Answer:
The ballon will brust at
Pmax = 518 Torr ≈ 0.687 Atm
Explanation:
Hello!
To solve this problem we are going to use the ideal gass law
PV = nRT
Where n (number of moles) and R are constants (in the present case)
Therefore, we can relate to thermodynamic states with their respective pressure, volume and temperature.
[tex]\frac{P_1V_1}{T_1}=\frac{P_2V_2}{T_2}[/tex] --- (*)
Our initial state is:
P1 = 754 torr
V1 = 3.1 L
T1 = 294 K
If we consider the final state at which the ballon will explode, then:
P2 = Pmax
V2 = Vmax
T2 = 273 K
We also know that the maximum surface area is: 1257 cm^2
If we consider a spherical ballon, we can obtain the maximum radius:
[tex]R_{max} = \sqrt{\frac{A_{max}}{4 \pi}}[/tex]
Rmax = 10.001 cm
Therefore, the max volume will be:
[tex]V_{max} = \frac{4}{3} \pi R_{max}^3[/tex]
Vmax = 4 190.05 cm^3 = 4.19 L
Now, from (*)
[tex]P_{max} = P_1 \frac{V_1T_2}{V_2T_1}[/tex]
Therefore:
Pmax= P1 * (0.687)
That is:
Pmax = 518 Torr
