# Calculating unique value from given numbers

Let's say I have some 6 random numbers and I want to calculate some unique value from these numbers.

Edit: Allowed operations are +, -, *, and /. Every number could be used only once. You dont have to use all numbers.

Example:

``````Given numbers: 3, 6, 100, 50, 25, 75
Requested result: 953

3 + 6 = 9
9 * 100 = 900
900 + 50 = 950
75 / 25 = 3
3 + 950 = 953
``````

What could be easiest algorithmic approach to write a program that solves this problem?

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So you're allowed to reuse numbers? –  jozefg Dec 31 '12 at 15:10
@jozefg It doesn't seem to reuse the numbers. ((3+6)*100)+50)+75/25=953. –  ntalbs Dec 31 '12 at 15:11
What operations are allowed on the numbers? Just `+`, `-`, `*`, and `/`, or things like power (e.g., 3^6), roots, even concatenation (36)? –  Ted Hopp Dec 31 '12 at 15:12
Oh I forgot to specify it. Every number could use only once. Allowed operations: +, -, *, and / –  Rckt Dec 31 '12 at 15:12
Are you going on countdown in the near future? –  diolemo Dec 31 '12 at 15:18

The easiest approach is to try them all: you have six numbers, meaning that there are up to five spots where you can place an operator, and up to `6!` permutations. Given that there are only four operators, you need to go through `6!*4^5`, or 737280 possibilities. This can be easily done with a recursive function, or even with nested loops. Depending on the language, you could use a library function to deal with permutations.

A language-agnostic recursive approach would have you define three functions:

``````int calc(int nums[6], int ops[5], int countNums) {
// Calculate the results for a given sequence of numbers
// with the specified operators.
// nums are your numbers; only countNums need to be used
// ops are your operators; only countNums-1 need to be used
// countNums is the number of items to use; it must be from 1 to 6
}

void permutations(int nums[6], int perm[6], int pos) {
// Produces all permutations of the original numbers
// nums are the original numbers
// perm, 0 through pos, is the indexes of nums used in the permutation so far
// pos, is the number of perm items filled so far
}

void solveRecursive(int numPerm[6], int permLen, int ops[5], int pos) {
// Tries all combinations of operations on the given permutation.
// numPermis the permutation of the original numbers
// permLen is the number of items used in the permutation
// ops 0 through pos are operators to be placed between elements
// of the permutation
// pos is the number of operators provided so far.
}
``````
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not exactly: he doesn't want to use the numbers in that particular order, but to use them all. This add multiple cases (first choose 1 number, then choose an operator, compute. then choose 1 amongst remaining numbers, choose an operator, compute. etc) –  Olivier Dulac Dec 31 '12 at 15:13
@OlivierDulac Thanks - I did not see the edit. –  dasblinkenlight Dec 31 '12 at 15:18

The easiest algorithmic approach would, I think, be backtracking. It's fairly easy to implement and will always find a solution if one exists. The basic idea is recursive: make an arbitrary choice at each step of building a solution and proceed from there. If it doesn't work out, try a different choice. When you run out of choices, report failure to the previous choice point (or report failure to find a solution if there is no previous choice point).

Your choices are: how many numbers will be involved, what each number is (a choice each number position), and how they are connected by operators (a choice for each operator position).

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When you mention "unique numbers", assuming that you mean a result in the possible universe of results generated using all the numbers at hand.

If so, why not try a permutation of all operators and available numbers for a start?

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If you want to guarantee that you generate a unique number from those numbers, with no chance of getting the same number from a different set of numbers, then you should use radix arithmetic, similar to decimal, hex, etc.

But you need to know the max values of the numbers.

Basically, it would be `A + B * MAX_A + C * MAX_A * MAX_B + D * MAX_A * MAX_B * MAX_C + E * MAX_A * MAX_B * MAX_C * MAX_D + F * MAX_A * ... * MAX_E`

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use recursion to permutate the numbers and operators. it's O(6!*4^5)

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