How do you find the period of #g(x)= (1/2cos2π/3)x#?

1 Answer
Daniel L.
Sep 8, 2015

The period of the (corrected) function is #3#

Explanation:

Your original function is not trigonometric at all, so it does not have a period (it is just #x# multiplied by an irrational constant #1/2cos((2pi)/3)#).

But I think you meant #y=1/2cos((2pi)/3x)#.

To calculate the period of such a function you divide the period if #cos# function by the coefficient of #x#, so the period is:

#T=(2pi)/((2pi)/3)=(2pi)*(3/(2pi))=3#

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