Answer:
Explanation:
Given that:
The dilution rate D = 0.28 h⁻¹
The concentration of lactose in the feed [tex]S_o = 2.0 \ g/L[/tex]
The effluent S = 0.10 g/L
Also;
[tex]Y_{X/S} = 0.45 g\ X/g \ S , \\ \\ Y_{X/O2 }= 0.25 g \ X/g \ O2, \\ \\[/tex]
Saturation C* = 8 mg/l
To calculate the steady-state biomass, we use the formula:
[tex]X = Y_{X/S}(S_o-S_e) \\ \\ X = 0.45(2.0 -0.10) \ g/L \\ \\ X= 0.45 (1.9) \ g/L \\ \\ X = 0.855\ g/L \\ \\ X = 855 \ mg/L[/tex]
The biomass is 0.855 g/L
For a steady-state condition, the oxygen uptake rate can be illustrated by using the formula:
[tex]q_{o_2}X =\dfrac{\mu_X}{Y_{X/O_2}}[/tex]
where;
[tex]\mu =[/tex] dilution rate (D)
Thus, the steady-state can be expressed as:
[tex]q_{o_2}X =\dfrac{D}{Y_{X/O_2}}[/tex]
[tex]q_{o_2}X =\dfrac{0.28}{0.25}[/tex]
[tex]q_{o_2}X =1.12 \ h^{-1}[/tex]
The specific rate of oxygen consumption [tex]q_{o_2}X =1.12 \ h^{-1}[/tex]
b)
In the fermentation medium, if the desired DO concentration [tex]C_L[/tex] = 2 mg/L
Here, the oxygen transfer is regarded as the rate-limiting step.
As such, the oxygen transfer rate(OTR) is equivalent to the oxygen uptake rate.
In this scenario, let's determine the oxygen transfer coefficient [tex](K_{La})[/tex] by using the formula:
[tex]OTR = K_{La}(C^* - C_L)[/tex]
where;
[tex]K_{La}[/tex]= coefficient of oxygen transfer
C* = saturation
Since [tex]OTR = q_{O_2}X[/tex]
[tex]q_{o2}X = K_{La}(C^*-C_L) \\\\ (1.12 )(855) = K_{La}(8-2) \\ \\ 957.6 = K_La (6) \\ \\ K_{La}= \dfrac{957.6}{6} \\ \\ K_{La} = 159.6 \ h^{-1}[/tex]
Thus, the oxygen transfer coefficient [tex]K_{La}[/tex] = 159.6 h⁻¹
