Arthur Mattuck

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Lecture 01: The geometrical view of y'=f(x,y): direction fields, integral curves.

266 2

Lecture 02: Euler's numerical method for y'=f(x,y) and its generalizations.

128 3

Lecture 03: Solving first-order linear ODE's; steady-state and transient solutions.

118 4

Lecture 04: First-order substitution methods: Bernouilli and homogeneous ODE's.

82 5

Lecture 06: Complex numbers and complex exponentials.

67 6

Lecture 05: First-order autonomous ODE's: qualitative methods, applications.

61 7

Lecture 19: Introduction to the Laplace transform; basic formulas.

60 8

Lecture 09: Solving second-order linear ODE's with constant coefficients: the three cases.

56 9

Lecture 13: Finding particular solutions to inhomogeneous ODE's: operator and solution formulas involving exponentials.

47 10

Lecture 11: Theory of general second-order linear homogeneous ODE's: superposition, uniqueness, Wronskians.

albums

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MIT OCW: 18.03 Differential Equations, Spring 2004

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Differential Equations, Spring 2006

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MIT 18.03 Differential Equations, Spring 2006 - Video

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Differential Equations

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18.03 Differential Equations, Spring 2004

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MIT OCW: 18.03 Differential Equations

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MIT: Differential Equations

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Arthur Mattuck

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