Some physical quantities are given in Column I and some possible SI units in which these quantities may be expressed are given in Column II. Match the physical quantities in Column I with the units in Column II and indicate your answer by darkening appropriate bubbles in the $4\times4$ matrix given in the ORS. Column I (A) $GM_eM_s$ $G$ - universal gravitational constant, $M_e$ - mass of the earth, $M_s$ - mass of the Sun (B) $\frac{3RT}{M}$ $R$ - universal gas constant, $T$ - absolute temperature, $M$ - molar mass (C) $\frac{F^2}{q^2B^2}$ $F$ - force, $q$ - charge, $B$ - magnetic field (D) $\frac{GM_e}{R_e}$ $G$ - universal gravitational constant, $M_e$ - mass of the earth, $R_e$ - radius of the earth Column II (p) (volt)(coulomb)(metre) (q) (kilogram)(metre)$^3$(second)$^{-2}$ (r) (metre)$^2$(second)$^{-2}$ (s) (farad)(volt)$^2$(kg)$^{-1}$
A - p, q; B - r, s; C - r, s; D - r, s
Some physical quantities are given in Column I and some possible SI units in which these quantities may be expressed are given in Column II. Match the physical quantities in Column I with the units in Column II and indicate your answer by darkening appropriate bubbles in the $4\times4$ matrix given in the ORS.
\textbf{Column I}\\
(A) $GM_eM_s$\\
$G$ - universal gravitational constant,\\
$M_e$ - mass of the earth,\\
$M_s$ - mass of the Sun\\
(B) $\frac{3RT}{M}$\\
$R$ - universal gas constant,\\
$T$ - absolute temperature,\\
$M$ - molar mass\\
(C) $\frac{F^2}{q^2B^2}$\\
$F$ - force,\\
$q$ - charge,\\
$B$ - magnetic field\\
(D) $\frac{GM_e}{R_e}$\\
$G$ - universal gravitational constant,\\
$M_e$ - mass of the earth,\\
$R_e$ - radius of the earth
\textbf{Column II}\\
(p) (volt)(coulomb)(metre)\\
(q) (kilogram)(metre)$^3$(second)$^{-2}$\\
(r) (metre)$^2$(second)$^{-2}$\\
(s) (farad)(volt)$^2$(kg)$^{-1}$