Copyright © Philip M. Parker, INSEAD. Terms of Use.
Definition: ARITHMETICAL COMPLIMENT OF A LOGARITHM |
ARITHMETICAL COMPLIMENT OF A LOGARITHM1. See under Logarithm . |
Hexadecimal (or equivalents, 770AD-1900s) (references)41 52 49 54 48 4D 45 54 49 43 41 4C 43 4F 4D 50 4C 49 4D 45 4E 54 4F 46 41 4C 4F 47 41 52 49 54 48 4D |
| Leonardo da Vinci (1452-1519; backwards) (references)
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Binary Code (1918-1938, probably earlier) (references)01000001 01010010 01001001 01010100 01001000 01001101 01000101 01010100 01001001 01000011 01000001 01001100 00100000 01000011 01001111 01001101 01010000 01001100 01001001 01001101 01000101 01001110 01010100 00100000 01001111 01000110 00100000 01000001 00100000 01001100 01001111 01000111 01000001 01010010 01001001 01010100 01001000 01001101 |
HTML Code (1990) (references)A R I T H M E T I C A L   C O M P L I M E N T   O F   A   L O G A R I T H M |
ISO 10646 (1991-1993) (references)0041 0052 0049 0054 0048 004D 0045 0054 0049 0043 0041 004C 0043 004F 004D 0050 004C 0049 004D 0045 004E 0054 004F 0046 0041 004C 004F 0047 0041 0052 0049 0054 0048 004D |
Encryption (beginner's substitution cypher): (references)355243544247395443373546237494750464347394854249402352464941355243544247 |
| 1. Definition 2. Orthography 3. Bibliography |
Copyright © Philip M. Parker, INSEAD. Terms of Use.
