A gas with a volume of 8 L at a temperature of 473K is switched to a new container with a temperature of 350K. If the pressure remains constant what is the new volume?

5.92L
10.81L
3.08L
20.78L

As the gas temperature increases, the molecules move faster and take less time to reach the walls of the container. This means that the number of crashes per unit of time will be greater. That is, there will be an increase (for an instant) in the pressure inside the container and the volume will increase.

So Charles's Law is one of the gas laws that relates the volume and temperature of a certain amount of gas at constant pressure and says that:

If the temperature increases the volume increases

If the temperature decreases the volume decreases

Mathematically this is expressed by:

[tex]\frac{V}{T}=k[/tex]

When you want to study two different states, an initial and a final one of a gas, this law is expressed by:

[tex]\frac{V1}{T1} =\frac{V2}{T2}[/tex]

In this case:

V1: 8 L
T1: 473 K
V2: ?
T2: 350 K

Replacing:

[tex]\frac{8 L}{473K} =\frac{V2}{350K}[/tex]

Solving:

[tex]V2=350K*\frac{8L}{473K}[/tex]

V2=5.92 L

The new volume is 5.92 L, which is approximately 6 L

A gas with a volume of 8 L at a temperature of 473K is switched to a new container with a temperature of 350K. If the pressure remains constant what is the new volume? 5.92L 10.81L 3.08L 20.78L

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A gas with a volume of 8 L at a temperature of 473K is switched to a new container with a temperature of 350K. If the pressure remains constant what is the new volume?

5.92L
10.81L
3.08L
20.78L