Find the dimensional formulae of
a the charge Q.
the potential V,
c. the capacitance C and
d the resistance R.
Some of the equations containing these quantities are `
`Q=It, U=VIt, Q=CV and V=RI,`
where I denotes the electric current, t is time and U is energy.

Find the dimensional formula of (a) coefficient of viscosity eta (b)charge q (c ) potention V (d) capacitance C and ( e) resistance R Some of the equations containing these quantities are F= -etaA [[Deltau )/(Delta ]], q = It. U = VIt, q = CV and V = IR where A denotes the v the velocity , I is the length ,I the electric current, t the time and U the energy .

f Q denote the charge on the plate of a capacitor of capacitance C then the dimensional formula for (Q^(2))/(©) is

The dimensional formula fo resistivity in terms of M,L,T and Q where Q stands for the dimensions of charge is

If C be the capacitance and V be the electric potential, then the dimensional formula of CV^(2) is

Find the dimensional formulae of the following quantities: a. the universal constant of gravitation G, b. the surface tension S, c. the thermal conductivity k and d. the coeficient of viscosity eta . Some equation involving these quantities are F=(Gm_1m_2)/r^2, S= (rho g r h)/2, Q=k(A(theta_2-theta_1)t)/d and F=- rho A (v_2-v_1)/(x_2-x_1) where the symbols have their usual meanings.

Find the dimensional formulae of the following quantities: (a) the resistance R (b) the inductance L © the magnetic field B (d) the permeability of free space mu_(0) (e) the magnetic dipole moment M (f) Planck' s constant h some formulae containing these qunatities are V=iR, U =(1)/(2)Li^(2), F=Bil,B=(mu_(0)^(i))/(2r),M=iA, E=hv where V :electric potential, i : electric current, F : force, l :length r : radius, A area, E : energy, v : frequency and U : energy.

The dimensionally correct expression for the resistance R among the following is [P = electric power, l = electric current, t = time, V = volatge and E = electric energy]

Let Q denote the charge on the plate of a capacitor of capacitance c. The dimensional formula for (Q^(2))/C is [ML^(x)T^(-x)] . Find the value of x.

If the potential difference across a plane parallel plate capacitor is doubled then the potential energy of the capacitor is doubled then the potential energy of the capacitor becomes four times under all conditions The potential energy U stored in the capacitor is U=(1)/(2) CV^(2) , where C and V have usual meaning.