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प्रश्न
Derive the equation of Raoult’s law for binary solution containing non-volatile solute.
उत्तर
Statement of Raoult’s Law:
Raoult’s law states that the partial vapor pressure of a volatile solvent in a solution is directly proportional to its mole fraction in the solution.
For a binary solution with:
Solvent (A) – Volatile
Solute (B) – Non-volatile
Since the solute is non-volatile, only the solvent contributes to the vapor pressure.
Raoult’s law Expression:
According to Raoult’s Law, the vapor pressure of the solvent in the solution is:
`P_A = X_AP_A^0`
where:
PA = Vapor pressure of the solvent in the solution
`P_A^0` = Vapor pressure of the pure solvent
XA = Mole fraction of the solvent (XA = 1 − XB)
Thus,
`P_A = (1 - X_B)P_A^0`
`P_A = P_A - X_BP_A^0`
Lowering of Vapor Pressure:
The lowering of vapor pressure due to the non-volatile solute is:
`ΔP = P_A^0 − P_A`
Substituting `P_A = P_A^0 - X_BP_A^0`
`ΔP = P_A^0 − (P_A^0 - X_BP_A^0)`
`ΔP = X_BP_A^0`
Relative Lowering of Vapor Pressure:
Dividing both sides by `P_A^0`,
`(ΔP )/(P_A^0) = X_B`
Since the mole fraction of solute (XB) is
`X_B = (n_B)/(n_A + n_B)`
where nA and nB are the number of moles of solvent and solute, respectively, we get:
`(ΔP )/(P_A^0) = (n_B)/(n_A + n_B)`
For a dilute solution, where nB ≪ nA, we approximate,
`(ΔP )/(P_A^0) ≈ (n_B)/(n_A)`
The relative lowering of vapor pressure is directly proportional to the mole fraction of the non-volatile solute.
