Math252HW4 - MATH 252 HW #4: CHAPTER 17 FALL 2008 Write...

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MATH 252 HW #4: CHAPTER 17 FALL 2008 Write your name and class and clearly separate sections! See the syllabus. Show work where appropriate, and use “good form and procedure,” as in class! (The solutions manual may have insufficient work.) This is due when you take Quiz 4. Graded out of 10 points. “*” denotes “See Hint below.” Read some of the Examples in this chapter for additional assistance. (My notes are also fair game for tests.) 17.1: 13, 17, 19, 21, 31, 45, 47, 49 Look at 11: Gives you an idea of how to do a Calculus III version of a Riemann sum approximation. 17.2: 1, 17, 19, 23-31 odd (don’t sketch the solid in 23-31) 17.3: 1, 13, 15, 19, 23, 25 17.4: 1, 3, 5 (Use the Table of Integrals on p.A21), 9, 13 Challenge Problem #1 (Optional): A plane intersects the xy -plane in an acute angle ± . Consider the part of the plane (a “sticky,” maybe?) whose projection (shadow) onto the xy -plane is a rectangle with dimensions ± x and ± y . Prove that the surface area of the sticky is
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This note was uploaded on 09/08/2011 for the course MATH 252 taught by Professor Staff during the Spring '11 term at Mesa CC.

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Math252HW4 - MATH 252 HW #4: CHAPTER 17 FALL 2008 Write...

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