How do you find the amplitude and period of #f(x) = - 8 sin(5*x + pi) #?

1 Answer
Jul 25, 2015

Amplitude = # 8 #
Period = # (2pi)/5 #

Explanation:

# f(x) = -8 sin( 5x + pi ) #
# => f(x) = 8 (-sin( 5x + pi ) ) #
# => f(x) = 8 sin( 5x + cancel(pi) - cancel(pi) ) # (Since # -sin(x) = sin( x - pi ) #
# => f(x) = 8 sin( 5x ) #

Since # | sin(x) | <= 1 forall x #, the amplitude of # f(x) # is 8.

Now, for the period, notice the following:
# f( x + (2pi)/5) = 8 sin( 5 ( x + (2pi)/5 ) ) = 8 sin( 5x + 2pi ) ) = 8 sin( 5x ) = f(x) #

Thus the period of # f(x) # is # (2pi)/5 #.

Note: In general, for any sinusoidal function of the form # sin(nu x) # or # cos(nu x) #, the period is # (2pi)/nu #. Here #nu# is the frequency multiplication factor. In this particular case, # nu = 5 #.