The angular frequency of motion whose equation is
`4(d^(2)y)/(dt^(2))+9y=0` is `(y="displacement and " t="time")`

Separate equations of lines, whose combined equation is 4x^(2)-y^(2)+2x+y=0 are

The motion of a particle is described by 9(d^(2)x)/(dt^(2))+25x=80 where x is displacement and t is time. Angular frequency of small oscillations of the particle

Find the roots of the equation 2y ^(2) - 9y + 9 = 0.

For a particle performing SHM , equation of motion is given as (d^(2))/(dt^(2)) + 4x = 0 . Find the time period

The equation of motion of particle is given by (dp)/(dt) +m omega^(2) y =0 where P is momentum and y is its position. Then the particle

If y is displacement and t is time, unit of (d^(2)y)/(dt^(2)) will be

Verify that y=4sin3x is a solution of the differential equation (d^(2)y)/(dx^(2))+9y=0

If y=sin(t^2) , then (d^2y)/(dt^2) will be