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Now showing items 1-10 of 10

#### 18.085 Computational Science and Engineering I, Fall 2007

(2007-12)

This course provides a review of linear algebra, including applications to networks, structures, and estimation, Lagrange multipliers. Also covered are: differential equations of equilibrium; Laplace's equation and potential ...

#### 18.022 Calculus, Fall 2005

(2005-12)

This is an undergraduate course on calculus of several variables. It covers all of the topics covered in Calculus II (18.02), but presents them in greater depth. These topics are vector algebra in 3-space, determinants, ...

#### 18.310 Principles of Applied Mathematics, Fall 2002

(2002-12)

Principles of Applied Mathematics is a study of illustrative topics in discrete applied mathematics including sorting algorithms, information theory, coding theory, secret codes, generating functions, linear programming, ...

#### 18.06 Linear Algebra, Spring 2005

(2005-06)

This is a basic subject on matrix theory and linear algebra. Emphasis is given to topics that will be useful in other disciplines, including systems of equations, vector spaces, determinants, eigenvalues, similarity, and ...

#### 18.325 Topics in Applied Mathematics: Mathematical Methods in Nanophotonics, Fall 2005

(2005-12)

Topics vary from year to year. Topic for Fall: Eigenvalues of random matrices. How many are real? Why are the spacings so important? Subject covers the mathematics and applications in physics, engineering, computation, and ...

#### 18.024 Calculus with Theory II, Spring 2003

(2003-06)

This course is a continuation of 18.014. It covers the same material as 18.02 (Calculus), but at a deeper level, emphasizing careful reasoning and understanding of proofs. There is considerable emphasis on linear ...

#### 18.700 Linear Algebra, Fall 2005

(2005-12)

This course offers a rigorous treatment of linear algebra, including vector spaces, systems of linear equations, bases, linear independence, matrices, determinants, eigenvalues, inner products, quadratic forms, and canonical ...

#### 18.335J Introduction to Numerical Methods, Fall 2004

(2004-12)

The focus of this course is on numerical linear algebra and numerical methods for solving ordinary differential equations. Topics include linear systems of equations, least square problems, eigenvalue problems, and singular ...

#### 18.085 Mathematical Methods for Engineers I, Fall 2002

(2002-12)

Review of linear algebra, applications to networks, structures, and estimation, Lagrange multipliers, differential equations of equilibrium, Laplace's equation and potential flow, boundary-value problems, minimum principles ...

#### 18.085 Mathematical Methods for Engineers I, Fall 2005

(2005-12)

This course provides a review of linear algebra, including applications to networks, structures, and estimation, Lagrange multipliers. Also covered are: differential equations of equilibrium; Laplace's equation and potential ...