Answer:
V = 929.7
Step-by-step explanation:
Given the equation:
[tex]\frac{dCA}{dV}[/tex] = [tex]\frac{-kCA}{V0}[/tex]
The integral of the above equation is:
[tex]\int\limits {\frac{dCA}{dV} }[/tex] = [tex]\int\limits{\frac{-kCA}{V0} }[/tex]
Re-organizing the integrals:
[tex]\int\limits {\frac{dCA}{CA} }[/tex] = [tex]\int\limits {\frac{-kdV}{V0} }[/tex]
Integrating:
ln(CA) - ln(CA0) = [tex]\frac{-kV}{V0}[/tex]
Inputting the initial conditions of CA and the values of k and V0:
ln(7) - ln(100) = [tex]\frac{-0.02V}{7}[/tex]
1.946 - 4.605 = -0.00286V
-2.659 = -0.00286V
=> V = [tex]\frac{2.659}{0.00286}[/tex]
V = 929.720
Approximating to one decimal place,
V = 929.7
