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

How motion of any particle is described ?

Which types of force acting on the system of particle?

Discuss the forces acting on the n particles in a system.

The momentum of a moving particle given by p=tl nt . Net force acting on this particle is defined by equation F=(dp)/(dt) . The net force acting on the particle is zero at time

Figure shows the displacement of a particle going along the X-axis as a function of time. The force acting on the particle is zero in the region

Path traced by a moving particle in space is called trajectory of the particle. Shape of trajectiry is decided by the forces acting on the particle. When a coordinate system is associated with a particle motion, the curve equation in which the particle moves [y=f(x)] is called equation of trajectory. It is just giving us the relation among x and y coordinates of the particle i.e. the locus of particle. To find equation of trajectory of a particle, find first x and y coordinates of the particle as a function of time eliminate the time factor. In above question initial acceleration (i.e. (d^(2)vec(r))/(dt^(2))) of particle is :-

Path traced by a moving particle in space is called trajectory of the particle. Shape of trajectiry is decided by the forces acting on the particle. When a coordinate system is associated with a particle motion, the curve equation in which the particle moves [y=f(x)] is called equation of trajectory. It is just giving us the relation among x and y coordinates of the particle i.e. the locus of particle. To find equation of trajectory of a particle, find first x and y coordinates of the particle as a function of time eliminate the time factor. The position vector of car w.r.t. its starting point is given as vec(r)=at hat(i)- bt^(2) hat(j) where a and b are positive constants. The locus of a particle is:-

Path traced by a moving particle in space is called trajectory of the particle. Shape of trajectiry is decided by the forces acting on the particle. When a coordinate system is associated with a particle motion, the curve equation in which the particle moves [y=f(x)] is called equation of trajectory. It is just giving us the relation among x and y coordinates of the particle i.e. the locus of particle. To find equation of trajectory of a particle, find first x and y coordinates of the particle as a function of time eliminate the time factor. In above the velocity (i.e. (dvec(r))/(dt)) at t=0 is :-

A very small groove is made in the earth, and a particle of mass m_(0) is placed at (R)/(2) distance from the centre. Find the escape speed of the particle for that place.

(x, t), (y, t) diagram of a particle moving in 2-dimensions If the particle has a mass of 500 g, find the force (direction and magnitude) acting on the particle.