mslcreview3 - Math 131 Review for Midterm 3 1 Let f x xe x...

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Math 131 Review for Midterm 3 1. Let   1 x fx xe . a. Find the critical values of  . b. Use derivatives and/or a sign chart to determine the intervals where   is increasing and where is decreasing. c. Use the info above to find values of for which   has a local maximum and local minimum. 2. Let 43 4  . a. Find the - and y - intercept(s). b. Use the first derivative test to identify any local maxima and/or local minima. c. Use derivatives and/or a sign chart to find intervals where   is concave up and where   is concave down. d. Find all points of inflection. e. Sketch the graph of   . 3. Let 32 31 a. Find the critical values of . b. Use the Second Derivative Test to find where the local maximum and minimum values of   occur. c. Find the absolute maximum and absolute minimum values of   on [-2, 2]. 4. Find all -intercepts and -intercepts and give the equations for the vertical and horizontal asymptotes for 2 3 16 .
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This note was uploaded on 08/16/2011 for the course MATH 131 taught by Professor Siebert during the Spring '08 term at Ohio State.

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mslcreview3 - Math 131 Review for Midterm 3 1 Let f x xe x...

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