Respuesta :
Answer:
y(t) = a sin(ωt).
Step-by-step explanation:
The graph of the motion starts at y-0 t = 0 so we use sine in the equation
y(t) = A sin (2π t / T) where A = the amplitude and T = the period so here we can write:
Displacement at t = y(t) = a sin(2π/ 2π/ω)t
y(t) = a sin(ωt)
This is about graph of simple harmonic motion.
y(t) = a sin (ωt)
- We are told the condition of the simple harmonic motion we want to model is at y = 0 and t = 0.
- This condition means the motion starts at the origin. Therefore, we will make use of the solution;
y(t) = A sin ωt
Where;
A is amplitude
ω is angular frequency
y(t) is the displacement at time(t)
- Now, we know that;
ω can also be expressed as;
ω = 2π/T
Where T is period.
Thus;
y(t) = A sin (2π/T)t
- We are given that;
Period; T = 2π/ω
Thus
y(t) = A sin (2π/(2π/ω))t
2π will cancel out to give;
y(t) = A sin (ωt)
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