210CML2 - 11 4 2 3 2 2 ≥-x x 12 x x x 20 2 3< 13 x x x...

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Math 210 Winter 2007 CML #2 For 1-3, expand completely using Pascal’s Triangle 1) ( 2x + h ) 5 2) ( x – 4 ) 7 3) ( 3x – 2y) 3 For 4-10, find functions f and g so that y = f(g(x)). Do not pick g(x)=x. 4) 3 1 - = x y 5) x y 2 sin = 6) x x y cos 4 cos 3 3 + = 7) x x y 3 2 - = 8) 3 2 - + = x y 9) ( 29 2 3 2 4 - = x y 10) 6 x y = For 11-15, solve for x giving solution set in interval notation .
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Unformatted text preview: 11) 4 2 3 2 2 ≥ +-x x 12) x x x 20 2 3-+ < 13) x x x 7 2 2 3 +-< 14) 1 3 2 ≥ + + x 15) 16 9 4 x For 16-18, find f´(x) using the limit definition of the derivative. (You may not use any shortcuts) 16) 1 2 1 ) ( +-= x x f 17) x x f 2 ) ( = 18) 4 2 3 ) ( 2 3 +--= x x x x f...
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This note was uploaded on 05/04/2008 for the course MATH 210 taught by Professor Volkerding during the Winter '07 term at University of Missouri-Kansas City .

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