Equilibrium between release and decay Kr-85

AI Thread Summary
The discussion revolves around calculating the mass of Kr-85 in the atmosphere needed to reach equilibrium with a daily release of 2.0 grams from a power plant. Participants note that at equilibrium, the decay rate must match the release rate, which is 2.0 grams per day. The decay constant (k) and the relationship between activity (A) and the number of atoms (N) are highlighted as crucial for the calculations. The half-life of Kr-85 is mentioned as 10.8 years, which is essential for determining the decay constant. Overall, the conversation emphasizes the need for a formula to relate the decay rate to the mass of Kr-85 in the atmosphere.
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Homework Statement



A power plant releases 2,0 grams of Kr-85 into the atmosphere every day. At some point there's an equilibrium between what the power plant releases into the atmosphere and the decay in the atmosphere -> The decay in atmosphere is equal to 2,0 grams per day

Calculate the mass of Kr-85 in the atmosphere for this to be possible


Homework Equations



I do not have any. Maybe: N = N0*e^-k*t but I am not sure

The Attempt at a Solution



I can't find a solution to this problem at all.

Thank you very much on beforehand!

/Thomas
 
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k is the decay constant, but \lambda is conventionally used.

So in equilibrium, the production rate matches the decay rate.


The activity (A) is proportional to the number of atoms (N) present by k.

One is actually looking for the mean activity and mean mass, since the problem doesn't state if the release is instantaneous (i.e. a puff) or if it is continuous.
 
Astronuc said:
k is the decay constant, but \lambda is conventionally used.

So in equilibrium, the production rate matches the decay rate.


The activity (A) is proportional to the number of atoms (N) present by k.

One is actually looking for the mean activity and mean mass, since the problem doesn't state if the release is instantaneous (i.e. a puff) or if it is continuous.

It is a continuous stream/release

I thought this: I know that the half-life is 10,8 years. I need to find a mass that enables the Kr-85 decay to release 2 grams/day. There must be an equation since it's impossible for me to calculate it since the half-life is an eks. function.

I know the formula and what it means, but I am not sure wheter it is the right one to use, and if I've got the rigt infos. to just plot them into the equation.?

Thanks a lot for for your help.
best regards
/Thomas
 
The decay in atmosphere is equal to 2,0 grams per day
That is an average activity, so convert 2.0 grams to number of atoms Nd decaying, and the mean activity A (decay rate) is simply Nd/time.

Then A/k = N, where k is the decay constant and N is the number of atoms present for that decay rate.

See where that takes one.
 

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