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Name Student ID # Math 1320 Spring 2014 SAMPLE EXAM II This is only to give you a general idea of what to expect. The actual exam may or may not include problems similar to those given here, and it may be longer or shorter. Instructions: Show all of your work for full credit. Problem 1. 2. 3. 4. 5. Points 20 20 20 20 20 TOTAL Score (20 points) 1. Beginning with the geometric series, derive a power series representa2x tion for f (x) = , and find the radius of convergence. 4 + x2 (20 points) 2. Find the Taylor series expansion centered at a = 1 for f (x) = x3 − x2 . 1 (20 points) 3. (a) Find the vector projection of b = h1, 4, −3i onto a = h−2, 1, 5i. (b) What is the cosine of the angle between a and b? (20 points) 4. Find the volume of the parallelepiped with edges determined by the vectors a = h1, 2, 3i, b = h1, 0, −1i, and c = h0, −2, 1i. 2 (20 points) 5. Find parametric equations describing the tangent line to the curve parameterized by r(t) = ht2 + 1, cos t, 2et i, at the point (1, 1, 2). 3