Generalized Bernoulli’s Equation—A Review on the New Approach

Authors

  • Arghya Bandyopadhyay Department of mathematics, Khalisani Mahavidyalaya, Chandannagar, Hooghly, India

Abstract

We know Poiseuille’s equation deals with the viscous flow and Bernoulli’s equation, the most fundamental relationship of fluid mechanics, is perhaps not applicable with the flow in viscous regime. In a very interesting result presented here we show that both the equations may be derived as special cases of a generalized Bernoulli’s equation. The assumptions involved in deriving these equations are identified and the limitations discussed. This study breaks a preconceived notion that Bernoulli and Poiseuille’s equations are mutually exclusive.

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Published

2024-12-07

How to Cite

Bandyopadhyay, A. (2024). Generalized Bernoulli’s Equation—A Review on the New Approach. Journal of Basic and Bio Sciences, 1(1). Retrieved from https://jb2s.org/index.php/files/article/view/1