Explanation:
The given data is as follows.
For the constant volume condition,
[tex]T_{1}[/tex] = 40 F
[tex]V_{1} = 0.01602 ft^{3}/lb[/tex]
[tex]V_{2}[/tex] = 0.01613
Therefore, expression for the compressibility is as follows.
[tex]\frac{dP}{\frac{dV}{V}}[/tex] = K
[tex]\frac{dP}{\frac{(0.01602 - 0.01613)}{0.01602}} = 30 \times 10^{4}[/tex]
dP = [tex]30 \times 10^{4} (\frac{0.01602 - 0.01613}{0.01602})[/tex]
= 2059.925 psi
= [tex]2.059 \times 10^{3}[/tex] psi
therefore, we can conclude that pressure that develops in the container when the water reaches this higher temperature is [tex]2.059 \times 10^{3}[/tex] psi.
