Answer:
(a) T = 0.412s
(b) f = 2.42Hz
(c) w = 15.25 rad/s
(d) k = 86.75N/m
(e) vmax = 5.03 m/s
Explanation:
Given information:
m: mass of the block = 0.373kg
A: amplitude of oscillation = 22cm = 0.22m
T: period of oscillation = 0.412s
(a) The period is the time of one complete oscillation = 0.412s
The period is 0.412s
(b) The frequency is calculated by using the following formula:
[tex]f=\frac{1}{T}=\frac{1}{0.412s}=2.42Hz[/tex]
The frequency is 2.42 Hz
(c) The angular frequency is:
[tex]\omega=2\pi f=2\pi (2.42Hz)=15.25\frac{rad}{s}[/tex]
The angular frequency is 15.25 rad/s
(d) The spring constant is calculated by solving the following equation for k:
[tex]\omega=\sqrt{\frac{k}{m}}\\\\k=m\omega^2=(0.373kg)(15.25rad/s)^2=86.75\frac{N}{m}[/tex]
The spring constant is 86.75N/m
(e) The maximum speed is:
[tex]v_{max}=\omega A=(15.25rad/s)(0.33m)=5.03\frac{m}{s}[/tex]
(f) The maximum force applied by the spring if for the maximum elongation, that is, the amplitude:
[tex]F=kA=(86.75N/m)(0.2m)=17.35N[/tex]
The maximum force that the spring exerts on the block is 17.35N
