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It's only semi autobiographical
Saturday, September 11, 2004
TEN is a number one greater than a perfect square divisable by 9.
NINETY is divisible by nine.
TEN and NINETY have SIX perfect squares between them.
If each capital letter above represents a different digit, i.e no two letters are the same digit, then what number should be SENT.
If anyone can get this right, I will be very impressed. The winner will get rare and genuine... respect I guess. Also rights to some of my crisps, sweets or drink at any time of their choosing. And if you find a simpler way than mine, I'll buy you a drink or three.
Comments:
Hi Rich,
Hope you're having a nice holiday.
I got:
TEN = 901
NINETY = 151092
SIX = 358
SENT = 3019
Solution in brief:
3 digit square numbers:
100 (two similar digits)
145
226 (two similar digits)
325
442 (two similar digits)
577 (two similar digits)
720 (N can't be 0 since NINETY would then be 0xxxxx)
901
So 145, 325, 901 are possibilities. Giving NINETY as one of either 5i541y, 5i523y or 1i109y respectively.
At this point I cheated slightly and wrote a script to count the number of squares between the 3 digit number TEN and each possibility for NINETY which was divisible by 9.
I look forward to my free drink :)
Ciao,
James. (ma3jof)
Hope you're having a nice holiday.
I got:
TEN = 901
NINETY = 151092
SIX = 358
SENT = 3019
Solution in brief:
3 digit square numbers:
100 (two similar digits)
145
226 (two similar digits)
325
442 (two similar digits)
577 (two similar digits)
720 (N can't be 0 since NINETY would then be 0xxxxx)
901
So 145, 325, 901 are possibilities. Giving NINETY as one of either 5i541y, 5i523y or 1i109y respectively.
At this point I cheated slightly and wrote a script to count the number of squares between the 3 digit number TEN and each possibility for NINETY which was divisible by 9.
I look forward to my free drink :)
Ciao,
James. (ma3jof)
Just to clarify, the 3 digit squares listed are the square+1 numbers, where square is a square divisible by 9.
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