Exam 2 - Fall 2005

# Exam 2 - Fall 2005 - Calculus I Exam #2 Fall 2005 Name _...

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Calculus I Exam #2 Fall 2005 Name ________________________________ You must show all your work on this paper. Solutions without correct supporting work will not be accepted. All problems must be worked manually. 1. Locate the absolute extrema of 4 5 5 4 ) ( x x x f - = on [ ] 2 , 0 . (4 points) 2. Determine if Rolle’s Theorem can be applied to 4 5 ) ( 2 + - = x x x f on [1,4]. If so, find the values of c guaranteed by the theorem. (4 points) 3. Given the function ) 4 ( ) ( 3 - = x x x f , find: (8 points) a. Interval(s) where the function is increasing: ______________________________ b. Relative extrema: ________________________________ (Make sure you indicate if it is a max or min.) c. Interval(s) where the function is concave down: ______________________________________ d. Inflection Points: ___________________________

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4. Evaluate: (Make sure you show your work.) (4 points each) a. x x x + - 5 6 lim 2 = ______________________ b. 1
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## This note was uploaded on 01/12/2012 for the course MATH 2554 taught by Professor Pamelasatterfield during the Spring '11 term at NorthWest Arkansas Community College.

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Exam 2 - Fall 2005 - Calculus I Exam #2 Fall 2005 Name _...

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