Hydrostatic pressure 'P' varies with displacement 'x' as `P = (A)/(B)log(Bx^(2) +C)` where A,B, and C are constants. The dimensional formula for 'A' is

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 :

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 A times B is [M^(a)L^(b)T^(c)] then a=

The work done 'w' by a body varies with displacement 'x' as w = Ax + (B)/((C-x)^(2)) . The demensional formula for 'B' is

The equation of state for a real gas having pressure P, volume V and temperature T is expressed as (P+(a)/(V^(2)))(V-b)=RT where a, b and R are constant. What are the dimensional formula of (a)/(b) ?

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 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 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 U = (A sqrt(x))/( x^(2) + B) , where A and B are dimensional constants , then find the dimensional formula for AB .