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base 3 and log base 4 respectively. In Satkhandagama various sets are operated upon by logarithmic functions
to base two, by squaring and extracting square roots, and by raising to finite or infinite powers. The operations are repeated
to produce new sets. In other works the relation of the number of combinations to the coefficients occurring in the binomial
expansion is noted.
Since Jain epistemology allowed for a degree of indeterminacy in describing reality, it probably helped in grappling with
indeterminate equations and finding numerical approximations to irrational numbers.
Buddhist literature also demonstrates an awareness of indeterminate and infinite numbers. Buddhist mathematics was classified
either as Garna (Simple Mathematics) or Sankhyan (Higher Mathematics). Numbers were deemed to be of three types: Sankheya
(countable), Asankheya (uncountable) and Anant (infinite).
Philosophical formulations concerning Shunya - i.e. emptiness or the void may have facilitated in the introduction of the
concept of zero. While the zero (bindu) as an empty place holder in the place-value numeral system appears much earlier,
algebraic definitions of the zero and it's relationship to mathematical functions appear in the mathematical treatises
of Brahmagupta in the 7th C AD. Although scholars are divided about how early the symbol for zero came to be used in
numeric notation in India, (Ifrah arguing that the use of zero is already implied in Aryabhatta) tangible evidence for
the use of the zero begins to proliferate towards the end of the Gupta period. Between the 7th C and the 11th C,
Indian numerals developed into their modern form, and along with the symbols denoting various mathematical functions
(such as plus, minus, square root etc) eventually became the foundation stones of modern mathematical notation.
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