Answer:
See explanation.
Explanation:
Hello,
For this exercise, it is convenient to assume a basis of 5 g of acetic acid which is the solute and 95 g of water which is the solvent, in such a way, one proceeds as follows:
(a) Molarity:
[tex]M=\frac{n_{solute}}{V_{solution}}[/tex]
Thus:
[tex]n_{solute}=5g*\frac{1mol}{60.052g} =0.083mol\\V_{solution}=V_{solute}+V_{solvent}=5mL+95mL =100mL=0.1L\\M=\frac{0.083mol}{0.1L}=0.83M[/tex]
(b) Molality:
[tex]m=\frac{n_{solute}}{m_{solvent}}[/tex]
In this case, the moles were already computed and the mass of the solvent is in kilograms, thus:
[tex]m=\frac{0.083mol}{0.095kg}=0.874m[/tex]
(c) Parts by mass:
[tex]\% m/m=\frac{m_{solute}}{m_{solution}}*100\%=\frac{5g}{5g*\frac{1mL}{1.05g} +95g*\frac{1mL}{1g}}*100\% =5.01\%[/tex]
(d) Mole fraction:
[tex]x=\frac{n_{solute}}{n_{solution}}[/tex]
In this case, the moles of water are required:
[tex]n_{H_2O}=95mL*\frac{1g}{1mL} *\frac{1molH_2O}{18gH_2O}=5.28molH_2O[/tex]
Since:
[tex]x=\frac{0.083mol}{0.083mol+5.28mol}=0.155[/tex]
Best regards.
