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I am trying to replicate a functionality of a built-in function, as the built-in functionality is not callable inside scripts, but I can't seem to figure out the how the 3rd parameter is calculated.

Basically you specify a and b and it returns c. So here is the result of some operations:

a   b   c

1   1   1
1   2   0.75
1   3   0.666667
1   4   0.625
1   5   0.6

2   1   0.75
2   2   0.5
2   3   0.416667
2   4   0.375
2   5   0.35
2   6   0.333333
2   7   0.321429
2   8   0.3125
2   9   0.305556
2   10  0.3

3   1   0.666667
3   2   0.416667
3   3   0.333333

4   1   0.625
4   2   0.375
4   3   0.291667
4   4   0.25

100 1   0.505
100 2   0.255
100 3   0.171667
100 10  0.055

Let me know if you need additional outputs.

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  • Do you know whether this function is recursive or not?
    – seeker
    Aug 25, 2012 at 13:21
  • 2
    And it seems that a,b is the same as b,a - so 1,3=>0.66 as well as 3,1. That is a good hint. Aug 25, 2012 at 13:22
  • 1
    Thanks guys, the function is unfortunately called "initialize" :O
    – Joan Venge
    Aug 25, 2012 at 13:22
  • 2
    I have found one more if f(a,b)=x then f(2a,2b)=x/2
    – seeker
    Aug 25, 2012 at 13:25
  • 1
    I will try to interpolate it.
    – seeker
    Aug 25, 2012 at 13:29

1 Answer 1

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For all of your sample the following formula provides the expected result:

C = (A + B) / (2 * A * B)

As ypercube pointed out in the comments this formula is the inverse of the Harmonic mean or the arithmetic mean of the inverses.

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  • Thanks a lot, let me try it out :O
    – Joan Venge
    Aug 25, 2012 at 13:30
  • Nice! How did you figure that out? Aug 25, 2012 at 13:30
  • @YoryeNathan, convert the decimal numbers into natural fractions and you can see patterns emerging.
    – Dai
    Aug 25, 2012 at 13:32
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    Nothing scientific, I've looked at the values and did some fiddling in excel. For the complete picture I've a Bsc in Compute science so I've learned enough math :)
    – nemesv
    Aug 25, 2012 at 13:32
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    Yep, this is the inverse of the Harmonic mean. Or the harmonic mean of the inverses. Aug 25, 2012 at 13:38

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