Equation Of Wave On A String

(i) The equation of wave in a string fixed at both end is y = 2 sin pi t cos pi x . Find the phase difference between oscillations of two points located at x = 0.4 m and x = 0.6 m . (ii) A string having length L is under tension with both the ends free to move. Standing wave is set in the string and the shape of the string at time t = 0 is as shown in the figure. Both ends are at extreme. The string is back in the same shape after regular intervals of time equal to T and the maximum displacement of the free ends at any instant is A. Write the equation of the standing wave.

Variation Of Phase With Distance -With Examples |Linear Wave Equation |Speed Of Wave On String

Variation Of Phase With Distance -With Examples |Linear Wave Equation |Speed Of Wave On String

Variation Of Phase With Distance -With Examples |Linear Wave Equation |Speed Of Wave On String

The equation of a wave on a string of linear mass density 0.04 kgm^(-1) is given by y = 0.02(m) sin[2pi((t)/(0.04(s)) -(x)/(0.50(m)))] . Then tension in the string is

The equation of a wave on a string of linear mass density 0.04 kgm^(-1) is given by y = 0.02(m) sin[2pi((t)/(0.04(s)) -(x)/(0.50(m)))] . Then tension in the string is

the equation of a wave on a string of linear mass density 0.04 kgm^(-1) is given by y = 0.02(m) sin[2pi((t)/(0.04(s)) -(x)/(0.50(m)))] . Then tension in the string is

The equation of a wave travelling on a string is d