Answer: The new volume of the balloon will be 583.5 L
Explanation:
To calculate the volume when temperature and pressure has changed, we use the equation given by combined gas law.
The equation follows:
[tex]\frac{P_1V_1}{T_1}=\frac{P_2V_2}{T_2}[/tex]
where,
[tex]P_1,V_1\text{ and }T_1[/tex] are the initial pressure, volume and temperature of the gas
[tex]P_2,V_2\text{ and }T_2[/tex] are the final pressure, volume and temperature of the gas
We are given:
[tex]P_1=1.15atm\\V_1=3.60L\\T_1=20^oC=[20+273]K=293K\\P_2=5.40\times 10^{-3}atm=0.00540atm\\V_2=?\\T_2=-50^oC=[-50+273]K=223K[/tex]
Putting values in above equation, we get:
[tex]\frac{1.15atm\times 3.60L}{293K}=\frac{0.00540atm\times V_2}{223K}\\\\V_2=\frac{1.15\times 3.60\times 223}{293\times 0.00540}=583.5L[/tex]
Hence, the new volume of the balloon will be 583.5 L
