A Note on Few Interesting Approaches of Solving Equations to Find the Number of Real Zeros

Prabir Kumar Paul
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Abstract

Be it in the world of mathematics or real life, it is often rewarding to think out-of-the box while solving a problem. Accordingly, in this paper, our aim is to explore the various alternative approaches for solving algebraic equations and finding the number of real zeros. We will further delve deeper into the conceptual part of mathematics and understand how implementation of simple ideas can lead to an acceptable solution, which otherwise would have been tedious by considering the conventional approaches. In the pursuit of achieving the objective of this paper, we will consider few examples with full solutions coupled with precise explanation. It is also intended to leave something meaningful for the readers to explore further on their own. The fundamental objective of this paper is to emphasize on the importance of application of basic mathematical logic, concept of inequality, concept of domain and range of functions, concept of calculus and last but not the least the graphical approach in solving mathematical equations. As a further clarification on the scope of this paper, it is highly pertinent to bring to the understanding of the readers two important aspects firstly, we will only deal with equations involving real variables; and secondly, this paper does not include topics related to number theory.
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关于求实数零的几个有趣的解方程方法的注释
无论是在数学世界还是在现实生活中,在解决问题时跳出常规思维往往是有益的。因此,在本文中,我们的目的是探索求解代数方程和求实零数的各种替代方法。我们将进一步深入探讨数学的概念部分,并了解如何实现简单的想法可以导致一个可接受的解决方案,否则将是繁琐的考虑传统的方法。为了实现本文的目标,我们将考虑几个具有完整解和精确解释的例子。它也打算为读者留下一些有意义的东西,让他们自己进一步探索。本文的基本目的是强调基本数学逻辑、不等式的概念、函数的定义域和值域的概念、微积分的概念以及最后但并非最不重要的图解方法在求解数学方程中的重要性。为了进一步澄清本文的范围,让读者了解两个重要方面是非常相关的:首先,我们将只处理涉及实变量的方程;其次,本文不包括与数论相关的主题。
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