How would you find the period of this equation #y = 5 sin 2x#? Trigonometry Graphing Trigonometric Functions Translating Sine and Cosine Functions 1 Answer Daniel L. Mar 25, 2018 See explanation. Explanation: The period of a function #f(x)=sin(ax)# is #a# times smaller than the period of #sinx#, so here the period is: #T=(2pi)/2=pi# Answer link Related questions How do you graph sine and cosine functions when it is translated? How do you graph #y=sin ( x -frac{\pi}{2} )#? How do you draw a sketch of #y = 1 + cos (x - pi)# How do you shift and graph #y=-3+sinx#? How do you graph #y=3sin(1/3x+ pi/2)-2#? How do you graph #1/2sin(x-pi)#? How do you graph #-sinx+2#? How do you graph #y=3sin(1/2)x#? How do you graph #y=-2cos((pix)/3)#? How do you graph #y = (1/2)sin(x - pi)#? See all questions in Translating Sine and Cosine Functions Impact of this question 1705 views around the world You can reuse this answer Creative Commons License