Question #8dabc

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Question #8dabc

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Answer 1 · 2014-12-16T05:55:18

The answer is : V = 2.80x10^-4L.

Gas' properties:
Volume (V)
Pressure (P)
Temperature (T- in Kelvins)
Amount (n - moles)
.
And a Constant R (0.0821 L x atm / mol x K)

The easiest way to solve this problem is to make a set up as follow: !!! STP !!!
V= ? L
P= 1 atm
T= 273 K
n= ?

1) We can get the amount of moles from $5.5 * 10^(-4) g$ of $CO_2$ gas.

$Molarmass_(CO_2) = 12.01+2 * 16 = 44.01g$ of $CO_2$

Now take :

$5.5 * 10^(-4) g CO_2 * (1 mol e CO_2)/(44.01 g CO_2) = 1.25 * 10^(-5)$ mol of $CO_2$

2) $PV=nRT$

$1 * V= 1.25 * 10^(-5) * 0.0821 * 273$
$V = 2.80 * 10^(-4) L$

And that's it !

I strongly hope I was helpful !

David Tran
trananhdavid@gmail.com

Answer 2 · 2014-12-16T06:23:54

You would use the ideal gas law in order to solve this problem. The equation for the ideal gas law is $"PV"$ = $"nRT"$ . STP for the gas laws is $"0"^"o""C"$ and $"1 atm"$ . The temperature must be converted to Kelvins, and the mass of $"CO"_2$ must be converted to moles.

Given/Known:
$"P"$ = $"1 atm"$
$"molar mass of CO"_2$ = $"44.01 g/mol"$
$"n"$ = $"5.5 x 10"^(-4) "g"$ x $"1 mol CO2"/"44.01 g CO2"$ = $"1.2 x 10"^(-5) "mol CO"_2$
$"R"$ = $"0.08205746 L atm K"^(-1) "mol"^(-1)"$
$"T"$ = $"0"^"o""C" + 273.15 = 273.15 "K"$

Unknown:
$"V"$

Equation:
$"PV"$ = $"nRT"$

Solution: Divide both sides of the equation by $"P"$ , to isolate $"V"$ . Solve for $"V"$ .

$"V"$ = $"nRT"/"P"$ = $"1.2 x 10"^(-5)$ x $"0.08205746"$ x $"273.15"$ $/$ $"1"$ = $"2.7 x 10"^(-4) "L"$ (Units removed in order to make the equation more compact.)

Answer:
The volume of $"5.5 x 10"^(-4) "g CO"_2$ at STP is $"2.7 x 10"^(-4) "L"$ .

Answer 3 · 2014-12-16T09:53:46

An alternative approach to this problem is by using molar volume at STP.
We know that, at STP, one mole of any ideal gas occupies $22.4L$ .

The number of moles of $CO_2$ , knowing that its molar mass is $44.01 g/(mol)$ , is

$n_(CO_2) = m_(CO_2)/(molarmass) = (5.5 * 10^(-4)g)/(44.01 g/(mol)) = 1.2 * 10^(-5)$ moles

Therefore, since $n = V/(V_(molar)$ , we get

$V = n_(CO_2) * V_(molar) = 1.2 * 10^(-5) mol es * (22.4L)/(1 mol e) = 2.7 * 10^(-4) L$

One can use this method as a primary tool or as a way to double-check the result determined using the ideal gas law.

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Question #8dabc

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