If `epsilon_(0), B, V` represent permitivity of free space, magnitude of magnetic field and volume of space respectively, then the dimension of `epsilon_(0)B^(2)V` is `[M^(a)L^(b)T^(c)]`. Find `a+b+c`.

If epsilon_(0), B, V represent permitibvity of free space, magnitude of magnetic field and volume of space respectively, then the dimension of epsilon_(0)B^(2)V is [M^(a)L^(b)T^(c)] . Find a+b+c .

If m,e,epsilon_(0) h and c denote mass ,electron , change of electron, plank 's constant and speed of light , respectively , then the dimensions of (me^(4))/(epsilon_(0)^(2) h^(2) c) are

The dimensions of 1/2 epsilon_(0)E^(2) (epsilon_(0)= permittivity of free space, E= electric field) is

The dimension of ((1)/(2))epsilon_(0)E^(2) ( epsilon_(0) : permittivity of free space, E electric field

If epsilon_(0) is permittivity of free space, e is charge of proton, G is universal gravitational constant and m_(p) is mass of a proton then the dimensional formula for (e^(2))/(4pi epsilon_(0)Gm_(p)^(2)) is

A quantity X is given by epsilon_(0) L(DeltaV)/(Deltat) , where epsilon_(0) is the permittivity of free space L is a length DeltaV is a potnetial difference and Delta is a time internval. The dimensional forumla to X is the same as that of