A particle is projected vertically up and another is let fall to meet at the same instant. If they have velocities equal in magnitude when they meet, the distance travelled by them are in the ratio of

A particle is projected vertically upwards with a velocity of 20m/sec. Find the time at which distance travelled is twice the displacement

A particle of mass m and charge q is accelerated by a potential difference V volt and made to enter a magnetic field region at an angle theta with the field. At the same moment, another particle of same mass and charge is projected in the direction of the field from the same point. Magnetic field induction is B. What would be the speed of second particle so that both particles meet again and again after regular interval of time. Also, find the time interval after which they meet and the distance travelled by the second particle during that interval.

A particle of mass m and charge q is accelerated by a potential difference V volt and made to enter a magnetic field region at an angle theta with the field. At the same moment, another particle of same mass and charge is projected in the direction of the field from the same point. Magnetic field induction is B. What would be the speed of second particle so that both particles meet again and again after regular interval of time. Also, find the time interval after which they meet and the distance travelled by the second particle during that interval.

When a particle is undergoing motion, the diplacement of the particle has a magnitude that is equal to or smaller than the total distance travelled by the particle. In many cases the displacement of the particle may actually be zero, while the distance travelled by it is non-zero. Both these quantities, however depend on the frame of reference in which motion of the particle is being observed. Consider a particle which is projected in the earth's gravitational field, close to its surface, with a speed of 100sqrt(2) m//s , at an angle of 45^(@) with the horizontal in the eastward direction. Ignore air resistance and assume that the acceleration due to gravity is 10 m//s^(2) . There exists a frame (D) in which the distance travelled by the particle is minimum. This minimum distance is equal to :-

STATEMENT - 1 : A particle is projected vertically upwards with speed v. Starting from initial point, its average velocity is less than average speed than average speed when particle is returning back to ground. and STATEMENT - 2 : When particle turns back, its displacement is less than distance covered.

When a particle is projected at an angle to the horizontal, it has range R and time of flight t_(1) . If the same projectile is projected with same speed at another angle to have the saem range, time of flight is t_(2) . Show that: t_(1)t_(2)=(2R//g)

A particle is projected vertically upwards and t second after another particle is projected upwards with the same initial velocity. Prove that the particles will meet after a lapse of ((t)/(2)+(u)/(g)) time from the instant of projection of the first particle.

A particle is dropped from the top a tower h metre high and at the same moment another particle is projected upward from the bottom. They meet the upper one has descended a distance h//n . Show that thevelocities of the two when they meet are in the ratio 2 : (n-2) and that the initial velocity of the particle projected upis sqrt((1//2))n gh .

A particlele is projected vertically upwards from the ground with a speed V and a speed v and a second particle is projected at the same instant from a height h directly above the first particel with the same speed v at an angle of projection theta with the horizontal in upwards direction. The time when the distance between them is minimum is

Two paarticles 1 and 2 are projected simultaneusly with velocities v_(1) and v_(2) , respectively. Particle 1 is projectected vertically up from the top of a cliff of heitht h and particle 2 is projected vertically up from the bottom of the cliff. If the bodies meet (a) above the top of the cliff, (b) between the top and bottom of the the cliff, and (c ) below the bottom of the cliff, find the time of meeting of the particles. .