A clamped string is oscillating in `n^(th)` harmonic, then :-

A string fixed at both ends, oscillate in 4th harmonic. The displacement of particular wave is given as Y=2Asin(5piX)cos(100pit) . Then find the length of the string?

A string fixed at both ends, oscillate in 4th harmonic. The displacement of particular wave is given as Y=2Asin(5piX)cos(100pit) . Then find the length of the string?

A string is clamped at both the ends and it is vibrating in its 4^(th) harmonic. The equation of the stationary wave is Y=0.3 sin(0.157x) cos(200pi t) . The length of the string is : (All quantities are in SI units.)

A string is clamped at both the ends and it is vibrating in its 4^(th) harmonic. The equation of the stationary wave is Y=0.3 sin ( 0.157 x) cos (200 pi t) . The length of the string is: (All quantities are in SI units.)

Which of the following is incorrect for a vibrating string, in n^(th) harmonic mode of vibration

Simple harmonic oscillations are

A string of length 1 is stretched along the x -axis and is rigidly clamped at x=0 and x=1 . Transverse vibrations are produced in the string. For n^(th) harmonic which of the following relations may represents the shape of the string at any time (a) y=2Acosomegatcos((npix)/(l)) (b) y=2Asinomegatcos((npix)/(l)) (c ) y=2Acosomegatsin((npix)/(l)) (d) y=2Asinomegatsin((npix)/(l))

(A) : For an oscillating simple pendulum, the tension in the string is maximum at the means positions and minimum at the extreme position. (R) : The velocity of oscillating bob in simple harmonic motion is maximum at the mean position.