Show that the numbers of the form:
444444....4444888888....8889
[Where there are 'k' Fours, '(k-1)' Eights and 'Exactly One' 9],
are always perfect squares.
(For example the sequence of numbers: 49, 4489, 444889, ....etc. and so on are always perfect squares).
I'm not sure exactly how to prove it, but those numbers are squares of 7, 67, 667, 6667, etc.
The 9 comes from the square of 7, then there will as many 8s as there are 6s in the root, and the remaining digits will all be 3s (from 6²=36) with a carryover digit. So, there are as many 4s in the answer as the rest of the digits; ie, the same number as of 8s plus one for the 9.
That's not much of a proof, just a bunch of observations. I have to collect my thoughts.
I just woke up.
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Posted by DJ
on 2003-04-05 05:56:26 |
Umm
