show that the body executing simple harmonic motion the acceleration leads velocity by90and displacementby 180
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Displacement in SHM is given by x = A sin( wt) where A is amplitude, w is angular velocity, t is instantaneous time.
Velocity is rate of change of displacement with time. Differentiating displacement with respect to time, we have,
V = Aw cos(wt)
Phase difference between sin and cos function is 90 degrees or pi/2 radians . Hence phase difference between displacement and velocity is 90 degrees or pi/2 radians.
Similarly, acceleration can be obtained by differentiating equation of velocity.
Acceleration a = - Aw^2 sin (wt)
Hence phase difference between velocity and acceleration is also pi/2.
Phase difference between displacement and acceleration is pi radians or 180 degrees.
Hope this will clear concept
Velocity is rate of change of displacement with time. Differentiating displacement with respect to time, we have,
V = Aw cos(wt)
Phase difference between sin and cos function is 90 degrees or pi/2 radians . Hence phase difference between displacement and velocity is 90 degrees or pi/2 radians.
Similarly, acceleration can be obtained by differentiating equation of velocity.
Acceleration a = - Aw^2 sin (wt)
Hence phase difference between velocity and acceleration is also pi/2.
Phase difference between displacement and acceleration is pi radians or 180 degrees.
Hope this will clear concept
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