perplexus.info :: Numbers : Super Ken

Super Ken (Posted on 2011-03-03)

The numbers 1 through 25 are arranged in a 5x5 array.

The product of the numbers in the first row is 483840.
The product of the numbers in the second row is 604032.
The product of the numbers in the third row is 90440.
The product of the numbers in the fourth row is 57960.

The product of the numbers in the first column is 193375.
The product of the numbers in the second column is 1530144.
The product of the numbers in the third column is 288000.
The product of the numbers in the fourth column is 258552.

What is the arrangement of the array?

Submitted by Charlie

No Rating

Solution: (Hide)

7 24 20 18 8 13 22 16 12 11 17 14 10 19 2 5 23 6 21 4 25 9 15 3 1

The first step in solving was to divide 25! = 15511210043330985984000000 by all of the first four row products to get the last row product as 10125, and to divide 25! by all of the four column products to get the last column product, 704.
Then factor each of the row and column products into primes:
483840=2⁹*3³*5*7
604032=2⁷*3*11²*13
90440=2³*5*7*17*19
57960=2³*3²*5*7*23
10125=3⁴*5³
193375=5³*7*13*17
1530144=2⁵*3³*7*11*23
288000=2⁸*3²*5³
258552=2³*3⁵*7*19
704=2⁶*11
The primes 17, 19 and 23 are the easiest to place, at the intersections of the rows and columns containing those factors.
The factor 11 can appear only twice: once as 11 and once in 22, so both appearances must be in row two: one in column 2 and one in column 5.
Once the factor 11 in the final column is used for either 11 or 22, what remains of 704 is 2⁶. If one of the six factors of 2 in the final column were used to combine with the 11 to produce 22, there wouldn't be enough factors of 2 remaining to make four different other numbers for the other rows in that column, so the 22 is in column 2 and the 11 in column 5, while the remaining numbers in column 5 are all powers of 2, the powers being 0,1,2,3, making the numbers in that column 1, 2, 4, 8 besides the 11 already mentioned.
Row 2 now has 13, 11 and 22, leaving 2⁶*3. This can only be divided up as 16*12 as any other factorization would leave a power of two that's larger than 25 or one that's already been assigned to column 5, so 16 and 12 are the remaining numbers in row 2, and only column 3 has a high enough power of 2 to allow 16, so that's the column that gets the 16 and the 12 goes into column 4.
Similar reasoning fills out the remainder of the array, such as recognizing that 5, 7 and 25 must be in the first column, and starting with the placement of 1, 15 and 25 in their respective spots on the last row, noticing that 14 must be in the middle row, and 9 and 3 in the bottom row, etc. When I did it, 24 and 18 were among the last four numbers to be placed, by looking for places they'd fit.
Based on Enigma No. 1625, "Diagonal diversion", by Gwyn Owen, New Scientist, 11 December 2010, page 28.

Comments: ( You must be logged in to post comments.)

Subject	Author	Date
Solution	Dej Mar	2011-03-04 17:14:31
solution (no explanation)	Justin	2011-03-04 10:10:53

Please log in:

Login:
Password:
Remember me:

Sign up! \| Forgot password

Search:

Search body:

Forums (0)
Newest Problems
Random Problem
FAQ | About This Site
Site Statistics
New Comments (6)
Unsolved Problems
Top Rated Problems
This month's top
Most Commented On

Chatterbox:


perplexus dot info