Vertical displacement of a plank with a body of mass m on it is varying according to the law `y=sinomegat+sqrt(3)cosomegat`. The minimum value of `omega` for which the mass just breaks off the plank and the moment it occurs first time after t=0, are given by (y is positive towards vertically upwards).

The position of a particle moving along x-axis varies with time t according to equation x=sqrt(3) sinomegat-cosomegat where omega is constants. Find the region in which the particle is confined.

In a horizontal spring - mass system mass m is released after being displaced towards right by some distance t = 0 on a friction-less surface. The phase angle of motion in radian when it is first time passing through equilibrium position is equal to

The position of a particle moving in space varies with time t according as :- x(t)=3 cosomegat y(t)=3sinomegat z(t)=3t-8 where omega is a constant. Minimum distance of particle from origin is :-

A man of mass 60kg is standing on a platform executing SHM in the vertical plane. The displacement from the mean position varies as y = 0.5sin(2pift) . The value of f , for which the man will feel weightlessness at the highest point, is ( y in metre)

Four point charges +8muC,-1muC,-1muC and , +8muC are fixed at the points -sqrt(27//2)m,-sqrt(3//2)m,+sqrt(3//2)m and +sqrt(27//2)m respectively on the y-axis. A particle of mass 6xx10^(-4)kg and +0.1muC moves along the x-direction. Its speed at x=+ infty is v_(0) . find the least value of v_(0) for which the particle will cross the origin. find also the kinetic energy of the particle at the origin in tyhis case. Assume that there is no force part from electrostatic force.

An accelration produces a narrow beam of protons, each having an initial speed of v_(0) . The beam is directed towards an initially uncharges distant metal sphere of radius R and centered at point O. The initial path of the beam is parallel to the axis of the sphere at a distance of (R//2) from the axis, as indicated in the diagram. The protons in the beam that collide with the sphere will cause it to becomes charged. The subsequentpotential field at the accelerator due to the sphere can be neglected. The angular momentum of a particle is defined in a similar way to the moment of a force. It is defined as the moment of its linear momentum, linear replacing the force. We may assume the angular momentum of a proton about point O to be conserved. Assume the mass of the proton as m_(P) and the charge on it as e. Given that the potential of the sphere increases with time and eventually reaches a constant velue. One the potential of the sphere has reached its final, constant value, the minimum speed v of a proton along its trajectory path is given by

An accelration produces a narrow beam of protons, each having an initial speed of v_(0) . The beam is directed towards an initially uncharges distant metal sphere of radius R and centered at point O. The initial path of the beam is parallel to the axis of the sphere at a distance of (R//2) from the axis, as indicated in the diagram. The protons in the beam that collide with the sphere will cause it to becomes charged. The subsequentpotential field at the accelerator due to the sphere can be neglected. The angular momentum of a particle is defined in a similar way to the moment of a force. It is defined as the moment of its linear momentum, linear replacing the force. We may assume the angular momentum of a proton about point O to be conserved. Assume the mass of the proton as m_(P) and the charge on it as e. Given that the potential of the sphere increases with time and eventually reaches a constant velue. After a long time, when the potential of the sphere reaches a constant value, the trajectory of proton is correctly sketched as

A simple pendulum has time period 2s . The point of suspension is now moved upward accoding to relation y = (6t - 3.75t^(2))m where t is in second and y is the vertical displacement in upward direction. The new time period of simple pendulum will be

A particle moves in the x-y plane according to the law x=at, y=at (1-alpha t) where a and alpha are positive constants and t is time. Find the velocity and acceleration vector. The moment t_(0) at which the velocity vector forms angle of 90^(@) with acceleration vector.

A block of mass is placed on a surface with a vertical cross section given by y=x^3/6 . If the coefficient of friction is 0.5, the maximum height above the ground at which the block can be placed without slipping is: