If power `(p)` suface tension `(T)` and Planck's constant `(h)` are arranged, so theat the dimensions of time in their dimensional formulae are in ascending order, then which of the following is correct?

If power (P), surface tension (S) and Planck's constant (h) are arranged so that the dimensions of time in their dimensional formulae are in ascending order, then which of the following is correct?

If power (P), surface tension (S) and Planck's constant (h) are arranged so that the dimensions of time in their dimensional formulae are in ascending order, then which of the following is correct?

If Surface tension (S), Moment of Inertia (I) and Planck’s constant (h), were to be taken as the fundamental units, the dimensional formula for linear momentum would be :

If Surface tension (S), Moment of Inertia (I) and Planck’s constant (h), were to be taken as the fundamental units, the dimensional formula for linear momentum would be :

If the velocity of light c, Planck's constant h and time t are taken as basis of fundamental units, then the dimension of force will change to

If momentum (P) , area (A) and time (T) are taken to be fundamental quntities, then power has the dimensional formula.

The liquid drop of density rho , radius r and surface tension o oscillates with time period T. Which of the following expression for T^2 is correct

The energy (E), angular momentum (L) and universal gravitational constant (G) are chosen as fundamental quantities. The dimensions of universal gravitational constant in the dimensional formula of Planck's constant (h) is :

If velocity, force and time are taken as the fundamental quantities, them using dimensional analysis choose the correct dimensional formula for mass among the following. [K is a dimensionless constant]

If velocity, force and time are taken as the fundamental quantities, them using dimensional analysis choose the correct dimensional formula for mass among the following. [K is a dimensionless constant]