Respuesta :
The given question is incomplete. The complete question is as follows.
When 70.4 g of benzamide ([tex]C_{7}H_{7}NO[/tex]) are dissolved in 850 g of a certain mystery liquid X, the freezing point of the solution is [tex]2.7^{o}C[/tex] lower than the freezing point of pure X. On the other hand, when 70.4 g of ammonium chloride ([tex]NH_{4}Cl[/tex]) are dissolved in the same mass of X, the freezing point of the solution is [tex]9.9^{o}C[/tex] lower than the freezing point of pure X.
Calculate the Van't Hoff factor for ammonium chloride in X.
Explanation:
First, we will calculate the moles of benzamide as follows.
Moles of benzamide = [tex]\frac{mass}{\text{Molar mass of benzamide}}[/tex]
= [tex]\frac{70.4 g}{121.14 g/mol}[/tex]
= 0.58 mol
Now, we will calculate the molality as follows.
Molality = [tex]\frac{\text{moles of solute (benzamide)}}{\text{solvent mass in kg}}[/tex]
= [tex]\frac{0.58 mol}{0.85 kg}[/tex]
= 0.6837
It is known that relation between change in temperature, Van't Hoff factor and molality is as follows.
dT = [tex]i \times K_{f} \times m[/tex],
where, dT = change in freezing point = [tex]2.7^{o}C[/tex]
i = van't Hoff factor = 1 for non dissociable solutes
[tex]K_{f}[/tex] = freezing point constant of solvent
m = 0.6837
Therefore, putting the given values into the above formula as follows.
dT = [tex]i \times K_{f} \times m[/tex],
[tex]2.7^{o}C = 1 \times K_{f} \times 0.6837 m[/tex]
[tex]K_{f}[/tex] = 3.949 C/m
Now, we use this [tex]K_{f}[/tex] value for calculating i for [tex]NH_{4}Cl[/tex]
So, moles of ammonium chloride are calculated as follows.
Moles of [tex]NH_{4}Cl = \frac{70.4 g}{53.491 g/mol}[/tex]
= 1.316 mol
Hence, calculate the molality as follows.
Molality = [tex]\frac{1.316 mol}{0.85 kg}[/tex]
= 1.5484
It is given that value of change in temperature (dT) = [tex]9.9^{o}C[/tex]. Thus, calculate the value of Van't Hoff factor as follows.
dT = [tex]i \times K_{f} \times m[/tex]
[tex]9.9^{o}C = i \times 3.949 C/m \times 1.5484 m[/tex]
i = 1.62
Thus, we can conclude that the value of van't Hoff factor for ammonium chloride is 1.62.
