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If there are certain numbers x0 and xn+1 , and if xi is an integer for 0 <= i <= n+1, how to calculate the sum of the numbers with JAVA?

The sum indicates that it takes the sum of f(x1,x2,...xn) for every possible combination of (x1,x2,...xn) such that the inequality holds. The inequality is x0 < x1 < x2 < ... < xn+1

I have an idea for the solution, but it is a terribly ineffective algorithm using binary, and it's O(2n). Of course, I cannot use "for" because it must be used for n (non-specific) times.

for example,

if given is x1 = 1, and xn+1 is x3 = 5, then the possible combinations are

  • x1=1, x2=2, x3=5
  • x1=1, x2=3, x3=5
  • x1=1, x2=4, x3=5

the sum should calculate sum for all these 3 possible value set.

Is there anyone who knows more effective algorithm for this?

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closed as unclear what you're asking by R.J, sᴜʀᴇsʜ ᴀᴛᴛᴀ, Carsten, bensiu, ppeterka Oct 1 '13 at 8:29

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4  
-1 for the title. –  sᴜʀᴇsʜ ᴀᴛᴛᴀ Sep 30 '13 at 10:51
    
Could you explain a little more what this algorithm is supposed to do. Perhaps in sudo code. Or paragraphs –  Richard Tingle Sep 30 '13 at 10:52
    
And what does "sum(x_0<x_1<…x_n<x_n+1) f(x_1,x_2,…x_n)?" mean, its not any sum i've ever encountered –  Richard Tingle Sep 30 '13 at 10:53
    
not fun here its stackoverflow –  Sitansu Sep 30 '13 at 10:56
    
This algorithm is supposed to calculate the sum of the value of function f with n variables x_1,x_2,x_3,...x_n for all possible combination of these variables when they satisfy the condition that x_0<x_1<...x_n<x_(n+1). –  Aran Komatsuzaki Sep 30 '13 at 10:57

1 Answer 1

up vote 1 down vote accepted

The way to solve this is to think of it as an attempt to find all combinations of n numbers between min and max. Adding them up as you go

You can imagine n stones on a number line between min and max, then moving the furthest right stone until it is at max, when it is you move the next furthest right stone up one place and move all stones to its right.

See this example where n=4, min=2 and max=11

enter image description here

This algorithm will ensure you get all combinations.

So with that algorithm in mind you could write functions

boolean[] getNextCombinations(boolean[] currentCombination) //which would advance to the next value (and probably return null when there are no more combinations)

and

int scoreCombinations(boolean[] currentCombination, int min, int max) //which would add up a particular combination
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Thank you. Your graph helped me a lot to get how I should design the program. That's far faster than mine, so I don't have any problem now. –  Aran Komatsuzaki Sep 30 '13 at 11:57
    
Awesome, glad I could help –  Richard Tingle Sep 30 '13 at 11:58

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