A sphere of mass m and radius r is projected in a gravity free space with speed v. If coefficient of viscosity of the medium in which it moves is `1/(6pi)` , the distance travelled by the body before it stops is

A solid sphere of mass m and radius R is gently placed on a conveyer belt moving with constant velocity v_(0) . If coefficient of friction between belt and sphere is 2//7 the distance traveled by the centre of the sphere before it starts pure rolling is

A container filled with viscous liquid is moving vertically downwards with constant speed 3v_0 . At the instant shown, a sphere of radius r is moving vertically downwards (in liquid) has speed v_0 . The coefficient of viscosity is eta . There is no relative motion between the liquid and the container. Then at the shoen instant, The magnitude of viscous force acting on sphere is

A spherical object of mass 1 kg and radius 1m is falling vertically downward inside a viscous liquid in a gravity free space. At a certain instant the velocity of the sphere is 2 ms^(-1) . If the coefficient of viscosity of the liquid is (1)/(6pi) SI units, then velocity of ball will become 0.5 ms^(-1) after a time.

A small steel ball of mass m and radius r is falling under gravity through a viscous liquid of coefficient of viscosity eta . If g is the value of acceleration due to gravity. Then the terminal velocity of the ball is proportional to (ignore buoyancy)

A circular ring of mass M and radius 'a' is placed in a gravity free space. A small particle of mass m placed on the axis of the ring at a distance sqrt(3)a from the center of the ring, is released from rest. The velocity with which the particle passes through the center of the ring is

A force of 3.14 N is required to drag a sphere of radius 4 cm with a speed of 5 ms^(-1) in a medium in gravity free space. Find the coefficient of the viscosity of the medium.

A sperical object of mass 1kg and radius 1 m is falling vertically downward inside a viscous liquid in a gravity free space. At a certain instant the velocity of the sphere is 2 m/s. if the coefficient of viscosity of the liquid is (1)/(18pi)N-S//m^(2) then velocity of ball will become 0.5 m/s after a tie

A sphere of radius R is projected with a reverse spin omega_(0) down a rough inclined plane with a speed v_(0) for which coefficient of friction is mu gt tantheta , where theta is angle of the inclination. Show that it will turn back if omega gt (5v_(0)mu)/(2R(mu-tantheta))

A sperical body of mass m and radius r is allowed to fall in a medium of viscosity eta . The time in which the velocity of the body increases from zero to 0.63 times the terminal velocity (v) is called constant (tau) . Dimensionally , tau can be represented by

Two uniformaly charged nonconducting spheres, each of radius R,are fixed in a gravity free space as shwon in the figure. If an electron is released at rest from the point A, then its speed just before striking the other sphere is [mass of electron =m_(e) ]