Team:SydneyUni Australia/Modelling Results

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Running the Model

The model was run using MATLAB’s ODE45. The modelling for both the pathays had initial conditions of:

Constant Value Comment
KM A 0.530 mM From literature []
kcat A 3.3 s-1 From literature []
KM B 0.940 mM From literature []
kcat B 0.0871 s-1 From literature []
KM C 7.2 mM From literature []
kcat c 89.8 s-1 From literature []
KM D .160 mM From literature []
kcat D .600 s-1 From literature []
KM E 20 mM From literature []
kcat E 25.4 s-1 From literature []
, ,  & ε 0 mM Not naturally present in cells.
out 1 mM Initial concentration of DCA in solution (arbitrary)
in .001 mM Initial concentration of DCA in cell
A, B, C, D, E 25.55 mM Estimation from literature [], as described in "principles".
2 x 108 cells / mL Initial cell concentration which allows appropriate growth


and using the constants above the flux, J, took the value:

My spoon is too big.png


The Non-monooxygenase Pathway

ODE overview:

Igem ode 111.png


Raw MATLAB code:


function dy = nop450(t,y)
 
dy=zeros(7,1);
 
dy(1)= -y(7)*(6*10^(-12))*0.0463067*(y(1)-y(2));
dy(2)= ((6*10^(-12))*0.0463067*(y(1)-y(2)))-3.3*25.55*(y(2)/(0.53+y(2)));
dy(3)= 3.3*25.55*(y(2)/(0.53+y(2)))-0.0871*25.55*(y(3)/(0.94+y(3)));
dy(4)= .0871*25.55*(y(3)/(0.94+y(3)))- 0.6*25.55*(y(4)/(0.16+y(4)));
dy(5)= 0.6*25.55*(y(4)/(0.16+y(4))) - 25.4*25.55*(y(5)/(20+y(5)));
 
   if y(6) >  2*10^(-10)
      dy(6)= 25.4*25.55*(y(5)/(20+y(5))) -1.5789*10^(-10)
   else
       dy(6) = 25.4*25.55*(y(5)/(20+y(5)))
   end
   
   if y(6) > 0.0005 
        if y(7) > 1.6*10^11
            dy(7)=0
        else
            dy(7) = 5*10^6
        end
   else
        dy(7) = 0
   end
 
end




MATLAB output:

The rate at which DCA is removed in solution:

DCAcominin.png

Graph 1: The blue line represents how the concentration of DCA in solution decreases due to the action of our DCA degraders. The red line represents the intracellular concentions of the metabolites (disregard in this graph). One can see that an initial concentration of 2E8 cells/mL completely removes the DCA with a concentration 1mM in (roughly) 150mins.

The Rate at which the intracellular concentration of the metabolites change over time:

Intermediates1111.png

Graph 2: Each line represents the concentration of each of the metabolites . This graph is simply a rescaling of graph 1. Note: the glycolate won’t accumulate in the cell – it is metabolised – the model had glycolate as the final product. It is used to show that the presence of glycolate can attribute to cell growth.

Rescaling the graph once again: the rate at which the metabolic intermediate change over time.

Intermediates2222.png

Graph 3: Each line represents the concentration of each of the metabolites . This graph is simply a rescaling of graph 1 and 2.


The rate at which the cells grow over time:

Cellscellscells.png

Graph 4: the blue line represents the linear increase of cells due to the presence of intracellular glycolate.



The Non-monooxygenase Pathway

ODE overview:

Igem ode 22.png


Raw MATLAB code:

function dy = p450(t,y)
 
dy=zeros(6,1);
 
dy(1)= -y(6)*(6*10^(-12))*0.0463067*(y(1)-y(2));
dy(2)= ((6*10^(-12))*0.0463067*(y(1)-y(2))) - 0.0113*25.55*(y(2)/(.12+y(2)));
dy(3) = 0.0113*25.55*(y(2)/(.12+y(2))) - 0.6*25.55*(y(3)/(0.16+y(3)));
dy(4)= 0.6*25.55*(y(3)/(0.16+y(3))) - 25.4*25.55*(y(4)/(20+y(4)));
 
 
   if y(5) >  2*10^(-10)
      dy(5)= 25.4*25.55*(y(4)/(20+y(4))) -1.5789*10^(-10)
   else
       dy(5) = 25.4*25.55*(y(4)/(20+y(4)))
   end
   
   if y(5) > 0.0005 
        if y(6) > 1.6*10^11
            dy(6)=0
        else
            dy(6) = 5*10^6
        end
   else
        dy(6) = 0
   end
 
end


MATLAB output:

The rate at which DCA is removed in solution:

DCAcominin1.png

Graph 1: The blue line represents how the concentration of DCA in solution decreases due to the action of our DCA degraders. The red line represents the intracellular concentions of the metabolites (disregard in this graph). One can see that an initial concentration of 2E8 cells/mL completely removes the DCA with a concentration 1mM in (roughly) 150mins.

The Rate at which the intracellular concentration of the metabolites change over time:

Intermediates111.png

Graph 2: Each line represents the concentration of each of the metabolites . This graph is simply a rescaling of graph 1. Note: the glycolate won’t accumulate in the cell – it is metabolised – the model had glycolate as the final product. It is used to show that the presence of glycolate can attribute to cell growth.

Rescaling the graph once again: the rate at which the metabolic intermediate change over time.

Thismessagewasbroughttoyoubuygoontheproudsponserofthismodel.png

Graph 3: Each line represents the concentration of each of the metabolites . This graph is simply a rescaling of graph 1 and 2.


The rate at which the cells grow over time:

Cellscellscelllls.png

Graph 4: the blue line represents the linear increase of cells due to the presence of intracellular glycolate.

Rescaling Shows a lag effect on cell growth:

Cellscellscelllllllllllls.png


References:

[1] Krooshof, G. H., I. S. Ridder, et al. (1998). "Kinetic Analysis and X-ray Structure of Haloalkane Dehalogenase with a Modified Halide-Binding Site†." Biochemistry 37(43): 15013-15023.

[2] Janecki, D. J., K. G. Bemis, et al. (2007). "A multiple reaction monitoring method for absolute quantification of the human liver alcohol dehydrogenase ADH1C1 isoenzyme." Analytical Biochemistry 369(1): 18-26.

[3] Pandey, A. V. and C. E. Flück (2013). "NADPH P450 oxidoreductase: Structure, function, and pathology of diseases." Pharmacology & Therapeutics 138(2): 229-254.

[4] van der Ploeg, J., Shmidt, M. P., Landa, A. S., and Janssen, D. B. (1994). "Identification of Chloroacetaldehyde Dehydrogenase Involved in 1,2-Dichloroethane Degradation." Applied Environmental Microbiology (60(5): 1699-1605.

[5] van der Ploeg, J., van Hall, G., Janssen, D. B. (1991) "Characterization of the haloacid dehalogenase from Xanthobacter autotrophicus GJ10 and sequencing of the dhlB gene." Journal of Bacteriology 173(24):7925-33.

[6] Sinensky, Mi “Homeoviscous Adaption – A Homeostatic Process that Regulates the Viscosity of Membrane Lipids in Escheria coli” Proceedings from the National Academy of Science 71(2): 522-525.

[7] CyberCell Database


With thanks to: