Application of Continued Fraction in Pell's Equation

Bal Bahadur Tamang
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Abstract

This paper uses a continued fraction to explain various approaches to solving Diophantine equations. It first examines the fundamental characteristics of continued fractions, such as convergent and approximations to real numbers. Using continued fractions, we can solve the Pell's equation. Certain theorems have also been discussed for how to expand quadratic irrational integers into periodic continued fractions. Finally, the relationship between convergent and best approximations and use of continuous fraction in calendar construction has-been investigated. The analytical theory of continued fractions is a significant generalization of continued fractions and represents a large field for current and future research.
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连分式在Pell方程中的应用
本文使用连分式来解释求解丢番图方程的各种方法。它首先考察了连分式的基本特征,如收敛性和实数逼近性。利用连分式,我们可以解出佩尔方程。讨论了如何将二次无理数展开为周期连分数的若干定理。最后,讨论了收敛逼近与最佳逼近之间的关系以及连续分数在日历构造中的应用。连分式的解析理论是对连分式的重要推广,是当前和未来研究的一个广阔领域。
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