Neutrosophic Integrals by Reduction Formula and Partial Fraction Methods for Indefinite Integrals

A. Manshath^1*, E. Kungumaraj², E. Lathanayagam³, M. C. Joe Anand⁴, Nivetha Martin⁵, Elangovan Muniyandy⁶, S. Indrakumar⁷

¹Department of  Mathematics & Acturial Science, B.S.Abdur Rahman Crescent Institute of Science and Technology, Kanchipuram-600048, Tamil Nadu, India

²Sakthi Institute of Information and Management Studies, Pollachi, Coimbatore, Tamil Nadu - 642001, India

³Akshaya College of Engineering and Technology, Kinathukadavu, Coimbatore, Tamil Nadu - 642109, India

⁴Department of Mathematics, Mount Carmel College (Autonomous), Affiliated to Bengaluru City University, Bengaluru - 560052, Karnataka, India.

⁵Department of Mathematics, Arul Anandar College, Karumathur-625514, Tamil Nadu, India.

⁶Department of Biosciences, Saveetha School of Engineering, Saveetha Institute of Medical and Technical Sciences, Chennai- 602105, Tamil Nadu, India.

⁷Department of Computer Technology (UG), Kongu Engineering College, Erodu-638052, Tamil Nadu, India.

Emails: ameer.manshath@gmail.com; kungum99522@gmail.com; lathashrilishanth@gmail.com ; arjoemi@gmail.com; nivetha.martin710@gmail.com; muniyandy.e@gmail.com; indrakumar.maths@kongu.edu

Abstract

Neutrosophic mathematics is a branch of mathematics that deals with ambiguity, indeterminacy, and incompleteness in mathematical objects and procedures. To account for Neutrosophic uncertainty, several mathematical concepts—including the reduction formula, partial fractions, and area finding—are extended in this field. The Neutrosophic reduction formula is a technique for summarising simpler words from a complex mathematical expression when the coefficientss a nd/or values may be ambiguous or unknown. By taking the potential of insufficient information into account, expands the traditional reduction formula. A rational function can be broken down using the Neutrosophic partial fraction into several simpler expressions, where the coefficients and/or values may be ambiguous or unknown. By considering, this expands the traditional partial fraction. The potential for inaccurate information. A method for calculating the area under a curve where the curve's form or position may be unknown or ambiguous is area finding via neutrosophic integration. By considering the potential of having insufficient information, this expands the traditional area of searching. These ideas can be used in fields like decision-making, expert systems, and artificial intelligence and are crucial for handling problems in the real world that entail uncertainty, indeterminacy, and incompleteness.

Keywords: Definite neutrosophic integral; Area of neutrosophic curves; length of neutrosophic volumes of neutrosophic revolution; Indeterminacy in integrals.