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Jadhav Division Axiom

Revision as of 15:46, 14 February 2025 by Charking (talk | contribs) (Formatting)

Jadhav Division Axiom is a method of predicting the number of digits before decimal point in a common fraction, derived by Jyotiraditya Jadhav

Statement

For any fraction $\frac{m}{n}$, where $n \cdot 10^{k-1} < m < n \cdot 10^{k}$, when expressed as a decimal, there are $k$ digits after the decimal point.

Uses

  • All types of division processes
  • Can be used to correctly predict the nature of the answer for long division processes.
  • Can be used to determine the sin and cosine functions of extreme angles

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