Advanced Engineering Mathematics: Lecture 2.1 - Fundamental Theorem of Linear ODEs
In this lecture, we explore the derivation of linear homogeneous ordinary differential equations (ODEs) and discuss the fundamental theorem associated with them.
Professor Macauley
12.3K views β’ Apr 26, 2017
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Advanced Engineering Mathematics, Lecture 2.1: The fundamental theorem of linear ODEs.
In this lecture, we describe how a linear homogeneous ODE arises from a linear differential operator. Moreover, solutions to the ODE are precisely the functions in the kernel of the operator. A fundamental result is that every n'th order operator has an n-dimensional kernel. This means that every n'th order linear homogeneous ODE has a general solution involving exactly n linearly independent functions. We review how to find these functions for 1st order and certain 2nd order ODEs.
Course webpage (with lecture notes, homework, worksheets, etc.): http://www.math.clemson.edu/~macaule/math4340-online.html
Prerequisite: http://www.math.clemson.edu/~macaule/math2080-online.html
In this lecture, we describe how a linear homogeneous ODE arises from a linear differential operator. Moreover, solutions to the ODE are precisely the functions in the kernel of the operator. A fundamental result is that every n'th order operator has an n-dimensional kernel. This means that every n'th order linear homogeneous ODE has a general solution involving exactly n linearly independent functions. We review how to find these functions for 1st order and certain 2nd order ODEs.
Course webpage (with lecture notes, homework, worksheets, etc.): http://www.math.clemson.edu/~macaule/math4340-online.html
Prerequisite: http://www.math.clemson.edu/~macaule/math2080-online.html
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12.3K
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45:07
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Apr 26, 2017
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