The displacement of two particles of same mass executing SHM are represented by the equations
`x_(1)=4"sin"(10t+(pi)/(6))` and `x_(2)=5"cos"(omegat)`.
The value of `omega` for which the energies of both the particles remain same is

The displacement of two identical particles executing SHM are represented by equations x_(1) = 4 sin (10t+(pi)/(6)) & x_(2) = 5 cos (omegat) For what value of • , energy of both the particles is same.

The displacement of two identical particles executing SHM are represented by equations. x_(1) = 4sin(10t+pi/6) and x_(2)=5cosepsilont For what value of epsilon energy of both the particles is same?

Two SHM are represented by equations x_1=4sin(omega t+37°) and x_2=5cos(omega t) . The phase difference between them is

What is the phase difference between two simple harmonic motions represented by x_(1)=A"sin"(omegat+(pi)/(6)) and x_(2)=A "cos"omegat ?

The displacement of a particle is represented by the equation y=3cos((pi)/(4)-2omegat). The motion of the particle is

The displacement of a particle is represented by the equation y=3cos((pi)/(4)-2omegat). The motion of the particle is

The displacement of a particle is represented by the equation y=3cos((pi)/(4)-2omegat). The motion of the particle is

Two particle are executing SHMs .The equations of their motions are y_(1)=10"sin"(omegat+(pi)/(4)) " and "y_(2)=5 "sin"(omegat+(sqrt(3)pi)/(4)) What is the ratio of their amplitudes.

Two particles are executing identical simple harmonic motions described by the equations x_1=acos(omegat+(pi)/(6)) and x_2=acos(omegat+(pi)/(3)) . The minimum interval of time between the particles crossing the respective mean positions is (pi)/(2omega)

If two SHMs are represented by equations y_(1) = 5 sin (2pi t + pi//6) and y_(2) = 5 [sin (3pi) + sqrt3 cos (3pi t)] . Find the ratio of their amplitudes.