The potential energy of a particle varies with x according to the reltiaon U(x) `=x^(2)-4x`. The point x =2 is a point of

Potential energy of a particle varies with x according to the relation U(x)=x^(2)-4x .The point "x=2" is a point of

The potential enery of a particle varies with posiion x according to the relation U(x) = 2x^(4) - 27 x the point x = (3)/(2) is point of

The potential enery of a particle varies with posiion x according to the relation U(x) = 2x^(4) - 27 x the point x = (3)/(2) is point of

The potential energy of a particle varies with position X according to the relation U(x) = [(X^3/3)-(3X^2/2)+2X] then

A particle of mass m is present in a region where the potential energy of the particle depends on the x-coordinate according to the expression U=(a)/(x^2)-(b)/(x) , where a and b are positive constant. The particle will perform.

A particle of mass m is present in a region where the potential energy of the particle depends on the x-coordinate according to the expression U=(a)/(x^2)-(b)/(x) , where a and b are positive constant. The particle will perform.

The potential energy of a particle under a conservative force is given by U(x)=(x^(2)-3x)J . The equilibrium position of the particle is at x m. The value of 10 x will be

The potential energy of a particle of mass 2 kg moving along the x-axis is given by U(x) = 4x^2 - 2x^3 ( where U is in joules and x is in meters). The kinetic energy of the particle is maximum at

The potential energy of a particle varies with distance x as U=(Ax^(1//2))/(x^(2)+B) where a and B are constants. The dimensional formula for AXB is :