In an imaginary atmosphere, the air exerts a small force F on any particle in the direction of the particle's motion. A particle of mass m projected upward takes time `t_1` and reaching the maximum height and `t_2` in the return journey to the original point. Then

The height reached in time t by a particle thrown upward with a speed u is given by h=ut-1/2 g t^2 where g=9.8 m/s^2 is a constant. Find the time taken in reaching the maximum height.

The motion of a particle of mass m is described by h= ut + 1//2 "gt"^2 . Find the force acting on particle.

Assume that a tunnel ils dug along a chord of the earth, at a perpendicular distance R/2 from the earth's centre where R is the radius of the earth. The wall of the tunnel is frictionless. a. Find the gravitational force exerted by the earth on a particle of mass m placed in the tunnel at a distance x from the centre of the tunnel. b. Find the component of this fore along the tunnel and perpendicular to the tunnel. c. Find the normal force exerted by the wall on the particle. d. Find the resultant force on the particle. e.Show that the motion of the particle in the tunnel is simple harmonic and find the time period.

Figure shows a smooth track which consists of a straight inclined part of length l joining smoothly with the circular part. A particle of mass m is projected up the incline from its bottom. a.Find the minimum projected speed v_0 for which the particle reaches the top of the track. b. Assuming that the projection speed is 2v_0 and that the block does not lose contact with the track before reading its top, find teh force acting on it whenit reaches the top. c. Assuming that teh projection speed is only slightly greater than v_0 where will the block lose contact with the track?

A particle mass m is driven by a machine that delivers a constant power K watts . If the particle starts from rest the force on the particle at time t is:

A force vecF=vecvxxvecA is exerted on a particle in addition to the force of gravity, where vecv is the veocity of the particle and vecA is a constant vector in the horizontal direction. With what minimum speed a particle of mass m be projected so that it continues to move undeflected with a constant velocity?

A heavy particle is usspended by a 1.5 m long string . It is given a horizontal velocityof sqrt(57) m/s. a. Find the angle made by the string with the upward vertical, when it becomes slack. B. Find the speed of the particle at this instant. c.Find the maximum height reached by the particle over the point of suspension. Take g=10 m/s^2

A tightly-wound, long solenoid has n turns per unit length, a radius r and carries a current i. A particle having charge q and mass m is projected from a point on the axis in a direction perpendicular to the axis. What can be the maximum speed for which the particle does not strike the solenoid?

A particle P starts from the point z_0=1+2i , where i=sqrt(-1) . It moves first horizontally away from origin by 5 units and then vertically away from origin by 3 units to reach a point z_1dot From z_1 the particle moves sqrt(2) units in the direction of the vector hat i+ hat j and then it moves through an angle pi/2 in anticlockwise direction on a circle with centre at origin, to reach a point z_2dot The point z_2 is given by (a) 6+7i (b) -7+6i (c) 7+6i (d) -6+7i