Everything about Subtractive Notation totally explained
Subtractive notation is an early form of
positional notation used with
Roman numerals as a shorthand to replace four or five characters in a
numeral representing a
number with usually just two characters. Using subtractive notation the numeral VIIII becomes simply IX. LXXXXVIII would become IIC, which is invalid in Roman numerals though.
Without subtractive notation, XIV represents the same number as XVI (16 in
Arabic numerals). With the introduction of subtractive notation, XIV (14) no longer represents the same number as XVI but rather is an alternate way of writing XIIII.
By encoding information about the number into the order of the numerals, subtractive notation transformed the Roman numeral system from a variation of a
unary numeral system which used alphabetic characters to represent groupings of
tally marks (a position-independent
counting system). This form of notation closely follows Latin language usage, in which the number 18 is pronounced as
duodeviginti, meaning
two [deducted] from twenty (
duo-de-viginti), and 19 is pronounced
undeviginti, meaning
one [deducted] from twenty (
un-de-viginti).
While simplifying the presentation of numerals, subtractive notation removed from
Roman arithmetic the advantages of a tally system for speedy addition and subtraction without adding the flexibility of later positional notations systems for
mathematics.
The very positive advantage of subtractive notation is the reduction of counters needed on a
abacus, the calculating devices used by the Romans, and those before them for thousands of years. They didn't do arithmetic with their written numerals. They used their numerals only for recording the results of calculations on an abacus. Reduction of counters is also why they used intermediate 5 values, for example V, L, and D. The number of counters needed to represent IIIIIIIII, VIIII, and IX are 9, 5, and 2. Subtractive notation reflected the counter positions on an abacus with positive and negative counters on opposite sides of a median line.
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