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Integration of the laminar boundary layer equations for flow past wedges by Gauss's method.
Karabulut, Suleyman
Karabulut, Suleyman
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t1964_Karabulut.pdf
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1964-05
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Abstract
The subject of this investigation is to obtain the numerical value of the velocity gradient at the wall by integrating the boundary layer equation for flow past wedges with different wedge angles. The approach to the above problem is to use generalized Gauss's quadrature from first to fifth order successively. The application of this quadrature formula was recommended by William Squire.$^2$ Details about the quadrature formula are given in Appendix C.
Table of Contents
Acknowledgments -- List of symbols -- Introduction -- Historical development and previous work about the solution of boundary layer problems -- Illustration of the finding of the solutions -- General method of solution for velocity gradient at wall -- Development of the power series of the solution for boundary layer equation -- Development of the form which is applicable for generalized gauss's quadrature -- Numerical results -- Discussion of results -- Coonclusions
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Thesis (M.S.)-- University of Wichita, College of Engineering, Dept. of Aeronautical Engineering
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Wichita State University
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Wichita State University