The equation of motion for an oscillating particle is given by x = 3sin `(4pit) + 4 cos(4pit)`, where x is in mm and t is in second

The equation of motion for an oscillating particle is given by x = 3 sin 4pi t + 4 cos pi t where x is in mm and t is in second. The particle

The equations of simpel harmonic motin is given by y=3sin5pit+4cos5pit , where y is in cm and t in second. Determing the amplitude, period and initial phase.

Find the incorrect from the following the equation of a stationary wave is given by y=6cos((pix)/(5))sin(4pit) , where y and x are in cm and t is in second. Then, for the stationary wave

The equation of motion of particle is given by, x=4 sin6pit+ 5 cos6pit Find the amplitude, initial phase and period(In CGS system).

The displacement of a particle executing simple harmonic motion is given by x=3sin(2pit+(pi)/(4)) where x is in metres and t is in seconds. The amplitude and maximum speed of the particle is

The displacement of a particle executing simple harmonic motion is given by x=3sin(2pit+(pi)/(4)) where x is in metres and t is in seconds. The amplitude and maximum speed of the particle is