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Question 2: A vessel contains nitrogen gas and has a total mass of 7.0 g. What is the density of this gas at 400 K and 12.0 atm? Assume ideal gas behavior.

User Roger Nelson
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1 Answer

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INFORMATION:

We know that:

- A vessel contains nitrogen gas and has a total mass of 7.0 g

- The temperature is 400K

- The pressure is 12.0 atm

And we need to find the density

STEP BY STEP EXPLANATION:

To find the density, we need to know that


\text{ density}=(mass)/(volume)

We know that the mass is 7.0 g, but we don't know the volume. So, we need to calculate the volume.

To calculate the volume we need to use that it has an ideal gas behavior. That means that we can use the formula for ideal gas


PV=nRT

Where,

- P is the pressure

- V is the volume

- n represents the moles of the gas

- R is the universal constant

- T is the temperature

In the statement is given that,

- P = 12.0 atm

- V = ? (we must find it)

- n = 0.2498 mol


7g/28.02(g)/(mol)=0.2498mol

- R = 0.08206 (atm * L) / (mol * K)

- T = 400 K

Now, replacing in the formula


\begin{gathered} 12atm\cdot V=0.2498mol\cdot0.08206(atm\cdot L)/(mol\cdot K)\cdot400K \\ \text{ Simplifying,} \\ 12atm\cdot V=8.1994\text{ }atm\cdot L \end{gathered}

Then, solving for V


\begin{gathered} 12atmV=8.199.4\text{ a}tm\cdot L \\ V=\frac{8.1994\text{ atm}\cdot L}{12\text{ atm}} \\ V=0.6833\text{ }L \end{gathered}

Finally, knowing that the mass is 7.0 g and the volume is 0.6833 L, the density will be


\text{ density}=\frac{7g}{0.6833\text{ }L}=10.2444(g)/(L)

ANSWER:

The density is 10.2444 g/L

User David Rabinowitz
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3.0k points