1
answer
2
watching
732
views
12 Apr 2020
The apparatus shown here has two gas-filled containers and one empty container, all attached to a hollow horizontal tube. When the valves are opened and the gases are allowed to mix at constant temperature, what is the distribution of atoms in each container? Assume that the containers are of equal volume and ignore the volume of the connecting tube. Which gas has the greater partial pressure after the valves are opened?
![](data:image/png;base64,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)
The apparatus shown here has two gas-filled containers and one empty container, all attached to a hollow horizontal tube. When the valves are opened and the gases are allowed to mix at constant temperature, what is the distribution of atoms in each container? Assume that the containers are of equal volume and ignore the volume of the connecting tube. Which gas has the greater partial pressure after the valves are opened?
Sixta KovacekLv2
22 May 2020