SCCI Digital Library and Forum

MIT

S# Lecture Course Institute Instructor Discipline
1051
Limitations of the Linear: Limit Cycles and Chaos (M-I-T)
First-order Systems (M-I-T) MIT Prof. Arthur Mattuck, Prof. Haynes Miller, Jeremy Orloff, and Dr. John Lewis Basic and Health Sciences
1052
Linear Systems (M-I-T)
First-order Systems (M-I-T) MIT Prof. Arthur Mattuck, Prof. Haynes Miller, Jeremy Orloff, and Dr. John Lewis Basic and Health Sciences
1053
Linearization Near Critical Points (M-I-T)
First-order Systems (M-I-T) MIT Prof. Arthur Mattuck, Prof. Haynes Miller, Jeremy Orloff, and Dr. John Lewis Basic and Health Sciences
1054
Matrix Exponentials (M-I-T)
First-order Systems (M-I-T) MIT Prof. Arthur Mattuck, Prof. Haynes Miller, Jeremy Orloff, and Dr. John Lewis Basic and Health Sciences
1055
Matrix Methods: Eigenvalues and Normal Modes (M-I-T)
First-order Systems (M-I-T) MIT Prof. Arthur Mattuck, Prof. Haynes Miller, Jeremy Orloff, and Dr. John Lewis Basic and Health Sciences
1056
Nonlinear Systems (M-I-T)
First-order Systems (M-I-T) MIT Prof. Arthur Mattuck, Prof. Haynes Miller, Jeremy Orloff, and Dr. John Lewis Basic and Health Sciences
1057
Qualitative Behavior: Phase Portraits (M-I-T)
First-order Systems (M-I-T) MIT Prof. Arthur Mattuck, Prof. Haynes Miller, Jeremy Orloff, and Dr. John Lewis Basic and Health Sciences
1058
Lecture 10: Continuation: Complex Characteristic Roots (M-I-T)
Differential Equations (Spring 2010) (M-I-T) MIT Prof. Haynes Miller, and Prof. Arthur Mattuck Basic and Health Sciences
1059
Lecture 11: Theory of General Second-order Linear Homogeneous ODEs (M-I-T)
Differential Equations (Spring 2010) (M-I-T) MIT Prof. Haynes Miller, and Prof. Arthur Mattuck Basic and Health Sciences
1060
Lecture 12: Continuation: General Theory for Inhomogeneous ODEs (M-I-T)
Differential Equations (Spring 2010) (M-I-T) MIT Prof. Haynes Miller, and Prof. Arthur Mattuck Basic and Health Sciences
1061
Lecture 13: Finding Particular Solutions to Inhomogeneous ODEs (M-I-T)
Differential Equations (Spring 2010) (M-I-T) MIT Prof. Haynes Miller, and Prof. Arthur Mattuck Basic and Health Sciences
1062
Lecture 14: Interpretation of the Exceptional Case: Resonance (M-I-T)
Differential Equations (Spring 2010) (M-I-T) MIT Prof. Haynes Miller, and Prof. Arthur Mattuck Basic and Health Sciences
1063
Lecture 15: Introduction to Fourier Series (M-I-T)
Differential Equations (Spring 2010) (M-I-T) MIT Prof. Haynes Miller, and Prof. Arthur Mattuck Basic and Health Sciences
1064
Lecture 16: Continuation: More General Periods (M-I-T)
Differential Equations (Spring 2010) (M-I-T) MIT Prof. Haynes Miller, and Prof. Arthur Mattuck Basic and Health Sciences
1065
Lecture 17: Finding Particular Solutions via Fourier Series (M-I-T)
Differential Equations (Spring 2010) (M-I-T) MIT Prof. Haynes Miller, and Prof. Arthur Mattuck Basic and Health Sciences
1066
Lecture 19: Introduction to the Laplace Transform (M-I-T)
Differential Equations (Spring 2010) (M-I-T) MIT Prof. Haynes Miller, and Prof. Arthur Mattuck Basic and Health Sciences
1067
Lecture 1: The Geometrical View of y'= f(x,y) (M-I-T)
Differential Equations (Spring 2010) (M-I-T) MIT Prof. Haynes Miller, and Prof. Arthur Mattuck Basic and Health Sciences
1068
Lecture 3: Solving First-order Linear ODEs (M-I-T)
Differential Equations (Spring 2010) (M-I-T) MIT Prof. Haynes Miller, and Prof. Arthur Mattuck Basic and Health Sciences
1069
Lecture 20: Derivative Formulas (M-I-T)
Differential Equations (Spring 2010) (M-I-T) MIT Prof. Haynes Miller, and Prof. Arthur Mattuck Basic and Health Sciences
1070
Lecture 4: First-order Substitution Methods (M-I-T)
Differential Equations (Spring 2010) (M-I-T) MIT Prof. Haynes Miller, and Prof. Arthur Mattuck Basic and Health Sciences
1071
Lecture 21: Convolution Formula (M-I-T)
Differential Equations (Spring 2010) (M-I-T) MIT Prof. Haynes Miller, and Prof. Arthur Mattuck Basic and Health Sciences
1072
Lecture 5: First-order Autonomous ODEs (M-I-T)
Differential Equations (Spring 2010) (M-I-T) MIT Prof. Haynes Miller, and Prof. Arthur Mattuck Basic and Health Sciences
1073
Lecture 22: Using Laplace Transform to Solve ODEs with Discontinuous Inputs (M-I-T)
Differential Equations (Spring 2010) (M-I-T) MIT Prof. Haynes Miller, and Prof. Arthur Mattuck Basic and Health Sciences
1074
Lecture 6: Complex Numbers and Complex Exponentials (M-I-T)
Differential Equations (Spring 2010) (M-I-T) MIT Prof. Haynes Miller, and Prof. Arthur Mattuck Basic and Health Sciences
1075
Lecture 23: Use with Impulse Inputs (M-I-T)
Differential Equations (Spring 2010) (M-I-T) MIT Prof. Haynes Miller, and Prof. Arthur Mattuck Basic and Health Sciences