A linear mass density of a string is 1.9 × 10−4kg/m A transverse wave on a string is described by the following equation. y(x, t) = (0.16 mm)sin[(1.047 rad/m)x + (150 rad/s)t] (a) Calculate the tension on the string. (b) Calculate the wavelength. (c) Calculate the frequency.
A linear mass density of a string is 1.9 × 10−4kg/m A transverse wave on a string is described by the following equation. y(x, t) = (0.16 mm)sin[(1.047 rad/m)x + (150 rad/s)t] (a) Calculate the tension on the string. (b) Calculate the wavelength. (c) Calculate the frequency.
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A linear mass density of a string is 1.9 × 10−4kg/m A transverse wave on a string
is described by the following equation.
y(x, t) = (0.16 mm)sin[(1.047 rad/m)x + (150 rad/s)t]
(a) Calculate the tension on the string.
(b) Calculate the wavelength.
(c) Calculate the frequency.
(d) Calculate the maximum acceleration of a point on a string.
(e) Calculate the displacement at time t = 12 ms and position x = 0.
(f) Sketch the wave at t = 0, y(x, 0).
(g) Write down the wave equation and sketch the wave for x = 0 and time t =
12 m
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