Answer:
molar flow at the bottom streams = 30 moles
composition of the bottom streams exiting the second separation unit
= 0.20 ( methanol )
= 0.80 ( water )
Step-by-step explanation:
The molar flow and the composition of the bottom streams is calculated as follows below
First we have to balance the overall material across the Mixer unit
= F1 + F2 = A
= 100 + 10 = 110 mole
next we calculate Methanol balance
= Xe1 * F1 + Xe2 * F2 = AXea
= (0.5 * 100) + ( 0.4 * 10 ) = 110 Xea
= 50 + 4 = 110Xea
Xea = 0.491 therefore: Xaw = 1 - Xea = 1 - 0.491 = 0.509
Next we calculate the material balance of separator 1
A = B + C
where: A = 110 moles , B = ? , C = 70 moles
Therefore B= A - C = ( 110 - 70 ) = 40 moles
From here we will find the value of Xec using the Methanol balance relationship
Xea * A = Xeb*B + Xec * C
where: A = 110 moles , B = 40 moles , C = 70 moles
Xea = 0.491, Xeb = 0.7 ,
Input these values into the equation above : Xec = 0.372
note: at the exit top stream both the separators have the same flow rate
i.e : B = D = 40 mole
Material Balance over the separator 2 can hence be calculated as
C = D + E
E = c - d = 70 - 40
E = 30 moles ( mole flow rate at the 2nd separator unit )
calculate the value of XeE
methanol balance : Xec * c = Xed * D + XeE * E
hence : XeE = [ ( 70 * 0.372 ) - ( 0.5 * 40 ) ] / 30
XeE = 0.20
attached below is the flow sheet of the problem