Answer:
The maximum displacement, the frequency, and the time required for one cycle are 1/5 inch, 1/π Hz and π sec.
Explanation:
Given that,
The equation of simple harmonic motion
[tex]d = \dfrac{1}{5}\sin 2t[/tex].....(I)
We need to calculate the maximum amplitude
Using equation of simple harmonic motion
[tex]y = a \sin\omega t[/tex]
Where, a = amplitude
[tex]\omega[/tex] =frequency
t = time
On comparing equation (I) and general equation
The amplitude is a maximum displacement traveled by a wave.
[tex]a = \dfrac{1}{5}[/tex]
So, the maximum displacement is
[tex]d= \dfrac{1}{5}\ inch[/tex]
We need to calculate the frequency
[tex]\omega=2\pi f[/tex]
[tex]f = \dfrac{1}{\pi}\ Hz[/tex]
We need to calculate the time required for one cycle
[tex]t =\dfrac{1}{f}[/tex]
[tex]t =\pi\ sec[/tex]
Hence, The maximum displacement, the frequency, and the time required for one cycle are 1/5 inch, 1/π\ Hz and π\ sec.
