1) The vertical displacement y(x,t) of a horizontal string aligned along the x-axis is given by...
The vertical displacement y(x,t) of a string stretched along the horizontal x-axis is given by y(x,t) = (6.00 mm) sin[(3.25 rad/m) x - (7.22 rad/s)t]. First, determine the constant speed of this wave. Next, calculate the instantaneous speed of a particle of the string located at x = 1.25 m at the time of 10.00 s. Finally take the constant speed of the wave and divide by the instantaneous speed of the particle that you determined. Watch your units -...
A transverse wave is traveling on a string stretched along the horizontal x-axis. The equation for the vertical displacement y is given by y(x,t) = Asin(kx-wt), where A is the amplitude of the wave is much smaller than the wavelength, an individual particle in the string has constant horizontal displacement x but oscillates in the y-direction. The maximum speed of the particle in the y-direction is... Aw A^2w Aw^2 w/k k/w
For a particular transverse wave that travels along a string that lies on the x-axis, the equation of motion is: y = (0.0600 m) cos (45.0 rad/s)t − (0.400 m−1)x .Calculate the displacement (in other words, the y-value) of a point at x = 1.00 m when t = 2.00 s. .
A sinusoidal transverse wave is traveling along a string in the negative direction of an x axis. The figure below shows a plot of the displacement as a function of position at time t = 0. The x axis is marked in increments of 10 cm and the y axis is marked in increments of 2 cm. The string tension is 3.1 N, and its linear density is 34 g/m. (a) Find the amplitude. m (b) Find the wavelength. m...
3. The vertical displacement of a string is given by the harmonic function: Y(x, t) = 3.5cos(12nt-187x) Where x is the horizontal distance along the string in meters. Suppose a tiny particle were attached to the string at x=5cm. obtain the expression for the vertical velocity of the particle as a function of time.
Wave on a String A string with linear mass density 2.0 g/m is stretched along the positive x-axis under a tension of 20 N. The other end of the string, at x = 0m is tied to a hook that oscillates up and down at a frequency of 100Hz with a maximum displacement from equilibrium of 1.0 mm. At t= 0s, the hook is at it's lowest point. (a) What are the wave speed and the wavelength on the string?...
Wave on a String A string with linear mass density 2.0 g/m is stretched along the positive x-axis under a tension of 20 N. The other end of the string, at x = 0m is tied to a hook that oscillates up and down at a frequency of 100Hz with a maximum displacement from equilibrium of 1.0 mm. At t= 0s, the hook is at it's lowest point. (a) What are the wave speed and the wavelength on the string?...
The equation of a transverse wave traveling along a very long string is given by y = 6.1 sin(0.018πx + 3.1πt), where x and y are expressed in centimeters and t is in seconds. Determine the following values. (a) the amplitude cm (b) the wavelength cm (c) the frequency Hz (d) the speed cm/s (e) the direction of propagation of the wave +x−x +y−y (f) the maximum transverse speed of a particle in the string cm/s (g) the transverse displacement at...
A sinusoidal transverse wave of wavelength 19.0 cm travels along a string in the positive direction of an x axis. The displacement y of the string particle at x = 0 is given in the figure as a function of time t. The scale of the vertical axis is set by ys = 4 cm. The wave equation is to be in the form of y = ym sin(kx - ωt + φ). (a) At t = 0, is a...
show steps please! (1 point) u(x, t represents the vertical displacement of a string of length L = 20 with wave equation 16. time t = Utt at position x along the string and at Find u(x, t) if a. the initial velocity of the string is 0 and the rightmost position is held at a vertical displacement of 1 and released b. the initial velocity is a constant -5 and the vertical displacement is 0 c. the initial velocity...