The final temperature of the gas is [tex]27^{\circ}C[/tex]
Explanation:
Since the volume of the gas is constant (the volume of the chamber does not change), we can apply the pressure's law, which states that:
"For a gas kept at constant volume, the pressure of the gas is proportional to its absolute temperature"
Mathematically:
[tex]\frac{p}{T}=const.[/tex]
where
p is the gas pressure
T is its Kelvin temperature
For this problem, the equation can be written as
[tex]\frac{p_1}{T_1}=\frac{p_2}{T_2}[/tex]
where we have:
[tex]p_1=1.50\cdot 10^6 Pa[/tex] is the initial pressure
[tex]p_2=0.950\cdot 10^6 Pa[/tex] is the final pressure
[tex]T_1=200^{\circ}C+273=473 K[/tex] is the initial temperature
[tex]T_2[/tex] is the final temperature
And solving for T2,
[tex]T_2=\frac{p_2 T_1}{p_1}=\frac{(0.950\cdot 10^6)(473)}{1.50\cdot 10^6}=300 K[/tex]
So the final temperature is
[tex]T_2 = 300 K - 273 = 27^{\circ}C[/tex]
Learn more about ideal gases:
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