Answer:
a) x = 8.8 cm * cos (9.52 rad/s * t)
b) x = 8.45 cm
Explanation:
This is a Simple Harmonic Motion, and most Simple Harmonic Motion equations start from the equilibrium point. In this question however, we are starting from the max displacement the equations, and thus, it ought to be different.
From the question, we are given that
A = 8.8 cm = 0.088 m
t = 0.66 s
Now, we need to find the angular speed w, such that
w = 2π/T
w = (2 * 3.142) / 0.66
w = 6.284 / 0.66
w = 9.52 rad/s
The displacement equation of Simple Harmonic Motion is usually given as
x = A*sin(w*t)
But then, the equation starts from the equilibrium point at 0 sec, i.e x = 0 m
When you have to start from the max displacement, then the equation would be
x = A*cos(w*t).
So when t = 0 the cos(0) = 1, and then x = A which is max displacement.
Thus, the equation is
x = 8.8 cm * cos (9.52 rad/s * t)
At t = 1.7 s,
x = 8.8 cos (9.52 * 1.7)
x = 8.8 cos (16.184)
x = -8.45 cm
Answer:
(a) [tex]$y(t) = 8.8cos(\frac{2\pi }{0.665} t)$[/tex]
(b) and after 1.7s the displacement would be
[tex]$y(1.7s) = 8.8cos(\frac{2\pi }{0.665s}1.7s)$ = 8.456461cm[/tex]
Explanation:
This is periodic motion and the best equation to model this type of motion is sinusoidal equation.
We will chose cos function because it starts at the max or the amplitude.
A = 8.8cm, T = 0.66s in following general form gives the answer.
[tex]$y(t)=Acos(\frac{2\pi }{T} t)[/tex]
and substituting t = 1.7s in it gives us 8.456461cm, just little bit lower than initial position.
