The wave-function for a certain standing wave on a string fixed at both ends is `y(x,t) = 0.5 sin (0.025pix) cos500t` where `x` and `y` are in centimeters and `t` is seconds. The shortest possible length of the string is :

The equation of a stationary wave on a string clamped at both ends and vibrating in its third harmonic is given by y=0.5 sin (0.314"x") cos (600pit) where x and y are in cm and t is in sec. What is the length of the string?

The equation of a standing wave produced on a string fixed at both ends is y=0.4 "sin"(pix)/(10) cos 600 pi t where y' is measured in om 10 What could be the smallest length of string?

The equation of a standing wave produced on a string fixed at both ends is y=0.4 "sin"(pix)/(10) cos 600 pi t where y' is measured in om 10 What could be the smallest length of string?

The transverse displacement of a string fixed at both ends is given by y=0.06sin((2pix)/(3))cos(100pit) where x and y are in metres and t is in seconds. The length of the string is 1.5 m and its mass is 3.0xx10^(-2)kg . What is the tension in the string?

The displacement of a string fixed at both the ends is given by y= 0.8 sin ((pi x)/(3)) cos (60 pi t) where y and x in metres and t is in second. What is the wavelength and frequency of the two interfering waves ?

The displacement of a standing wave on a string is given by y (x,t) = 0.4 sin (0.5x) cos (30t) where x and y are in centimetres. (a) Find the frequency, amplitude and wave speed of the component waves. (b) What is the particle velocity at x=2.4 cm at t=0.8 s ?