CalcNotes0101-page20

CalcNotes0101-page20 - (Chapter 1: Review) 1.20 The term...

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(Chapter 1: Review) 1.20 The term “odd function” may have come from the following fact: If fx () = x n , where n is an odd integer, then f is an odd function. These are the functions for: , x ± 3 , x ± 1 , x 1 , x 3 , x 5 , . The reciprocal of a nonzero odd function is odd. Example The functions for both x 1 (which equals x ) and x ± 1 which equals 1 x ² ³ ´ µ · are odd. Example The graph of the odd function
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This note was uploaded on 12/29/2011 for the course MATH 150 taught by Professor Sturst during the Fall '10 term at SUNY Stony Brook.

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