Two flasks `A` and `B` have equal volumes. Flask `A` containing `H_(2)` gas is maintained at `27^(@)C` while `B` containing an equal mass of `C_(2)H_(6)` gas is maintained at `627^(@)C`. In which flask and by how many times are molecules moving faster, assuming ideal behaviour for both the gases?

Two flasks `A` and `B` have equal volumes. Flask `A` containing `H_(2)

1.	Two flasks `A` and `B` have equal volumes. Flask `A` containing `H_(2)` gas is maintained at `27^(@)C` while `B` containing an equal mass of `C_(2)H_(6)` gas is maintained at `627^(@)C`. In which flask and by how many times are molecules moving faster, assuming ideal behaviour for both the gases?
Answer» Calculate the relative velocities of molecules Average velocity of a gas `mu=sqrt((8RT)/(pi M))` `mu_(H_(2))=sqrt((8RT_(1))/(pi M_(1)))`, `mu_(C_(2)H_(6))=sqrt((8RT_(2))/(pi M_(2)))` `(mu_(H_(2)))/(mu_(C_(2)H_(6)))=sqrt((T_(1)M_(2))/(T_(2)M_(1)))` [`T_(1)=300K`, `T_(2)=900 K`] `M_(1)=2g mol^(-1)` `M_(2)=30 g mol^(-1)` `(mu_(H_(2)))/(mu_(C_(2)H_(6)))=sqrt((300xx30)/(900xx2))=sqrt((5))/(1)=2.237:1` Thus, `H_(2)` molecules in flask `A` will be moving `2.237` times faster than `C_(2)H_(6)` molecules in `B`.

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Two flasks `A` and `B` have equal volumes. Flask `A` containing `H_(2)` gas is maintained at `27^(@)C` while `B` containing an equal mass of `C_(2)H_(6)` gas is maintained at `627^(@)C`. In which flask and by how many times are molecules moving faster, assuming ideal behaviour for both the gases?

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