Logarithmic distribution

First of all, math is not my area.

Imagine a problem like this:

I have a number of money to spend, say 500, and i need to spend them on a fixed number of days, say 20. I have a fixed maximum of money to spend per day, like 50. I don't need to spend money on a day.

Now i need to know how to calculate the total number of money I have to spend each day to get a spending curve like the following:

My goal is a function that takes a number of money and a number of days, and returns an tuple with day number and ammount of money for that day.

I know i need to use logarithms of some type, and i've tried pretty much everything that my brain can handle. I've been looking at wolfram mathworld and this formula:

y = a + b ln x

But it does not really help me.

An hint or example in PHP, Python or C# would be great, but any language will do.

PLEASE let me know if you need any more information or if the question is vague, I really want to solve this. Thank you!

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The algorithm you're shooting for is vague... if you have a maximum you can spend, then the line will be linear -- starting at 500 and going down 50 each day. (y = 500 - 50x) If you have no minimum, then the formula is simply y = 500 since you are not required to spend at all before the last day. The actual curve will fall somewhere between the two, but without an exact amount you must spend each day, there is really no way to plot this. –  cdhowie Dec 2 '10 at 16:08
you should rather ask this question at math.stackexchange.com –  Andreas Niedermair Dec 2 '10 at 16:20
@cdhowie Yeah I know if it sound vague, this is not my area at all. Is it easier if we say that i need to spend at least 1 money per day? @Andreas Niedermair you're probably right, i did consider that when i posted my question, but since it's in a programming context i decided to go with SO. –  alexn Dec 2 '10 at 16:30
If you need to spend at least 1 then the boundary lines will be y = 500 - 50x and y = 500 - x. You will be left with the area between the lines, which is where the actual spending might be. –  cdhowie Dec 2 '10 at 16:39

Are you sure what you are asking for is not a linear equation? For example y=f(x)=-50x+500 and the total number of days would be x where y=0.

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I don't understand why you want a log distribution. A parabolic one will do to obtain the curve form you want:

spend[day] = a day^2 + c

where:

a -> (6 * (TD - TA)) / (TD *(-1 - 3 * TD + 4 * TD^2))

c -> -((1 + 3 * TD - 6*TA*TD + 2 * TD^2)/ (-1 - 3 * TD + 4 * TD^2))

TA = Total Amount
TD = Total Days

With this the amount you spend the last day is 1.

For your example values: (amt 500, days 20)

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Thank you, i definitely think that's what i want to achieve. Let me try this and come back. –  alexn Dec 2 '10 at 16:29
What plotting library do you use? Looks neat. –  alexn Dec 2 '10 at 16:32
@alexn It's Mathematica, from Wolfram. Nice but expensive :( wolfram.com –  belisarius Dec 2 '10 at 16:35
@alexn: I think Maxima + Gnuplot could achieve similar results. –  cdhowie Dec 2 '10 at 16:40