Answer:
0.933 L
Explanation:
Since the pressure is the same, we use the equation [tex]\frac{V_{1}}{T_{1} } = \frac{V_{2} }{T_{2} }[/tex]
V = Volume
T = Temperature
Since we are given the temperature in Celsius, we need to convert it to Kelvin by adding 273:
-55.0 + 273 = 218
40.0 + 273 = 313
[tex]\frac{0.650}{218} = \frac{x}{313}[/tex]
[tex]0.933 = x[/tex]
The gas will occupy a volume of 0.933 L.
(Side note - If the temperature increases, the gas will want to expand, leading to a higher volume.)
