A pulse travelling on a string is represented by the function
y=a^3/((x-vt)^2+a^2)`
where a=5 mm and v=20 cms^-1. Sketch the shape of the string at t=0, 1 s and 2s. Take x=0 in the middle of the string.

Figure shows two wave opulses at t=0 travelling on a string i opposite directions with the same wave speed 50 cms^-1 . Sketch the shape of the string at t=4ms, 6ms, 8ms and 12 ms. .

Figure shows a wave pulse at t=0. The pulse moves to the right with a speed of 10cms^-1. Sketch the shape of the string at t=1s, 2s and 3s.

You have learnt that a travelling wave in one dimension is represented by a function y= f(x, t) where x and t must appear in the combination x-v t or x + v t , i.e., y= f (x +- v t) . Is the converse true? Examine if the following functions for y can possibly represent a travelling wave: (a) (x-vt)^(2) (b) log [(x + vt)//x_(0)] (c ) 1//(x + vt)

A wave is propagating on a long stretched string along its length taken as the positive x-axis. The wave equation is given as y=y_0e^(-(t/T-x/lamda)^(2)) where y_0=4mm, T=1.0s and lamda=4cm .(a) find the velocity of wave. (b) find the function f(t) giving the displacement of particle at x=0. (c) find the function g(x) giving the shape of the string at t=0.(d) plot the shape g(x) of the string at t=0 (e) Plot of the shape of the string at t=5s.

A wave pulse is travelling on a string with a speed v towards the positive x-axis. The shape of the string at t = 0 is given by y(x) = A sin(x//a) , where A and a are constants. (a) What are the dimensions of A and a ? (b) Write the equation of the wave for a general time t , if the wave speed is v .

A wave pulse is travelling on a string with a speed v towards the positive x-axis. The shape of the string at t = 0 is given by y(x) = A sin(x//a) , where A and a are constants. (a) What are the dimensions of A and a ? (b) Write the equation of the wave for a general time t , if the wave speed is v .

A string of linear mass density 0.5 g cm^-1 and a total length 30 cm is tied to a fixed wall at one end and to a frictionless ring at the other end. The ring can move on a vertical rod. A wave pulse is produced on the string which moves towards the ring at a speed of 20 cm s^-1 . The pulse is symmetric about its maximum which is located at a distance of 20 cm from the end joined to the ring. (a) Assuming that the wave is reflected from the ends without loss of energy, find the time taken by the string to regain its shape. (b) The shape of the string changes periodically with time. Find this time period. (c) What is the tension in the string ?

Determine the tension T_(1) and T_(2) in the strings

A string of length L fixed at both ends vibrates in its fundamental mode at a frequency v and a maximum amplitude A. (a) Find the wavelength and the wave number k. (b) Take the origin at one end of the string and the X-axis along the string. Take the Y-axis along the direction of the displacement. Take t = 0 at the instant when the middle point of the string passes through its mean position and is going towards the positive y-direction. Write the equation describing the standing wave.