Answer:
7.35atm
Explanation:
Data obtained from the question include:
V1 = 28L
T1 = 42°C = 42 + 273 = 315K
P1 =?
V2 = 49L
T2 = 27°C = 27 + 273 = 300K
P2 = 4atm
Using P1V1/T1 = P2V2/T2, the original pressure can be obtained as follows:
P1V1/T1 = P2V2/T2
P1 x 28/315 = 4 x 49/300
Cross multiply to express in linear form
P1 x 28 x 300 = 315 x 4 x 49
Divide both side by 28 x 300
P1 = (315 x 4 x 49) /(28 x 300)
P1 = 7.35atm
Therefore, the original pressure is 7.35atm
Hello!
A gas that has a volume of 28 liters, a temperature of 42°C, and an unknown pressure has its volume increased to 49 liters and its temperature decreased to 27°C. If the pressure is measured after the change at 4.0 atm, what was the original pressure of the gas?
We have the following data:
P1 (initial pressure) = ? (in atm)
V1 (initial volume) = 28 L
T1 (initial temperature) = 42ºC (in Kelvin)
TK = TºC + 273.15
TK = 42 + 273.15 → T1 (initial temperature) = 315.15 K
P2 (final pressure) = 4 atm
T2 (final temperature) = 27ºC (in Kelvin)
TK = TºC + 273.15
TK = 27 + 273.15 → T2 (final temperature) = 300.15 K
V2 (final volume) = 49 L
Now, we apply the data of the variables above to the General Equation of Gases, let's see:
[tex]\dfrac{P_1*V_1}{T_1} =\dfrac{P_2*V_2}{T_2}[/tex]
[tex]\dfrac{P_1*28}{315.15} =\dfrac{4*49}{300.15}[/tex]
[tex]\dfrac{28\:P_1}{315.15} =\dfrac{196}{300.15}[/tex]
multiply the means by the extremes
[tex]28\:P_1*300.15 = 315.15*196[/tex]
[tex]8404.2\:P_2 = 61769.4[/tex]
[tex]P_2 = \dfrac{61769.4}{8404.2}[/tex]
[tex]P_2 = 7.349825087... \to \boxed{\boxed{P_2 \approx 7.35\:atm}}\:\:\:\:\:\:\bf\blue{\checkmark}[/tex]
Answer:
The original pressure of the gas is approximately 7.35 atm
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