Answer:
The molar concentration would have to be 0,81 M.
Explanation:
The osmotic pressure equation is:
[tex]\pi = M R T[/tex]
where:
[tex]\pi[/tex]: osmotic pressure [atm]
M: molar concentration [M]
R: gas constant 0,08205 [atm.L/mol.°K]
T: absolute temperature [°K]
To solve the problem, we just clear M from the osmotic pressure equation and then replace our data using the appropiate units. Clearing the variable M we have:
[tex]M = \frac{\pi }{RT}[/tex]
We have to use temperature as absolute temperature (in kelvins), T=29+273=302 °K. Now we can replace our values in the equation:
[tex]M = \frac{20,1 atm}{0,08205 \frac{atm.L}{mol.K} * 302 K }[/tex]
As we can see, all units will be simplified and we'll have the molar concentration in mol/L.
[tex]M = 0,81 \frac{mol}{L} = 0, 81 M[/tex]
