The potential energy of a particle varies with distance `x` from a fixed origin as `U = (A sqrt(x))/( x^(2) + B)`, where `A and B` are dimensional constants , then find the dimensional formula for `AB`.

The potential energy of a particle varies with distance x from a fixed origin as V= (Asqrt(X))/(X + B) where A and B are constants . The dimension of AB are

Select the dimensional formula of B^2/(2mu0)

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

The potential energy of a particle in a force field is: U = (A)/(r^(2)) - (B)/(r ) ,. Where A and B are positive constants and r is the distance of particle from the centre of the field. For stable equilibrium the distance of the particle is

The kinetic energy of a particle moving along x-axis varies with the distance x of the particle from origin as K=(A+x^3)/(Bx^(1//4)+C) .Write the dimensional formula for A^2B

A partical of mass m is located in a unidimensionnal potential field where potentical energy of the partical depends on the coordinates x as U (x) = (A)/(x^(2)) - (B)/(x) where A and B are positive constant. Find the time period of small oscillation that the partical perform about equilibrium possition.

If v-(A)/(t)+Bt^(2)+Ct^(3) where v is velocity, t is time and A, B and C are constants, then the dimensional formula of B is

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 of mass 'm' situated in a unidimensional potential field varies as U(x) = U_0 [1- cos((ax)/2)] , where U_0 and a are positive constant. The time period of small oscillations of the particle about the mean position-

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.