Previous Class Revision|Analysis of Proj...

Previous Class Revision|Analysis of Projectile|Coordinate of a Particle After a Given Time t|Velocity and Direction of Motion After a Given Time|Equation of Trajectory

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Coordinate Of A Particle After A Given Time t|Velocity And Direction Of Motion After A Given Time|Velocity And Direction Of Motion At Given Height|Exercise Questions|Equation Of Trajectory

A particle moves so that s=6+48t- t^3 . The direction of motion reverses after moving a distance of

The coordinate of a moving particle at any instant of time t are x = at and y = bt ^(2). The trajectory of the 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:-

A boat starting from rest aims perpendicular to the river with an acceleration of a=6t (where t= time) the boat starts from (2,0) of the coordinate system. Find equation of trajectory. Given velocity of river =u .

Previous Class Revision|Analysis of Projectile|Coordinate of a Particle After a Given Time t|Velocity and Direction of Motion After a Given Time|Equation of Trajectory

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