A particle is subjected to two simple harmonic motions along x and y directions according to `x=3sin100pit`, `y=4sin100pit`.

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 simple harmonic motions given by x_1=2.0sin(100pit)and x_2=2.0sin(120pit+pi/3) , where x is in centimeter and t in second. Find the displacement of the particle at a. t=0.0125, b. t= 0.025.

A particle is subjected to two simple harmonic motions given by x_1=2.0sin(100pit)and x_2=2.0sin(120pit+pi/3) , where x is in centimeter and t in second. Find the displacement of the particle at a. t=0.0125, b. t= 0.025.

A particle is subjected to two simple harmonic motions x_(1)=4 sin(100pit) and x_(2)==3 sin ^((100pi t + (pi)/(2)) Then maximum acceleration of the particle is

A particle is subjecte to two simple harmonic motions gilven by x_1=2.0sin(100pit_)and x_2=2.0sin(120pi+pi/3) , where x is in centimeter and t in second. Find the displacement of the particle at a. t=0.0125, b. t= 0.025.

A particle is subjected to two simple harmonic motions. x_(1) = 4.0 sin (100pi t) and x_(2) = 3.0 sin(100pi t + (pi)/(3)) Find (a) the displacement at t = 0 (b) the maximum speed of the particle and (c ) the maximum acceleration of the particle.

A particle is subjected to two simple harmonic motions. x_(1) = 4.0 sin (100pi t) and x_(2) = 3.0 sin(100pi t + (pi)/(3)) Find (a) the displacement at t = 0 (b) the maximum speed of the particle and (c ) the maximum acceleration of the particle.

A particle is subjected to two mutually perendicular simple harmonic motion such that its x and y coordinates are given by : x = 2 sin omega " "& " "y = 2 sin (omega t + (pi)/(2)) The path of the particle will be