A point mass oscillates along the x-axis according to the law `x=x_(0) cos(moegat-pi//4). If the acceleration of the particle is written as `a=A cos(omegat+delta), the .

A point mass oscillates along the x- acis according to the law x = x_(0)cos(omegat - pi//4) if the acceleration of the particle is written as, a = A cos(omega + delta) , then :

A point mass oscillates along the x- acis according to the law x = x_(0)cos(omegat - pi//4) if the acceleration of the particle is written as, a = A cos(omega + delta) , then :

A particle moves along the X -axis according to to the law S=a sin^(2)(omegat-pi//4) The amplitude of the oscillation is

A particle moves along the X -axis according to to the law S=a sin^(2)(omegat-pi//4) The time period of oscillations is

A point oscillates along the x axis according to the law x=a cos (omegat-pi//4) . Draw the approximate plots (a) of displacemetn x , velocity projection upsilon_(x) , and acceleration projection w_(x) as functions of time t , (b) velocity projection upsilon_(x) and acceleration projection w_(x) as functions of the coordiniate x .

A particle moves along the x axis according to the law x=a cos omega t . Find the distance that the particle covers during the time interval from t=0 to t .

A particle moves along x-axis according to the law x=(t^(3)-3t^(2)-9t+5)m . Then :-

A particle moves on the X- axis according to the equation x = x_(0) sin^(2)omegat . The motion is simple harmonic

A particle move along y-axis according to equation y +3+4 cos omega t . The motion of the particle is