Guest Posted June 2, 2010 Report Share Posted June 2, 2010 All the 7! = 5040 distinct permutations of the positive integer 1234567, including itself, are arranged in accordance with ascending order of magnitude. Determine the 2010th number in the above arrangement. Quote Link to comment Share on other sites More sharing options...
0 Guest Posted June 2, 2010 Report Share Posted June 2, 2010 (edited) 1234567 = n(1) 1324567 = n(2) ... xxxxxxx = n(2010) ... 7564321 = n(5039) 7654321 = n(5040) If this is right I'm sure I'll eventually figure it out but I have to clean up and go to work(stupid work). Straight guessing from the obvious eventual pattern. It should be between 3576421 and 4123567. All the 7! = 5040 distinct permutations of the positive integer 1234567, including itself, are arranged in accordance with ascending order of magnitude. Determine the 2010th number in the above arrangement. Edited June 2, 2010 by PVRoot Quote Link to comment Share on other sites More sharing options...
0 Guest Posted June 2, 2010 Report Share Posted June 2, 2010 (edited) 1234567 = n(1) 1324567 = n(2) ... xxxxxxx = n(2010) ... 7564321 = n(5039) 7654321 = n(5040) If this is right I'm sure I'll eventually figure it out but I have to clean up and go to work(stupid work). Straight guessing from the obvious eventual pattern. It should be between 34xxxx and 43xxxx. Actually: n(1)=1234567 n(2)=1234576 n(3)=1234657 n(4)=1234675 I gotta get to sleep so I might come back and take a jab at this later as well, wanna race? Edited June 2, 2010 by Anza Power Quote Link to comment Share on other sites More sharing options...
0 Guest Posted June 2, 2010 Report Share Posted June 2, 2010 Wait a second actually this doesn't take much thinking at all... The answer is 1... The reason for this is the 2010th number is actually the first number of the 288th permutation, according to how the numbers are arranged the first 720 (6!) permutation are 1###### (with ###### being all permutation for 234567) Quote Link to comment Share on other sites More sharing options...
0 superprismatic Posted June 2, 2010 Report Share Posted June 2, 2010 We count the permutations using the following table: perms starting with Number Cumulative 1 720 720 2 720 1440 31 120 1560 32 120 1680 34 120 1800 35 120 1920 361 24 1944 362 24 1968 364 24 1992 3651 6 1998 3652 6 2004 3654 6 2010 So, it's the last permutation starting with 3654. That would be 3654721. Quote Link to comment Share on other sites More sharing options...
0 Guest Posted June 2, 2010 Report Share Posted June 2, 2010 We count the permutations using the following table: perms starting with Number Cumulative 1 720 720 2 720 1440 31 120 1560 32 120 1680 34 120 1800 35 120 1920 361 24 1944 362 24 1968 364 24 1992 3651 6 1998 3652 6 2004 3654 6 2010 So, it's the last permutation starting with 3654. That would be 3654721. Well my first guess was close I'd have gotten there. Quote Link to comment Share on other sites More sharing options...
0 Guest Posted June 3, 2010 Report Share Posted June 3, 2010 2010 = (2*6!) + (4*5!) + (3*4!) + (3*3!) Hence no. is 3654127 Quote Link to comment Share on other sites More sharing options...
0 Guest Posted June 3, 2010 Report Share Posted June 3, 2010 Wait is it the 2010th permutation or the 2010th digit if you put all the permutations one alongside the other in a string? Quote Link to comment Share on other sites More sharing options...
0 Guest Posted June 3, 2010 Report Share Posted June 3, 2010 Wait is it the 2010th permutation or the 2010th digit if you put all the permutations one alongside the other in a string? It is the 2010th permutation and, not the 2010th digit, if all the permutations are placed one alongside the other in a string. Quote Link to comment Share on other sites More sharing options...
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All the 7! = 5040 distinct permutations of the positive integer 1234567, including itself, are arranged in accordance with ascending order of magnitude.
Determine the 2010th number in the above arrangement.
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