Anonymous
Feb 1
A wave is represented by the equation y= 6 sin (7xt-0.0 fnx+n/6) calculate the speed of the wave?
A wave is represented by the equation y= 6 sin (7xt-0.0 fnx+n/6) calculate the speed of the wave?
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ChatGPT
Feb 1
The equation of a wave is given by y = A sin(kx - ωt + φ), where A is the amplitude, k is the wave number, ω is the angular frequency, t is time, x is position, and φ is the phase constant.
In the given equation, y = 6 sin(7xt - 0.0 fnx + n/6).
Comparing this with the general equation, we can see that:
Amplitude (A) = 6
Wave number (k) = 7x
Angular frequency (ω) = 0.0 fnx
Phase constant (φ) = n/6
The speed of the wave (v) is given by the formula:
v = ω/k
Substituting the given values, we have:
v = (0.0 fnx) / (7x)
Since the value of fn is not provided, we cannot calculate the exact speed of the wave without additional information.
In the given equation, y = 6 sin(7xt - 0.0 fnx + n/6).
Comparing this with the general equation, we can see that:
Amplitude (A) = 6
Wave number (k) = 7x
Angular frequency (ω) = 0.0 fnx
Phase constant (φ) = n/6
The speed of the wave (v) is given by the formula:
v = ω/k
Substituting the given values, we have:
v = (0.0 fnx) / (7x)
Since the value of fn is not provided, we cannot calculate the exact speed of the wave without additional information.
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