This paper is published in Volume-5, Issue-3, 2019
Area
Mathematics
Author
B. M. Roy
Org/Univ
Jagat Arts, Commerce and Indiraben Hariharbhai Patel Science College, Goregaon, Maharashtra, India
Keywords
Binomial cubic expansion, Cubic congruence, Formulation, Prime-power- modulus
Citations
IEEE
B. M. Roy. RP-96: Formulation of solutions of a special standard cubic congruence of composite modulus– An integer multiple of power of prime integer, International Journal of Advance Research, Ideas and Innovations in Technology, www.IJARIIT.com.
APA
B. M. Roy (2019). RP-96: Formulation of solutions of a special standard cubic congruence of composite modulus– An integer multiple of power of prime integer. International Journal of Advance Research, Ideas and Innovations in Technology, 5(3) www.IJARIIT.com.
MLA
B. M. Roy. "RP-96: Formulation of solutions of a special standard cubic congruence of composite modulus– An integer multiple of power of prime integer." International Journal of Advance Research, Ideas and Innovations in Technology 5.3 (2019). www.IJARIIT.com.
B. M. Roy. RP-96: Formulation of solutions of a special standard cubic congruence of composite modulus– An integer multiple of power of prime integer, International Journal of Advance Research, Ideas and Innovations in Technology, www.IJARIIT.com.
APA
B. M. Roy (2019). RP-96: Formulation of solutions of a special standard cubic congruence of composite modulus– An integer multiple of power of prime integer. International Journal of Advance Research, Ideas and Innovations in Technology, 5(3) www.IJARIIT.com.
MLA
B. M. Roy. "RP-96: Formulation of solutions of a special standard cubic congruence of composite modulus– An integer multiple of power of prime integer." International Journal of Advance Research, Ideas and Innovations in Technology 5.3 (2019). www.IJARIIT.com.
Abstract
In this paper, a standard cubic congruence of composite modulus - an integer multiple of a power of prime integer, is considered for study and formulation. The author established the formulation of the solutions of the said congruence successfully. It is a bold attempt by the author for the formulation of the congruence. The congruence is not formulated by earlier mathematicians. The established formula is tested and found true. Formulation of the congruence is the merit of the paper.