[" 58.A particle is subjected to two simple harmonic motions,"],[" one along the "X" -axis and the other on a line making an "],[" angle of "45^(@)" with the "X" -axis.The two motions are given "],[" by "],[qquad x=x_(0)sin omega t" and "s=s_(0)sin omega t]

A particle is subjected to two simple harmonic motions, one along the X-axis and the other on a line making an angle of 45^@ with the X-axis. The two motions are given by x=x_0 sinomegat and s=s_0 sin omegat . find the amplitude of the resultant motion.

A particle is subjected to two simple harmonic motions, one along the X-axis and the other on a line making an angle of 45^@ with the X-axis. The two motions are given by x=x_0 sinomegat and s=s_0 sin omegat . find the amplitude of the resultant motion.

A particle is subjected to two simple harmonic motions, one along the X-axis and the other on a line making an angle of 45^@ with the X-axis. The two motions are given by x=x_0 sinomegat and s=s_0 sin omegat . find the amplitude of the resultant motion.

(a) A particle is subjected to two simple harmonic motions x_1=A_1sin omegat and x_2=A_2 sin (omegat+pi//3) . Find (i) the displacement at t=0 , (ii) the maximum speed of the particle and (iii) the maximum acceleration of the particle. (b) A particle is subjected to two simple harmonic motions, one along the x-axis and the other on a line making an angle of 45^@ with the x-axis. The two motions are given by xy=x_0sinomegat and s=s_0sin omegat Find the amplitude of the resultant motion.

A particle is subjected to two simple harmonic motion along x and y-directions according to equations x = 4sin 100pi t and y = 3sin 100pit Choose the correct statement –

A particle is subjected to two simple harmonic motion along x and y-directions according to equations x = 4sin 100pi t and y = 3sin 100pit Choose the correct statement –

A particle is subjected to two mutually perpendicular simple harmonic motions such that its X and y coordinates are given by X=2 sin omegat , y=2 sin (omega+(pi)/(4)) The path of the particle will be: