# Generating all combinations using brute force [closed]

if we have a nxm array...for e.g...if n=3 and m=5

then our array will be of size 3x5 then there will be 15 different positions....we have to place m (5) tasks in different combinations....how much such different combinations can we make..?

i repeat....we have 15 positions according to above mentioned problem in the 2d array....we have to place 5 words in it...how many differnt combinations can we make and how?

plz help me to make a generic approach for a c++ program?

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## closed as not a real question by Cody Gray, Mat, Bill the Lizard♦Apr 24 '12 at 11:55

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If there are m tasks and if they can be done by any of the n persons the total ways of doing this tasks is m^n (since any task can be done by n persons).

Create a recursive function TotalCombinations(m) which gives m-tuples with all the co-ordinates between 1 and n as described below:

• Define TotalCombination(0) as empty set
• Create an tuple - a1,a2,...,am such that 1<=ai<=n for all i
• For am = 1 to n
• Create a new tuple (Total Combinations(m-1),am)
• Next am
• All the tuples of the form (Total Combinations(0),*) will be the combinations that you are looking for.
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can u plz elaborate more...thanks any way..plz elaborate the recursive function..... –  ssaaddii Apr 22 '12 at 11:17
plz note that if we have 15 positions than T1,T2,T3,T4,T5,-,-,-,-,-,-,-,-,-,-,- this can also be a combination....i.e.it is not necessary that all positions are filled...so every possible combination should be dealt...does ur recursive function do this? –  ssaaddii Apr 22 '12 at 11:20
Yes.. what I am essentially doing is creating tuples like (1,2,3,1,1) in the example of 5 tasks and 3 persons. The tuple means that the 1st task is done by 1st person, 2nd by 2nd person, 3rd by 3rd person, 4th and 5th by 1st person again. So I am simply enumerating all the 5-tuples with co-ordinate values between 1 and 3 in our example –  hardikudeshi Apr 22 '12 at 11:25
the tupple u suggested as an example in not right...bcoz in that 1 repeats 3 times....no number should repeat in a single combination...for e.g. this can be a possible combination...T1,-,-,T4,T5,-,-,-,-,T2,-,-T3,-,-,-,- –  ssaaddii Apr 22 '12 at 11:56
the above e.g is a single combination...i have to make all possible combinations of this kind... –  ssaaddii Apr 22 '12 at 11:58