# how to display all the distinct 7-digit number among 2 to 9?

what i mean is all the numbers _ _ _ _ _ _ _ are distinct and only values 2 to 9 can be entered. I've tried using array and loops but i just couldn't figure out the solution to display all the numbers. examples 7-digit number among 2 to 9 are: 234567 234568 234569

324567 324568 324569

notice the none of the numbers in those values are repeated. I really have no idea what's going on. please help me!

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Is this a homework problem? – Brian Campbell Oct 23 '09 at 3:33
What have you tried so far? – Greg Hewgill Oct 23 '09 at 3:35
The keyword you are looking for is "permutations". – user181548 Oct 23 '09 at 3:36
I love that all your examples of 7-digit numbers have 6 digits... – Cellfish Oct 23 '09 at 3:38
I avoid answering homework question without attempted code. Just don't want to encourage lazy students. And I kind of sense that this one is. Whether this is homework or not, post the code you have tried and we can go from there. I think this will be more useful to you. – NawaMan Oct 23 '09 at 3:41

Since this sounds suspiciously like homework, the education here will be a gradual process. First, try brute force. Here's an algorithm (well, Python really) that will do it:

for n1 in range(2,10):
for n2 in range(2,10):
if n2 != n1:
for n3 in range(2,10):
if n3 != n2 and n3 != n1:
for n4 in range(2,10):
if n4 != n3 and n4 != n2 and n4 != n1:
for n5 in range(2,10):
if n5 != n4 and n5 != n3 and n5 != n2 and n5 != n1:
for n6 in range(2,10):
if n6 != n5 and n6 != n4 and n6 != n3 and n6 != n2 and n6 != n1:
for n7 in range(2,10):
if n7 != n6 and n7 != n5 and n7 != n4 and n7 != n3 and n7 != n2 and n7 != n1:
print "%d%d%d%d%d%d%d"%(n1,n2,n3,n4,n5,n6,n7)


It's basically seven nested loops, one for each digit position, with checks that there's no duplicates at any point. Note that this is not a solution that will scale well for lots of digit positions, but it performs quite well for seven of them. If you want many more, a less brute-force solution would be better.

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thanks for your teaching. i think this works for me.. i'm trying now – keitamike Oct 23 '09 at 3:56
Shouldn't be too hard to do the same thing in C. I don't want to post the C code in case it's homework since you should be doing some of the work :-) – paxdiablo Oct 23 '09 at 4:00
thanks for your answer. it really do help me in my problems. thanks everybody! – keitamike Oct 23 '09 at 4:20

Borrowed from Python's itertools docs.

def permutations(iterable, r=None):
# http://docs.python.org/library/itertools.html#itertools.permutations
pool = tuple(iterable)
n = len(pool)
r = n if r is None else r
if r > n:
return
indices = range(n)
cycles = range(n, n-r, -1)
yield tuple(pool[i] for i in indices[:r])
while n:
for i in reversed(range(r)):
cycles[i] -= 1
if cycles[i] == 0:
indices[i:] = indices[i+1:] + indices[i:i+1]
cycles[i] = n - i
else:
j = cycles[i]
indices[i], indices[-j] = indices[-j], indices[i]
yield tuple(pool[i] for i in indices[:r])
break
else:
return
for number in permutations('23456789',6): # you said 7, but your examples were 6
print number


Edit: Or if you have Python anyways...

import itertools
for number in itertools.permutations('23456789',6): print number

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There are 7!=5040 ways to permute abcdefg.

There are 9C7=36 ways to choose 7 numbers out of 123456789.

Given a permutation "bfgdeac" and a set of {1,3,4,5,6,8,9}, there is a natural way to use the permutation to provide an order for the set, i.e. [3,8,9,5,6,1,4].

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That doesn't really answer the question. – s1n Nov 11 '09 at 7:17

import Control.Monad

selectPerms :: MonadPlus m => [a] -> Int -> m [a]
selectPerms _        0 = return []
selectPerms universe n = do
(digit, remain) <- selectDigit universe
xs <- selectPerms remain (n - 1)
return (digit:xs)

selectDigit :: MonadPlus m => [a] -> m (a, [a])
selectDigit [] = mzero
selectDigit (x:xs) = capture mplus next
where
capture = return (x, xs)
next = do
(digit, remain) <- selectDigit xs
return (digit, x:remain)


Much better (but wordier) than the obvious import Data.List; nub \$ map (take 7) (permutations [1..9]) :) It still reads nicely, though. – ephemient Oct 23 '09 at 3:48
Come now, it's really quite simple! I just select an arbitrary permutation, then use []'s MonadPlus instance to expand that over all possible permutations. Easy! :) – bdonlan Oct 23 '09 at 4:05