A Mathematical Problem Formulation Based on Number Theory

A branch of mathematics known as number theory is primarily concerned with the study of whole numbers. In that sense, number theory is used less in design than it is in analytics, computation, and other fields. Its inability to be used directly in any application was the issue. However, when combined with the computing power of modern PCs, number theory provides intriguing solutions to real-world issues. It serves a variety of functions in several industries, including computing, numerical analysis, and cryptography. The study of whole numbers is the primary focus of number theory. The fundamental structure of number theory has been gradually improved as a result of the dedication made by mathematicians throughout history to advancing the study of numbers, and as a result, a comprehensive and integrated field has been established. Number theory is a foundational subject that influences many other subjects and has a big impact on teachers. Number theory has been applied in statistics in a few fascinating ways. This overview paper's goal is to highlight particular noteworthy uses of this type. In number theory, indivisible numbers make up an interesting and challenging field of study. The main component of number theory is structured by diophantine equations. A Diophantine equation is an equation that needs necessary arrangements. This paper's first section looks at a few issues related to indivisible numbers and the function of Diophantine equations in Plan Theory. It is explained why Fibonacci and Lucas numbers commit to a semi-remaining Metis structure.