Answer:
freezing point (°C) of the solution = - 3.34° C
Explanation:
From the given information:
The freezing point (°C) of a solution can be prepared by using the formula:
[tex]\Delta T = iK_fm[/tex]
where;
i = vant Hoff factor
the vant Hoff factor is the totality of the number of ions in the solution
Since there are 1 calcium ion and 2 nitrate ions present in Ca(NO3)2, the vant Hoff factor = 3
[tex]K_f[/tex] = 1.86 °C/m
m = molality of the solution and it can be determined by using the formula
[tex]molality = \dfrac{mole \ of \ solute }{kg \ of \ solvent }[/tex]
which can now be re-written as :
[tex]molality = \dfrac{mole \ of \ Ca(NO_3)_2}{kg \ of \ water}[/tex]
[tex]molality = \dfrac{\dfrac{mass \ of \ \ Ca(NO_3)_2}{molar \ mass of \ Ca(NO_3)_2} }{kg \ of \ water}[/tex]
[tex]molality = \dfrac{\dfrac{11.3 \ g }{164 \ g/mol} }{0.115 \ kg }[/tex]
molality = 0.599 m
∴
The freezing point (°C) of a solution can be prepared by using the formula:
[tex]\Delta T = iK_fm[/tex]
[tex]\Delta T =3 \times (1.86 \ ^0C/m) \times (0.599 \ m)[/tex]
[tex]\Delta T =3.34^0 \ C[/tex]
[tex]\Delta T =[/tex] the freezing point of water - freezing point of the solution
3.34° C = 0° C - freezing point of the solution
freezing point (°C) of the solution = 0° C - 3.34° C
freezing point (°C) of the solution = - 3.34° C
