The relation between time t and distance `x t= ax^(2) +bx` is , where a and b are constants. The acceleration is:

The relation between time t and distance x is t = ax^(2)+ bx where a and b are constants. The acceleration is

The relation between time t and displacement x is t = alpha x^2 + beta x, where alpha and beta are constants. The retardation is

The relation between time t and distance x of a particle is given by t=Ax^(2)+Bx , where A and B are constants. Then the (A) velocity is given by v=2Ax+B (B) velocity is given by v=(2Ax+B)^(-1) (C ) retardation is given by 2Av^(3) (D) retardation is given by 2Bv^(2) Select correct statement :-

A particle moves rectilinearly. Its displacement x at time t is given by x^(2) = at^(2) + b where a and b are constants. Its acceleration at time t is proportional to

The reation between the time t and position x for a particle moving on x-axis is given by t=px^(2)+qx , where p and q are constants. The relation between velocity v and acceleration a is as

The x and y coordinates of a particle at any time t are given by x = 2t + 4t^2 and y = 5t , where x and y are in metre and t in second. The acceleration of the particle at t = 5 s is

The velocity v of a particle at time t is given by v=at+b/(t+c) , where a, b and c are constants. The dimensions of a, b, c are respectively :-

The equation of motion of a projectile is y = ax - bx^(2) , where a and b are constants of motion. Match the quantities in Column I with the relations in Column II.

For a body in a uniformly accelerated motion, the distance of the body from a reference point at time 't' is given by x = at + bt^2 + c , where a, b , c are constants. The dimensions of 'c' are the same as those of (A) x " " (B) at " " (C ) bt^2 " " (D) a^2//b

The potential energy between two atoms in a molecule is given by U=ax^(2)-bx^(2) where a and b are positive constants and x is the distance between the atoms. The atom is in stable equilibrium when x is equal to :-