A traveling wave on a taut string with a tension force T is given by the wavefunction: y(x,t) = 0.1sin(4x+100t), where x and y are in meters and t is in seconds.%3DThe linear mass density of the string is u = 0.1 Kg/m. If the tension is reduced by afactor of two, while keeping the same amplitude, same frequency, and doublingthe linear mass density, then the new power of the wave, isO 250 W1000 WO 500 WO 2000 WO 125 WA block-spring system has a maximum restoring force Fmax = 0.1 N. If the

given is : Equation is :yx,t = 0.1 sin 4x+100tin general eqn yx,t =A sin Kx+ωtA =0.1 K =4ω =100 μ =…

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), wherex and y are in meters and t is in seconds. %3D The linear mass density of the string is µ= 0.1 Kg/m. If the tension is reduced by a %3D factor of two, while keeping the same amplitude, same frequency, and doubling the linear mnass density, then the new power of the wave, is O 250 W O 1000 W O 500 W O 2000 W O 125 W

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), wherex and y are in meters and t is in seconds. %3D The linear mass density of the string is µ= 0.1 Kg/m. If the tension is reduced by a %3D factor of two, while keeping the same amplitude, same frequency, and doubling the linear mnass density, then the new power of the wave, is O 250 W O 1000 W O 500 W O 2000 W O 125 W