This paper is published in Volume-7, Issue-5, 2021
Area
Numerical Analysis
Author
Naveen Kumar, Rashmi Yadav, S. R. Singh
Org/Univ
Chaudhary Charan Singh University, Meerut, Uttar Pradesh, India, India
Keywords
Meru-Prastar, Vedic Mathematics, Binomial Theorem, Forward Difference Operator
Citations
IEEE
Naveen Kumar, Rashmi Yadav, S. R. Singh. Comparison of Vedic and Modern Maths in Forward Difference by Meru-Prastar, International Journal of Advance Research, Ideas and Innovations in Technology, www.IJARIIT.com.
APA
Naveen Kumar, Rashmi Yadav, S. R. Singh (2021). Comparison of Vedic and Modern Maths in Forward Difference by Meru-Prastar. International Journal of Advance Research, Ideas and Innovations in Technology, 7(5) www.IJARIIT.com.
MLA
Naveen Kumar, Rashmi Yadav, S. R. Singh. "Comparison of Vedic and Modern Maths in Forward Difference by Meru-Prastar." International Journal of Advance Research, Ideas and Innovations in Technology 7.5 (2021). www.IJARIIT.com.
Naveen Kumar, Rashmi Yadav, S. R. Singh. Comparison of Vedic and Modern Maths in Forward Difference by Meru-Prastar, International Journal of Advance Research, Ideas and Innovations in Technology, www.IJARIIT.com.
APA
Naveen Kumar, Rashmi Yadav, S. R. Singh (2021). Comparison of Vedic and Modern Maths in Forward Difference by Meru-Prastar. International Journal of Advance Research, Ideas and Innovations in Technology, 7(5) www.IJARIIT.com.
MLA
Naveen Kumar, Rashmi Yadav, S. R. Singh. "Comparison of Vedic and Modern Maths in Forward Difference by Meru-Prastar." International Journal of Advance Research, Ideas and Innovations in Technology 7.5 (2021). www.IJARIIT.com.
Abstract
In this paper, we will use the Binomial Theorem in the Forward Difference Operator of Modern Mathematics. On the other hand, Vedic Mathematics offers a new approach to mathematics. If we find the coefficients with the help of the Binomial Theorem, we experience difficulty, when we find the same coefficient with the help of the Vedic method Meruprastra, we get it easily. MeruPrastra method is also known as Pascal’s Triangle. Vedic Mathematics reduced efforts by around 50%.