If the displacement y of a particle is y =A sin (pt+qx) then dimensional formula of pq is

Given that the displacement of an oscillating particle is given by y=Asin(Bx+Ct+D) . The dimensional formula for (ABCD) is

A book with many printing errors contains four different expressions for the displacement 'y' of a particle executing simple harmonic motion. The wrong formula on dimensional basis (i) y=A sin (2pi t//T) (ii) y=A sin (Vt) (iii) y=A//T sin (t//A) (iv) y=(A)/(sqrt(2))(sin omega t+cos omega t)

In the relation y=acos(omegat-kx) , the dimensional formula for k is

For a wave propagating in the positive x direction the instantaneous displacement of the particle is y=A sin ""(2pi)/T (t-x/v) . What is the significance of the negative sign ? If positive sign is used, what does it represent?

The displacement of a particle is repersented by the equation y=sin^(3)omegat . The motion is

The displacement of a particle is represented by the equation y=sin^(3)omegat . The motion is

The linear displacement (y) of a particle varies with time as y = (a sin omega t + b cos omega t) . State whether the particle is executing SHM or not.

The displacement of a particle is given by y = a + bt + ct^2 - dt^4 . The initial velocity and acceleration are respectively.

The displacement of a particle is given by x = 3 sin ( 5 pi t) + 4 cos ( 5 pi t) . The amplitude of particle is

Check the correctness of the equation y=a"sin"(2pi)/(lamda)(vt-x) using dimensional analysis where y is the displacement of a particle at a distance x from the origin at time t, lamda - wavelength v-wave velocity, a- amplitude.