What is the period of #f(t)=sin( ( 3t)/4 )#?

1 Answer
May 26, 2018

The period is #=8/3pi#

Explanation:

We need

#sin(a+b)=sinacosb+sinbcosa#

The period of a periodic function is #T# iif

#f(t)=f(t+T)#

Here,

#f(t)=sin(3/4t)#

Therefore,

#f(t+T)=sin(3/4(t+T))#

where the period is #=T#

So,

#sin(3/4t)=sin(3/4(t+T))#

#sin(3/4t)=sin(3/4t+3/4T)#

#sin(3/4t)=sin(3/4t)cos(3/4T)+cos(3/4t)sin(3/4T)#

Then,

#{(cos(3/4T)=1),(sin(3/4T)=0):}#

#<=>#, #3/4T=2pi#

#<=>#, #T=8/3pi#