Respuesta :
Answer:
The correct answer is b, x = 9 cos (pi / 2 t)
Explanation:
The equation that describes a simple pendulum is
θ = θ₀ cos (wt + φ)
The angle is measured is radians
θ = x / L
We replace
d / L = x₀ / L cos (wt + φ)
x₀ = 9 in
We replace
d = 9 cos (wt + φ)
Angular velocity is related to frequency and period.
w = 2π f = 2π / T
The period is the time of a complete oscillation T = 4 s
w =2π / 4
w = π / 2
Let's replace
x = 9 cos (π/2 t + φ)
As the system is released from the root x = x₀ for t = 0 s
x₀ = x₀ cos φ
Cos φ = 1
φ = 0°
The final equation is
x = 9 cos (pi / 2 t)
The correct answer is b
Answer:
b) d=9cos(pi/2 t)
Explanation:
This is a cosine function in the such as: y = a cos bt...
a = (maximum distance - minimum distance)/2:
a = (max - min)/2
maximum distance = 18 inches minimum distance = 0
a = (18 - 0)/2 = 18/2 = 9
That is a = 9
To solve for b, similar to the period:
The period in radians:
P = 2pi/b, which is the amount of time it takes to revolve one full cycle...
multiply that time by time from minimum to maximum, 2 to give the period as 2 × 2 = 4.
Thus to find b..
4 = 2pi/b
4b = 2pi/b × b
4b = 2pi
or
b = pi/2
Also
a = 9
b = pi/2
So our cosine function is:
d = 9cos((pi/2)t)
Hence the equation that models d
