Lest Count to 30 000
- Tyrael
- Thread is marked as Resolved.
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2537
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2538
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100111101011
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MMDXL
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2541
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zweitausendfünfhundertzweiundvierzig
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9EF
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MMDXLIV
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100111110001 ( base 2 ) or 10111021 ( base 3 ) or 213301 ( base 4 ) or 40140 ( base 5 ) or 15441 ( base 6 ) or
10264 ( base 7 ) or 4761 ( base 8 ) or 3437 ( base 9 ) or 2545 ( base 10 ) or 1A04 ( base 11 ) or
1581 ( base 12 ) or 120A ( base 13 ) or CDB ( base 14 ) or B4A ( base 15 ) or 9F1 ( base 16 ) or
8DC ( base 17 ) or 7F7 ( base 18 ) or 70I ( base 19 ) or 675 ( base 20 ) or 5G4 ( base 21 ) or
55F ( base 22 ) or 4IF ( base 23 ) or 4A1 ( base 24 ) or 41K ( base 25 ) or 3JN ( base 26 ) or
3D7 ( base 27 ) or 36P ( base 28 ) or 30M ( base 29 ) or 2OP ( base 30 ) or 2K3 ( base 31 ) or
2FH ( base 32 ) or 2B4 ( base 33 ) or 26T ( base 34 ) or 22P ( base 35 ) or 1YP ( base 36 ) or
1VT ( base 37 ) or 1Sb ( base 38 ) or 1QA ( base 39 ) or 1NP ( base 40 ) or 1L3 ( base 41 ) or
1IP ( base 42 ) or 1G8 ( base 43 ) or 1Db ( base 44 ) or 1BP ( base 45 ) or 19F ( base 46 ) or
177 ( base 47 ) or 151 ( base 48 ) or 12k ( base 49 ) or 10j ( base 50 ) or nk ( base 51 ) or
mn ( base 52 ) or m1 ( base 53 ) or l7 ( base 54 ) or kF ( base 55 ) or jP ( base 56 ) or
ib ( base 57 ) or hp ( base 58 ) or h8 ( base 59 ) or gP ( base 60 ) or fi ( base 61 ) or
f3 ( base 62 )[SIZE=1](set of used digits (in sequence): {'0', '1', '2', '3', '4', '5', '6', '7', '8', '9','A', 'B', 'C', 'D', 'E', 'F', 'G', 'H', 'I', 'J', 'K', 'L', 'M', 'N', 'O', 'P', 'Q',
'R', 'S', 'T', 'U', 'V', 'W', 'X', 'Y', 'Z', 'a', 'b', 'c', 'd', 'e', 'f', 'g', 'h', 'i', 'j', 'k', 'l', 'm', 'n', 'o', 'p', 'q', 'r', 's', 't', 'u', 'v', 'w', 'x', 'y', 'z'})[/SIZE]Prime factorization of 2545: 5 * 509
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2546
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2547
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2548
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MMDIL
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MMDL
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2551
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2552
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2553
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QuoteDisplay More
Originally posted by DC_Hägar
100111110001 ( base 2 ) or 10111021 ( base 3 ) or 213301 ( base 4 ) or 40140 ( base 5 ) or 15441 ( base 6 ) or
10264 ( base 7 ) or 4761 ( base 8 ) or 3437 ( base 9 ) or 2545 ( base 10 ) or 1A04 ( base 11 ) or
1581 ( base 12 ) or 120A ( base 13 ) or CDB ( base 14 ) or B4A ( base 15 ) or 9F1 ( base 16 ) or
8DC ( base 17 ) or 7F7 ( base 18 ) or 70I ( base 19 ) or 675 ( base 20 ) or 5G4 ( base 21 ) or
55F ( base 22 ) or 4IF ( base 23 ) or 4A1 ( base 24 ) or 41K ( base 25 ) or 3JN ( base 26 ) or
3D7 ( base 27 ) or 36P ( base 28 ) or 30M ( base 29 ) or 2OP ( base 30 ) or 2K3 ( base 31 ) or
2FH ( base 32 ) or 2B4 ( base 33 ) or 26T ( base 34 ) or 22P ( base 35 ) or 1YP ( base 36 ) or
1VT ( base 37 ) or 1Sb ( base 38 ) or 1QA ( base 39 ) or 1NP ( base 40 ) or 1L3 ( base 41 ) or
1IP ( base 42 ) or 1G8 ( base 43 ) or 1Db ( base 44 ) or 1BP ( base 45 ) or 19F ( base 46 ) or
177 ( base 47 ) or 151 ( base 48 ) or 12k ( base 49 ) or 10j ( base 50 ) or nk ( base 51 ) or
mn ( base 52 ) or m1 ( base 53 ) or l7 ( base 54 ) or kF ( base 55 ) or jP ( base 56 ) or
ib ( base 57 ) or hp ( base 58 ) or h8 ( base 59 ) or gP ( base 60 ) or fi ( base 61 ) or
f3 ( base 62 )[SIZE=1](set of used digits (in sequence): {'0', '1', '2', '3', '4', '5', '6', '7', '8', '9','A', 'B', 'C', 'D', 'E', 'F', 'G', 'H', 'I', 'J', 'K', 'L', 'M', 'N', 'O', 'P', 'Q',
'R', 'S', 'T', 'U', 'V', 'W', 'X', 'Y', 'Z', 'a', 'b', 'c', 'd', 'e', 'f', 'g', 'h', 'i', 'j', 'k', 'l', 'm', 'n', 'o', 'p', 'q', 'r', 's', 't', 'u', 'v', 'w', 'x', 'y', 'z'})[/SIZE]Prime factorization of 2545: 5 * 509
Someone sure has been bored...
2554
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not really, i just have used some software for generating that list, see:
100111111011 ( base 2 ) or 10111122 ( base 3 ) or 213323 ( base 4 ) or 40210 ( base 5 ) or 15455 ( base 6 ) or
10310 ( base 7 ) or 4773 ( base 8 ) or 3448 ( base 9 ) or 2555 ( base 10 ) or 1A13 ( base 11 ) or
158B ( base 12 ) or 1217 ( base 13 ) or D07 ( base 14 ) or B55 ( base 15 ) or 9FB ( base 16 ) or
8E5 ( base 17 ) or 7FH ( base 18 ) or 719 ( base 19 ) or 67F ( base 20 ) or 5GE ( base 21 ) or
563 ( base 22 ) or 4J2 ( base 23 ) or 4AB ( base 24 ) or 425 ( base 25 ) or 3K7 ( base 26 ) or
3DH ( base 27 ) or 377 ( base 28 ) or 313 ( base 29 ) or 2P5 ( base 30 ) or 2KD ( base 31 ) or
2FR ( base 32 ) or 2BE ( base 33 ) or 275 ( base 34 ) or 230 ( base 35 ) or 1YZ ( base 36 ) or
1W2 ( base 37 ) or 1T9 ( base 38 ) or 1QK ( base 39 ) or 1NZ ( base 40 ) or 1LD ( base 41 ) or
1IZ ( base 42 ) or 1GI ( base 43 ) or 1E3 ( base 44 ) or 1BZ ( base 45 ) or 19P ( base 46 ) or
17H ( base 47 ) or 15B ( base 48 ) or 137 ( base 49 ) or 115 ( base 50 ) or o5 ( base 51 ) or
n7 ( base 52 ) or mB ( base 53 ) or lH ( base 54 ) or kP ( base 55 ) or jZ ( base 56 ) or
il ( base 57 ) or i3 ( base 58 ) or hI ( base 59 ) or gZ ( base 60 ) or fs ( base 61 ) or
fD ( base 62 )[SIZE=1](set of used digits (in sequence): {'0', '1', '2', '3', '4', '5', '6', '7', '8', '9','A', 'B', 'C', 'D', 'E', 'F', 'G', 'H', 'I', 'J', 'K', 'L', 'M', 'N', 'O', 'P', 'Q',
'R', 'S', 'T', 'U', 'V', 'W', 'X', 'Y', 'Z', 'a', 'b', 'c', 'd', 'e', 'f', 'g', 'h', 'i', 'j', 'k', 'l', 'm', 'n', 'o', 'p', 'q', 'r', 's', 't', 'u', 'v', 'w', 'x', 'y', 'z'})[/SIZE]Prime factorization of 2555: 5 * 7 * 73
