Respuesta :
Explanation:
Let us assume that the volume of given aqueous solution is 7.5 L.
Therefore, according to Henry's law, the relation between concentration and pressure is as follows.
C = [tex]\frac{P}{K_{h}}[/tex]
where, pressure (P) = 760 torr = 1 atm
According to Henry's law, constants for gases in water at [tex]25^{o}C[/tex] are as follows.
[tex]p(O_{2})[/tex] = 0.21 atm = 0.21 bar
[tex]p(N_{2})[/tex] = 0.78 atm = 0.78 bar
[tex]K_{h}[/tex] for [tex]O_{2}[/tex] = [tex]7.9 \times 10^{2} bar/mol[/tex]
[tex]K_{h}[/tex] for [tex]N_{2}[/tex] = [tex]1.6 \times 10^{3} bar /mol[/tex]
Since, 21% oxygen is present in air so, its mass will be 0.21 g. Similarly, 78% nitrogen means the mass of nitrogen is 0.78 g.
Therefore, concebtrations will be calculated as follows.
[tex]C(O_{2}) = \frac{0.21}{7.9 \times 10^{2}} = 2.66 \times 10^-4 mol/L[/tex]
[tex]C(N_2) = \frac{0.78}{1.6 \times 10^3} = 4.875 \times 10^-4 mol/L[/tex]
Now, we will calculate the number of moles as follows.
[tex]n(O_{2}) = 7.5 \times 2.66 \times 10^-4 = 1.995 \times 10^-3[/tex] mol
[tex]n(N_2) = 7.5 \times 4.875 \times 10^-4 = 3.66 \times 10^-3[/tex] mol
As the molar mass of [tex]O_2[/tex] = 32 g/mol
Hence, mass of oxygen will be as follows.
Mass of [tex]O_2 = 32 \times 1.995 \times 10^-3 \times 1000[/tex]
= 63.84 mg
As the molar mass of [tex]N_{2}[/tex] = 28
Mass of [tex]N_{2} = 28 \times 3.66 \times 10^-3[/tex] = 102.5 mg
Thus, we can conclude that mass of oxygen is 63.84 mg and nitrogen is 102.5 mg.
Full Question:
Calculate the masses of oxygen and nitrogen that are dissolved in 6.0 L of aqueous solution in equilibrium with air at 25 °C and 760 Torr. Assume that air is 21% oxygen and 78% nitrogen by volume.
Gas constants are
O2 7.9x10^2 bar/M
N2 1.6x 10^3 bar/M
Explanation:
Pressure = 760 torr = 1 atm
Temperature = 25 °C
Henry's law is a gas law that states that the amount of dissolved gas in a liquid is proportional to its partial pressure above the liquid.
Henry's Law states that;
c = p/k
where p = partial pressure and k = Henry's constant for the gas.
Since Partial pressure is proportional to volume fraction;
Partial pressure of O2 = 0.21atm
Partial pressure of N = 0.78atm
From the question;
k for O2 = 769.2 L-atm/mol
k for N2 = 1639 L-atm/mol
Inserting the vlues of P and K, solving for C;
c(O2) = 0.21/769.2 = 2.73*10^-4 mol/L
c(N2) = 0.78/1639 = 4.76*10^-4 mol/L
Voulume of solutiion = 6.0L, so the no of moles is
n(O2) = 6 * 2.73*10^-4 = 1.64*10^-3 mol
n(N2) = 6 * 4.76*10^-4 = 2.86*10^-3 mol
Mass = Number of moles * Molar mass
molar mass of O2 = 32
Mass of O2 = 32 * 1.64 * 10^-3 = 52 mg of O2
molar mass of N2 = 28
Mass of N2 = 28 * 2.86 * 10^-3 = 80 mg of N2
