One of two identical balloons contained carbon dioxide (CO2, 44 g mol−1) and the other contained hydrogen (H2, 2.0 g mol−1). If it took 24 hours for all of the H2 to escape from its balloon, how long did it take for all of the CO2 to escape?

1 Answer
Tartar C.
Apr 21, 2017

112.569978 hours112.569978hours which rounds to 110 hours110hours due to significant figures.

Explanation:

Use Graham's Law:
r_1/r_2 = sqrtM_2/sqrtM_1 = t_2/t_1r1r2=M2M1=t2t1
Note: rr is the rate of effusion, MM is the molar mass of the gas, and tt is the time the gas took to effuse. Also, know that this formula only works if both gasses are at the same temperature.

Since molar mass and time is given, we will use the second half of the formula.

sqrt("molar mass" CO_2)/sqrt("molar mass"H_2) = (time CO_2)/(time H_2)molar massCO2molar massH2=timeCO2timeH2

sqrt(44g*mol^(-1) CO_2)/sqrt(2.0g*mol^(-1)H_2) = (time CO_2)/(24 hours H_2)44gmol1CO22.0gmol1H2=timeCO224hoursH2

((24 hours H_2)*sqrt(44g*mol^(-1) CO_2))/sqrt(2.0g*mol^(-1)H_2) = time CO_2(24hoursH2)44gmol1CO22.0gmol1H2=timeCO2

time CO_2 = 112.569978 hourstimeCO2=112.569978hours

Since there are only 2 significant figures the answer would be 110 hours110hours

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