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Instantaneous Mixing Driven Reactions. Inspiration for this Chapter Comes From In this paper the authors develop the theory we will learn here, which.

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Presentation on theme: "Instantaneous Mixing Driven Reactions. Inspiration for this Chapter Comes From In this paper the authors develop the theory we will learn here, which."— Presentation transcript:

1 Instantaneous Mixing Driven Reactions

2 Inspiration for this Chapter Comes From In this paper the authors develop the theory we will learn here, which is formally correct. They then study a case where they show that it fails, which we will also explore in a later chapter. While they highlight the failure, there are many instances where the model will work excellently and so should be considered as important.

3  A and B react irreversibly with one another to form some product C  Typically reactions occur at some rate (i.e. A and B have to be in contact for some time to produce C). If this rate is very fast relative to anything else in the system, then we say it can be treated as INSTANTANEOUS – that is any time A and B come into contact they immediately form C – or alternatively A and B cannot coexist at a given point in space and time  Question: How might you determine that this condition of very fast reactions holds?

4 3 equations, 4 unknowns… Problem? Do we have another constraint? Yes – what is it?

5  In general we do not know how to solve ADRE. However can we rewrite our equations in such a way as to write them in a form that we can solve (i.e. can we define some conservative component)  Consider the following three

6  Conservative ADE equation  Using any of the methods we have learned so far we can solve for any of these under any reasonable initial and boundary conditions – But does this help us at all?

7  Let’s ignore the first conservative component for this problem (we will find it useful in the next chapter though) and focus on the latter two  As noted, we can solve for both of these using any of the methods we have learned so far.  Now recall, A and B cannot coexist, which means C A =0 or C B =0 everywhere and anywhere in the domain.

8  If u A >u B => C B =0 (or u B =C C )  If u B >u A => C A =0 (or u A =C C )  Therefore C C =min(u A,u B )  We can solve for the reactant C using only conservative information!!!

9 Initial Conditions Infinite Domain System Solve for C C

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