A string is clamped at both the ends and it is vibrating in its `4^(th)` harmonic. The equation of the stationary wave is `Y=0.3 sin(0.157x) cos(200pi t)`. The length of the string is : (All quantities are in SI units.)

A string fixed at both ends, oscillate in 4th harmonic. The displacement of particular wave is given as Y=2Asin(5piX)cos(100pit) . Then find the length of the string?

The equation for the vibration of a string fixed at both ends vibrating in its second harmonic is given by y=2sin(0.3cm^(-1))xcos((500pis^(-1))t)cm . The length of the string is :

A string fixed at both the ends of length 2m. Vibrating in its 7th overtone. Equation of the standing wave is given by y=Asinkxcos(omegat+(pi)/(3)) . All the symbols have their usual meaning. Mass per unit length of the string is 0.5(gm)/(cm) . Given that A=1 cm and omega=100pi(rad)/(sec) Answer the following 2 questions based on information given (use mu^(2)=10) Q. Starting from t=0 , energy of vibration is completely potential at time t , where t is

A string is rigidly tied at two ends and its equation of vibration is given by y=cos 2pix. Then minimum length of string is

Following is given the eqution of a stationary wave (all in SI units) y = (0.06)sin (2pix)cos(5pit) Match of following.

The equational of a stationary wave in a string is y=(4mm) sin [(314m^(-1)x] cos omegat . Select the correct alternative (s).

A string is rigidly tied at two ends and its equation of vibration is given by y = cos2 pi tsin2 pi x . Then minimum length of string is

A thin taut string tied at both ends and oscillating in its third harmonic has its shape described by the equation y(x,t) = (5.60 cm) sin [(0.0340 "rad"/cm)x] sin [(50.0 "rad"/s)t] , where the origin is at the left end of the string, the x-axis is along the string and the y-axis is perpendicular to the string. (a) Draw a sketch that shows the standing wave pattern. (b)Find the amplitude of the two travelling waves that make up this standing wave. (c) What is the length of the string? (d) Find the wavelength, frequency, period and speed of the travelling wave. (e) Find the maximum transverse speed of a point on the string. (f) What would be the equation y(x,t) for this string if it were vibrating in its eighth harmonic?

The equation of a stationary wave is y= 4 sin ((pix)/(5)) cos (100pi t) . The wave is formed using a string of length 20cm. The second and 3rd antipodes are located at positions (in cm)

A uniform string is clamped at x=0 and x = L and is vibrating in its fundamental mode. Mass per unit length of the string is mu , tension in it is T and the maximum displacement of its midpoint is A. Find the total energy stored in the string. Assume to be small so that changes in tension and length of the string can be ignored