A standing wave on a stretched string fixed at both ends is described by: y(x,t) = %3D 0.1 sin(2Ttx) cos(100Tt). The string has a length L = 1 m. For t > 0, an element on the string located at x = 0.75 cm would have its maximum speed for the first time at: t = 0.02 sec t = 0.025 sec t = 0.01 sec t = 0.005 sec O t= 0.015 sec

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O y1 = 0.01 sin(10Ttx-80nt) ; y2 = 0.01 sin(10Tx+80rt),
A standing wave on a stretched string fixed at both ends is described by: y(x,t) =
0.1 sin(2Ttx) cos(100Ttt). The string has a length L = 1 m. For t > 0, an element on
the string located at x = 0.75 cm would have its maximum speed for the first time
at:
t = 0.02 sec
t = 0.025 sec
t = 0.01 sec
t = 0.005 sec
O t= 0.015 sec
A standing wave has the following wave-function: y(x,t) = 0.2 sin(Ttx) cos(12tt),
where x and y are in meters, and t is in seconds. If the length of the string is L = 2
m and it is fixed at both ends, then the harmonic, n, in which the string is
vibrating is:
n = 3
n = 6
Transcribed Image Text:O y1 = 0.01 sin(10Ttx-80nt) ; y2 = 0.01 sin(10Tx+80rt), A standing wave on a stretched string fixed at both ends is described by: y(x,t) = 0.1 sin(2Ttx) cos(100Ttt). The string has a length L = 1 m. For t > 0, an element on the string located at x = 0.75 cm would have its maximum speed for the first time at: t = 0.02 sec t = 0.025 sec t = 0.01 sec t = 0.005 sec O t= 0.015 sec A standing wave has the following wave-function: y(x,t) = 0.2 sin(Ttx) cos(12tt), where x and y are in meters, and t is in seconds. If the length of the string is L = 2 m and it is fixed at both ends, then the harmonic, n, in which the string is vibrating is: n = 3 n = 6
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