Empirical equation of the Mach number as a function of the stagnation pressure ratio for a quasi-one-dimensional compressible flow

IF 1.2 Q3 ENGINEERING, MECHANICAL
S. Tolentino
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引用次数: 1

Abstract

In the present work for a quasi-one-dimensional isentropic compressible flow model, an empirical equation of the Mach number is constructed as a function of the stagnation pressure ratio for an analytical equation that algebraic procedures cannot invert. The Excel 2019 Solver tool was applied to calibrate the coefficients and exponents of the empirical equation during its construction for the Mach number range from 1 to 10 and 1 to 5. A specific heat ratio from 1.1 to 1.67 and the generalized reduced gradient iterative method were used to minimize the sum of squared error, which was set as the objective function. The results show that for Mach 1 to 10, an error of less than 0.063% is obtained, and for Mach 1 to 5, an error of less than 0.00988% is obtained. It is concluded that the empirical equation obtained is a mathematical model that reproduces the trajectories of the inverted curves of the analytical equation studied.
准一维可压缩流马赫数随滞止压力比的经验方程
在目前的工作中,准一维等熵可压缩流动模型,马赫数的经验方程被构造为一个滞止压力比的函数的解析方程,代数程序不能反转。在马赫数1 ~ 10和1 ~ 5范围内,应用Excel 2019 Solver工具对经验方程构建过程中的系数和指数进行了标定。以比热比1.1 ~ 1.67为目标函数,采用广义归约梯度迭代法使误差平方和最小化。结果表明,在马赫数1 ~ 10范围内,误差小于0.063%,在马赫数1 ~ 5范围内,误差小于0.00988%。得到的经验方程是再现所研究的解析方程的倒曲线轨迹的数学模型。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
FME Transactions
FME Transactions ENGINEERING, MECHANICAL-
CiteScore
3.60
自引率
31.20%
发文量
24
审稿时长
12 weeks
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