Basic concepts of partial differential equations
Date of Publication
1995
Document Type
Bachelor's Thesis
Degree Name
Bachelor of Science in Mathematics
College
College of Science
Department/Unit
Mathematics and Statistics
Abstract/Summary
This paper aims to exemplify some concepts in partial differential equations. Partial differential equation is an equation containing more that one partial derivative. Partial differential equation is obtained by eliminating constants of equations dealing with more than one independent variable. A linear partial differential equation is an equation which has only linear partial derivatives. This paper aims to present the methods of obtaining solutions to: linear partial differential equations of order one by using the Lagrange system of equations, non-linear partial differential equations of order one which are of the form f(p,1) = 0, z = px = qy + f(p,q), f(z,p,q) = 0. and f1(x,p) = f2(y,q), homogeneous partial differential equations of higher order with constant coefficients of the form, A az + b az = 0, a z2z + B a2Z + z2Z = 0 and non-homogeneous linear partial differential equations with constant coefficients of the form f(Dx, Dy) = R(x,y).
Abstract Format
html
Language
English
Format
Accession Number
TU07038
Shelf Location
Archives, The Learning Commons, 12F, Henry Sy Sr. Hall
Physical Description
100 leaves
Keywords
Differential equations, Partial; Operator equations; Functions
Recommended Citation
Ang, S. A., & Gohoc, J. C. (1995). Basic concepts of partial differential equations. Retrieved from https://animorepository.dlsu.edu.ph/etd_bachelors/16238
