Home
Class 11
PHYSICS
The wave function for a travelling wave ...

The wave function for a travelling wave on a taut string is
`y(x,t)=(0.350 m)sin(10pit-3pix+pi//4)`. (SI units)
(a) what is the speed and direction of travel of the wave ?
(b) what if the verticaly position of an element of the string at `t=0, x=0.100 m?`
(c ) what is the wavelength and frequency of the wave?
(d) waht is the maximum transverse speed of an element of the string?

Promotional Banner

Similar Questions

Explore conceptually related problems

The wave funcation for a travelling wave on a string in given as y (x, t) = (0.350 m) sin (10 pi t - 3pix + (pi)/(4)) (a) What are the speed and direction of travel of the wave ? (b) What is the vertical displacement of the string at t = 0, x = 0.1 m ?

The wave funcation for a travelling wave on a string in given as y (x, t) = (0.350 m) sin (10 pi t - 3pix + (pi)/(4)) (a) What are the speed and direction of travel of the wave ? (b) What is the vertical displacement of the string at t = 0, x = 0.1 m ? (c) What are wavelength and frequency of the wave ?

The equation of a wave travelling on a string is y=(0.10mm)sin[3.14m^-1)x+(314s^-1)t] . (a) In which direction does the wave travel ? (b) Find the wave speed, the wavelength and the frequency of the wave. (c) What is the maximum displacement and the maximum speed of a portion of the string ?

The equation of a wave travelling on a string is y=(0.10mm)sin[3.14m^-1)x+(314s^-1)t] . (a) In which direction does the wave travel ? (b) Find the wave speed, the wavelength and the frequency of the wave. (c) What is the maximum displacement and the maximum speed of a portion of the string ?

The equation of a wave travelling on a string is y=(0.10mm)sin[3.14m^-1)x+(314s^-1)t] . (a) In which direction does the wave travel ? (b) Find the wave speed, the wavelength and the frequency of the wave. (c) What is the maximum displacement and the maximum speed of a portion of the string ?

A transverse wave travelling on a taut string is represented by: Y=0.01 sin 2 pi(10t-x) Y and x are in meters and t in seconds. Then,

A transverse wave travelling on a taut string is represented by: Y=0.01 sin 2 pi(10t-x) Y and x are in meters and t in seconds. Then,

The equation of a progressive wave travelling on a strected string is y = 10 sin 2pi ((t)/(0.02) - (x)/(100)) where x and y are in cm and t is in sec. What is the speed of the wave?

The equation of a progressive wave traveling on a stretched string is y = 10sin 2pi ((t/0.02)-(x/100)) where x and y arein cm and t is in sec. What is the speed of the waves?