MAT397-2006Spring

# MAT397-2006Spring - M AT 397 FINAL EXAM Spring 2006 N...

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MAT 397 FINAL EXAM Spring 2006 Name (please print): Instructor (circle one): Anderson, Graves, Latour, Leuschke, McCaffery, Pelley INSTRUCTIONS This exam has a total of 11 problems and 6 pages. Cbeck your exam now to be sure it bas all 11 problems. Tbis is your responsibility. Do all ofthe problems taking care to note that tbe exam begins on tbe back of this page. In order for a problem to get partial credit or be considered for full credit, you must show your work. The exam has been designed to make the use of a calculator unnecessary. Hence, you may not use your calculator on tbis exam. Problem # Points Score 1 8 2 8 3 12 4 8 5 8 6 8 7 12 8 10 9 10 10 8 11 8 Total 100

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1. (8 points) Find parametric equations for the line of intersection of the two planes x + y - 2z = 2 and 3x - 2y + 4z = 1.
2. (8 points) The acceleration at time t of a particle moving is space is given by a(t) = ti + t 2 j + k. If its initial velocity Vo = i + k, find its velocity at time t.

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3. (12 points) Decide whether each of the following limits exists.
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MAT397-2006Spring - M AT 397 FINAL EXAM Spring 2006 N...

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