Remain Open - Calculus - Solved Exam, Exams of Calculus

This is the Solved Exam of Calculus which includes Square Inch, Local Minimum, Some Points, Calculate, Solution, Limit Definition etc. Key important points are: Remain Open, Material, Square Base, Maximum Possible Volume, Remain Open, Maximum, Justify, Equation, Implicit Differentiation, Minimum

Typology: Exams

2012/2013

Uploaded on 03/06/2013

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NAME: ‘2 EY Math 105D - Exam 2 - November 10, 2006 Instructions: Show all of your work and circle your final answers. Calculators are allowed, but notes and books are not. 1, (15 points) You have 54 ft? of material with which to build a box with a square base. One side (not the top or the bottom) of the box is to remain open. What is the maximum possible volume of the box? (Be sure to justify how you know this is a maximum.) 2 ‘olyze chive | \fe Xa = x4. (ols) : 2 2 = 2n 34. : = x ee FO Vee foce ject iGiahatl % a Baek Een G4 = 2x4 Bey es a ee ° * a1. 3 (SO 28\ Pe er Ve xen =) 3° 2 y {218 - 2x , Wee ae Se 5 Vv v() = fe —+—_+—_ vil4)ye 94 ° g \ VJ neces: Ws X24 +l deercese>, So 4a i ae AK ot K=3: