A7_2011 - 2. Let a R . Give a complete and accurate - proof...

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University of Toronto at Scarborough MAT A37H Summer 2011 Assignment # 7 You are expected to work on this assignment prior to your tutorial during the week of July 4th. You may ask questions about this assignment in that tutorial. At the beginning of your TUTORIAL during the week of July 11th you need to submit the following homework problems. STUDY: Chapter 9, Chapter 10 (only up to pg 171). HOMEWORK PROBLEMS: 1. Spivak # 9.19(a)(b)
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Unformatted text preview: 2. Let a R . Give a complete and accurate - proof of the Sum Rule (thm 3 pg 169): If f and g are dierentiable at a , then f + g is dierentiable at a , and ( f + g ) ( a ) = f ( a ) + g ( a ) . 3. Spivak # 10.15 4. Spivak # 10.29 EXERCISES: You do not need to submit these questions but you should make sure that you are able to answer them; 1. Spivak #9.1-3, 9.13, 9.14, 9.15, 9.16, 9.24, 10.11...
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