Answer:
Hello the needed relation is missing below is the required relation
[tex]X_{p} = \frac{x_{s} }{1+x_{s} }[/tex] composition : propane = 0.70, butane = 0.3
Answer : ≈ 5.75 hrs
Explanation:
Applying the data given in regards to the material balance
Butane balance input into the still = 5 mole feed/hr | 0.30 mol butane/molfeed
since the total volume of the liquid in the still is constant
The output from the still is = 5mol condensed/hr | x[tex]_{p}[/tex] mol butane/mol condensed
unsteady state equation = [tex]\frac{dx_{s} }{dt}[/tex] = 0.15 - [tex]0.5X_{p}[/tex]
note : to reduce the equation a single dependent variable we have to substitute for [tex]x_{p}[/tex]
[tex]\frac{dx_{s} }{dt}[/tex] [tex]= 0.15 + x_{s} / 1 + (0.5)x_{s}[/tex]
In order to find the time it will take for X to change from 0.3 to 0.35
integrate the above equation using the limits : t = 0, x[tex]_{s}[/tex] = 0.3 and t = Ф,
x[tex]_{s} = 0.35[/tex]
= [tex][ - (x_{s} /0.35 - (1/(0.35)^2)* In(0.15 - 0.35x_{s} ) ]_{0.3} ^{0.35}[/tex]
hence t = Ф ≈ 5.75 hrs
