If wave y = A cos `(omegat + kx)` is moving along x-axis The shape of pulse at t = 0 and t = 2 s

A wave pulse is travelling on a string at 2 m/s. displacement y of the particle at x = 0 at any time t is given by y=2/(t^2+1) Find (ii) Shape of the pulse at t = 0 and t = 1s.

A wave y = a sin (omegat - kx) on a string meets with another wave producing a node at x = 0 . Then the equation of the unknown wave is

A wave pulse is travelling on a string at 2m//s along positive x-directrion. Displacement y of the particle at x = 0 at any time t is given by y = (2)/(t^(2) + 1) Find Shape of the pulse at t = 0 and t = 1s.

A wave pulse is travelling along +x direction on a string at 2 m//s . Displacement y (in cm ) of the parrticle at x=0 at any time t is given by 2//(t^(2)+1) . Find (i) expression of the function y=(x,t),i.e., displacement of a particle at position x and time t. Draw the shape of the pulse at t=0 and t=1 s.

A wave is travelling along x-axis . The disturbance at x=0 and t=0 is A/2 and is increasing , where A is amplitude of the wave. If Y= sin (kx-omegat+phi) , then the initial phase is alpha pi . Find alpha

Let a disturbance y be propagated as a plane wave along the x-axis. The wave profile at the instants t=t_(1) and t=t_(2) are represent respectively as: y_(1)=f(x_(1)-vt_(1)) and y_(2)=f(x_(2)-vt_(2)). The wave is propagating withoute change of shape.

A wave is travelling along X-axit. The disturbance at x=0 and t=0 is A//2 and is increasing. Where A is amplitute of the wave. If y=A sin(kx-omegat+emptyset) , deetemine the initial phase empyset .

Assertion: Two waves y_1 = A sin (omegat - kx) and y_2 = A cos(omegat-kx) are superimposed, then x=0 becomes a node. Reason: At node net displacement due to waves should be zero.