The symbols could be made either with the pointed or the circular end (hence curvilinear writing) of the stylus, and for numbers up to 60 these symbols were used in the same way as the hieroglyphs, except that a subtractive symbol was also used. Because the pressure of the stylus gave a wedge-shaped symbol, the inscriptions are known as cuneiform, from the Latin cuneus (“wedge”) and forma (“shape”). The intermediate numbers are then formed by addition, each symbol being repeated the required number of times, just as 23 is written XXIII in Roman numerals.Īround Babylon, clay was abundant, and the people impressed their symbols in damp clay tablets before drying them in the sun or in a kiln, thus forming documents that were practically as permanent as stone. In its pure form a simple grouping system is an assignment of special names to the small numbers, the base b, and its powers b 2, b 3, and so on, up to a power b k large enough to represent all numbers actually required in use. Sometimes this happened in a very unsystematic fashion for example, the Yukaghirs of Siberia counted, “one, two, three, three and one, five, two threes, two threes and one, two fours, ten with one missing, ten.” Usually, however, a more regular system resulted, and most of these systems can be classified, at least roughly, according to the logical principles underlying them. As life became more complicated, the need for group numbers became apparent, and it was only a small step from the simple system with names only for one and ten to the further naming of other special numbers. It appears that the primitive numerals were |, ||, |||, and so on, as found in Egypt and the Grecian lands, or ―, =, ≡, and so on, as found in early records in East Asia, each going as far as the simple needs of people required.
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