Answer:
Tnbp = 731.44 K
Explanation:
Trouton's law:
∴ Tnbp: temperature at normal boiling point
∴ ΔH°vap = 54.2 KJ/mol
∴ ΔS°vap = (74.1 J/mol.K)×(KJ/1000 J) = 0.0741 KJ/mol.K
⇒ Tnbp = ΔH°vap / ΔS°vap
⇒ Tnbp = (54.2 KJ/mol) / (0.0741 KJ/mol.K)
⇒ Tnbp = 731.44 K
Answer:
731 K ( 458 ºC )
Explanation:
For a change of phase, in this case vaporization, we have:
TΔSºvap = ΔHº
assuming ∆H°vap, and ∆S°vap are independent of T.
So we can determine the boiling point by:
Tb = ∆H°vap/ ∆S°vap
First we will need to convert ∆H°vap to J/mol to be consistent in the units.
∆H°vap = 54.2 kJ x 1000 J / kJ = 5.42 x 10⁴ J/mol
Thus boiling point is:
Tb = 5.42 x 10⁴ J/mol / 74.1 J/mol K = 731 K = (731-273)ºC = 458 ºC
