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Unformatted text preview: 18.02A Problem Set 8 – IAP 2010 due Thursday Jan.28, 11:45 in 2-106 Part I (20 points) Lecture 32. Fri. Jan.22 Line integrals in 3D; conservative fields, potential functions. Read: Notes V11, V12 Work: 6D - 1b, 2, 4, 5; 6E - 3(ii) (b: method 1), 5 (method 1) Lecture 33. Mon. Jan.25 Stokes’ Theorem Read: Notes V13 Work: 6E - 6bc (method 2); 6F - 1b, 2, 5 Lecture 34. Tues. Jan. 26 Stokes’ Theorem continued. Read: Notes V14 Work: 6G - 1 Lecture 35. Wed. Jan. 27 Applications. Read: Notes V15 Lecture 36. Thurs. Jan. 28 Review Problem Set 8 due . No late papers: solutions posted during class. 18.02A Exam Friday Jan. 29 Exam covers 18.02A 2nd half (all material covered during IAP) WALKER 3rd Floor, 9-11am Part II (30 points) Problem 1. (Fri. 5pts: 1 + 2 + 2) Consider the gravitational field associated with a point mass M located at the origin: F =- GM r 3 ( x i + y j + z k ). a) Show that div F vanishes everywhere except the origin, where it is undefined....
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This note was uploaded on 05/14/2010 for the course 18.02A 18.02A taught by Professor Johnbush during the Winter '10 term at MIT.
- Winter '10