A traveling wave on a taut string with a tension force T is given by the wave function: y(x,t) = 0.1sin(4x+100t), where x and y are in meters and t is in seconds. The linear mass density of the string is p = 0.1 Kg/m. If the tension is reduced by a factor of two, while keeping the same amplitude, same frequency, and doubling the linear mass density, then the new power of the wave, is %3D
A traveling wave on a taut string with a tension force T is given by the wave function: y(x,t) = 0.1sin(4x+100t), where x and y are in meters and t is in seconds. The linear mass density of the string is p = 0.1 Kg/m. If the tension is reduced by a factor of two, while keeping the same amplitude, same frequency, and doubling the linear mass density, then the new power of the wave, is %3D
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A traveling wave on a taut string with a tension force T is given by the wave
function: y(x,t) = 0.1sin(4x+100t), where x and y are in meters and t is in seconds.
The linear mass density of the string is u = 0.1 Kg/m. If the tension is reduced by a
factor of two, while keeping the same amplitude, same frequency, and doubling
%3D
the linear mass density, then the new power of the wave, is
500 W
1000 W
2000 W
O 250 W
O 125 W
OO TECNO
O) TAIVOS CAMON
A traveling wave on a taut string with
tongi
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