Identify the physical quantity x defined as `x = (I F upsilon^2)/(W I^3),` where I is moment of inertia, F is force, `upsilon` is veloicty, W is work and I is length.

A physical quantity X is defined by the formula X=(IFv^(2))/(WL^(3)) where I is moment of inertia, F is force, v is velocity, W is work and L is length, the dimensions of X are

If I is moment of inertia, F is force, v is velocity, E is energy and L is length then, dimension of (IFv^2/(EL^4)) will be:

If I is moment of inertia, F is force, v is velocity, E is energy and L is length then, dimension of (IFv^2/(EL^4)) will be:

If I is moment of inertia, F is force, v is velocity, E is energy and L is length then, dimension of (IFv^2/(EL^4)) will be:

Check the dimensional consistency of the relation upsilon = (1)/(I) sqrt((P)/(rho)) where I is length, upsilon is velocity, P is pressure and rho is density,

KE of a rotating body is given by 1/2 I omega^2 ,where l is moment of inertia and omega is nagular velocity of the body.Find the dimensions of I.

If a composite physical quantity in terms of moment of inertia I, force F, velocity v, work W and length L is defined as, Q = (IFv^(2)//WL^(3)) , find the dimensions of Q and identify it.

Rotational kinetic energy of a body is expressed by the equation E_K=1//2 Iw^2 where I is the moment of inertia and omega is the angular velocity. Establish dimensional formula of I with the help of the above equation.

If a composite physical quantity in terms of moment of inertia I, force F, velocity v, work W and length L is defined as Q = (iFv^2)/(WL^3) , find dimensions of Q and identify it.

A physical quantity X depends on another physical quantities as X=YFe^(-beta r^(2))+ZW sin (alpha r) where r, F and W represents distance, force and work respectively & Y and Z are unknown physical quantities and alpha, beta are positive contsnats. If T represent velocity then dim (X) is equal to