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Poweranimals
Oct6-04, 10:38 PM
Does anyone know how to use the growth and decay functions? How would any of these be useful in everyday life?
arildno
Oct6-04, 10:49 PM
What do YOU mean with "growth and decay" functions?
Gokul43201
Oct6-04, 10:51 PM
Are you refering to exponential growth and decay ?
Gokul43201
Oct6-04, 10:52 PM
Also, what do you mean by "everyday life" ? My everyday life involves doing physics, so yes, such functions are useful in my everyday life.
Poweranimals
Oct6-04, 10:53 PM
Are you refering to exponential growth and decay ?
Yeah. Sorry for not specifying.
Gokul43201
Oct6-04, 11:16 PM
Is this homework ? I can't imagine that someone would ask you a question like this !

Not only is it ill-defined, it serve any purpose to have someone answer such a question.

If you have a more specific question, ask it.
Poweranimals
Oct6-04, 11:19 PM
Is this homework ? I can't imagine that someone would ask you a question like this !

Not only is it ill-defined, it serve any purpose to have someone answer such a question.

If you have a more specific question, ask it.
This is the Homework helpzone, isn't it? Here is the question: Can you think of a growth or decay function that you encounter in your work or in your personal life? It's for a report I'm doing for College Math. I don't really have anything to go on at the moment.
arildno
Oct6-04, 11:21 PM
Try to look into how banks calculate interests on your money.
Is that "useful" enough?
Poweranimals
Oct6-04, 11:35 PM
Maybe if I had a better understanding how the functions work, it'd be more helpful.
Gokul43201
Oct6-04, 11:37 PM
Simply put, an exponential growth is seen by anything that grows are a steady rate, say, 5% per year, for example.

(Yes, it might seem counter-intuitive that steady and exponential growth are the same thing.)

Exponenetial decay is seen in chemical reactions, radioactivity, electronic circuits, etc. Look these up to see how they apply.

Here are the formulas that describe these :

Growth : A = A_0 r^{(t/T)} + B_0

Decay : A = A_0 r^{-(t/T)} + B_0
vsage
Oct6-04, 11:43 PM
In ideal problems (such as uninhibited population growth) can be modeled by exponential functions as well as interest, the decay of atoms per mol of a substance at a certain time or the concentration of a solution that contains an initial concentration but has flowing water through it. They're all pretty ideal though just to stress that.