use:

Sine, cosine, secant, cosecant: period (= frac{360^circ}{|b|})

Tangent, cotangent: period (= frac{180^circ}{|b|})

Check whether the function repeats after the smallest positive interval

Verify by comparing (f(x)) and (f(x+T)) for the candidate period (T)

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