A sinusoidal wave traveling in the positive X direction has an amplitude of 10.0 cm, a wavelength of 25.0 cm, and a frequency of 5.00 Hz.
c) wave function of time
A sinusoidal wave traveling in the positive X direction has an amplitude of 10.0 cm, a...
A sinusoidal wave traveling in the positive X direction has an amplitude of 0.10 m cm, a wavelength of 0.25 m, and a frequency of 50 Hz. Find the followings: For each question you Must show the symbol, formula, calculations, result, and unit Period. Angular frequency. wave number. Speed of the wave (phase velocity) Maximum speed of vibration (transverse speed) of the source of the wave Maximum acceleration of the vibration (transverse acceleration) The equation for the moving wave.
The sinusoidal wave shown in the figure below is traveling in the positive x-direction and has a frequency of 20.6 Hz. (a) Find the amplitude. cm? (b) Find the wavelength. cm? (c) Find the period. s? (d) Find the speed of the wave. m/s?
A progressive sine wave in the positive direction of x has an amplitude of 25.0 cm, a wavelength of 50.0 cm and a frequency of 8.00 Hz. Determine (a) the speed of the wave on the string and (b) the angular number of the wave.
3) A sinusoidal wave traveling in the +x direction has a wavelength of 20 cm, a period of 10 s. has an amplitude of 3 cm and has no displacement from equilibrium at x and t-0. a) Write an equation describing this wave. b) What is the speed of the wave? c) What is the transverse speed of the wave at x = 0 when t-5s?
This figure shows a sinusoidal wave that is traveling from left to right, in the +x-direction. Assume that it is described by a frequency of 61.0 cycles per second, or hertz (Hz). 4.91 cm3.10 cm A sinusoidal wave lies on an unlabeled coordinate system. One of the wave's maxima lies on the vertical axis. The horizontal distance from the first maximum to the first minimum is labeled 3.10 cm and the vertical distance between a maximum and a minimum is...
A harmonic wave moving in the positive x direction has an amplitude of 3.7 cm, a speed of 42.0 cm/s, and a wavelength of 42.0 cm. Assume that the displacement is zero at x = 0 and t = 0. Calculate the displacement due to the wave at x = 10.0 cm, t = 20.0 s.
The amplitude of a wave traveling on a string is 0.250 m. The 8.50-Hz wave is traveling in the positive x-direction at a wave speed of 17.0 m/s. Assume this wave is as a sinusoidal wave. If the correct time-dependent wave function for the wave is 0.250sin(3.14(x−ct)+ϕi), then determine the parameter c for the expression.
A harmonic wave moving in the positive x direction has an amplitude of 4.1 cm, a speed of 45.0 cm/s, and a wavelength of 26.0 cm. Assume that the displacement is zero at x = 0 and t = 0. Calculate the displacement (in cm) due to the wave at x = 0.0 cm, t = 2.0 s. Calculate the displacement due to the wave at x = 10.0 cm, t = 20.0 s.
A harmonic wave moving in the positive x direction has an amplitude of 4.7 cm, a speed of 44.0 cm/s, and a wavelength of 21.0 cm. Assume that the displacement is zero at x = 0 and t = 0. Calculate the displacement (in cm) due to the wave at x = 0.0 cm, t = 2.0 s. Calculate the displacement due to the wave at x = 10.0 cm, t = 20.0 s
The displacement of a wave traveling in the positive x-direction is y(x, t) = (3.5 cm)cos(2.7x - 122t), where x is in m and t is in s. (a) What is the frequency of this wave? Hz (b) What is the wavelength of this wave? m (c) What is the speed of this wave? m/s