18.085 Mathematical Methods for Engineers I, Fall 2005
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 flow; boundary-value problems; minimum principles and calculus of vari...
| Main Author: | |
|---|---|
| Other Authors: | |
| Format: | Learning Object |
| Language: | en-US |
| Published: |
2005
|
| Subjects: | |
| Online Access: | http://hdl.handle.net/1721.1/45136 |
| _version_ | 1826190849310982144 |
|---|---|
| author | Strang, Gilbert |
| author2 | Massachusetts Institute of Technology. Department of Mathematics |
| author_facet | Massachusetts Institute of Technology. Department of Mathematics Strang, Gilbert |
| author_sort | Strang, Gilbert |
| collection | MIT |
| description | 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 flow; boundary-value problems; minimum principles and calculus of variations; Fourier series; discrete Fourier transform; convolution; and applications. |
| first_indexed | 2024-09-23T08:46:35Z |
| format | Learning Object |
| id | mit-1721.1/45136 |
| institution | Massachusetts Institute of Technology |
| language | en-US |
| last_indexed | 2025-03-10T07:21:49Z |
| publishDate | 2005 |
| record_format | dspace |
| spelling | mit-1721.1/451362025-02-24T15:06:45Z 18.085 Mathematical Methods for Engineers I, Fall 2005 Mathematical Methods for Engineers I Strang, Gilbert Massachusetts Institute of Technology. Department of Mathematics linear algebra networks Lagrange multipliers differential equations of equilibrium Laplace's equation potential flow boundary-value problems Fourier series discrete Fourier transform convolution Engineering mathematics 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 flow; boundary-value problems; minimum principles and calculus of variations; Fourier series; discrete Fourier transform; convolution; and applications. 2005-12 Learning Object 18.085-Fall2005 local: 18.085 local: IMSCP-MD5-6b78b8010801c30f3eef2edfd29718f1 http://hdl.handle.net/1721.1/45136 en-US Usage Restrictions: This site (c) Massachusetts Institute of Technology 2003. Content within individual courses is (c) by the individual authors unless otherwise noted. The Massachusetts Institute of Technology is providing this Work (as defined below) under the terms of this Creative Commons public license ("CCPL" or "license"). The Work is protected by copyright and/or other applicable law. Any use of the work other than as authorized under this license is prohibited. By exercising any of the rights to the Work provided here, You (as defined below) accept and agree to be bound by the terms of this license. The Licensor, the Massachusetts Institute of Technology, grants You the rights contained here in consideration of Your acceptance of such terms and conditions. text/html Fall 2005 |
| spellingShingle | linear algebra networks Lagrange multipliers differential equations of equilibrium Laplace's equation potential flow boundary-value problems Fourier series discrete Fourier transform convolution Engineering mathematics Strang, Gilbert 18.085 Mathematical Methods for Engineers I, Fall 2005 |
| title | 18.085 Mathematical Methods for Engineers I, Fall 2005 |
| title_full | 18.085 Mathematical Methods for Engineers I, Fall 2005 |
| title_fullStr | 18.085 Mathematical Methods for Engineers I, Fall 2005 |
| title_full_unstemmed | 18.085 Mathematical Methods for Engineers I, Fall 2005 |
| title_short | 18.085 Mathematical Methods for Engineers I, Fall 2005 |
| title_sort | 18 085 mathematical methods for engineers i fall 2005 |
| topic | linear algebra networks Lagrange multipliers differential equations of equilibrium Laplace's equation potential flow boundary-value problems Fourier series discrete Fourier transform convolution Engineering mathematics |
| url | http://hdl.handle.net/1721.1/45136 |
| work_keys_str_mv | AT stranggilbert 18085mathematicalmethodsforengineersifall2005 AT stranggilbert mathematicalmethodsforengineersi |