Answer:
[tex]y = 6'9" + 7"cos(\frac{\pi}{2} t)[/tex]
Explanation:
As we know that the distance between maximum and minimum distance of the position will be equal to double of the amplitude.
So here we can say that
[tex]2 \times Amplitude = maximum\: distance - minimum \:distance[/tex]
[tex]2A = 7'4" - 6'2"[/tex]
[tex]2A = 1'2"[/tex]
[tex]A = 7 inch[/tex]
Since it took 2 second to reach the position of maximum length from its position of minimum length so here time period of motion will be
[tex]T = 4 seconds[/tex]
so here angular frequency is given as
[tex]\omega = \frac{2\pi}{T}[/tex]
[tex]\omega = \frac{2\pi}{4}[/tex]
now the equation of motion will be
[tex]y = 6'9" + 7"cos(\frac{\pi}{2} t)[/tex]
here its mean position from ground is at 6 ft 9 inch above and it will oscillate about it with an amplitude of 7 inch with time period of 4 s
