PRINT LAST NAME INSTRUCTOR: UIN: FIRST NAME SECTION NUMBER: SEAT NUMBER: Directions. The use of all electronic devices is prohibited. 2. In Part (Problems -2), mark the correct choice on your Scantron using a No. 2 pencil. Record your choices on your exam. Scantrons will not be returned. 3. In Part 2 (Problems 3-7), present your solutions in the space provided. Show all your work neatly and concisely and clearly indicate your final answer. You will be graded not merely on the final answer, but also on the quality and correctness of the work leading up to it. 4. Be sure to write your name, section and version letter of the exam on the Scantron form. 5. Any scratch paper used must be handed in with the exam. 6. Good Luck! THE AGGIE CODE OF HONOR An Aggie does not lie, cheat, or steal, or tolerate those who do. Signature: http://foxtrot.com Question -2 3 4 5 6 7 TOTAL Points Awarded Points Possible 48 7 4 0 0 00
. The equation of the sphere passing through the point (2,, 3) with center (, 2, 3) is (a) (x 2) 2 + (y + 2) 2 + (z 3) 2 = 00 (b) (x ) 2 + (y + 2) 2 + (z 3) 2 = 0 (x 2) 2 + (y ) 2 + (z 3) 2 = 0 (x ) 2 + (y + 2) 2 + (z 3) 2 = 0 (e) (x 2) 2 + (y ) 2 + (z 3) 2 = 0 2. What is the cosine of the angle between the vectors, 2, 4 and 4, 2,? (a) 2 2 (b) 2 2 2 2 4 2 (e) 4 2 3. What is the distance between points ( 3, 2, 4) and (, 3, 4)? (a) 33 (b) 73 9 3 (e) 8 4. What is the power series representation of f(x) = at x = 0? 4 9x2 (a) (b) (e) 4 n x 2n 9 n+ 9 n x 2n 4 n+ ( ) n 9n x 2n 4 n+ ( ) n 4n x 2n 9 n+ 9 n x 2n n= 4 2
5. Given that the power series c n x n converges when x = 4 and diverges when x = 6, which of the statements is certain to be true? (a) (b) c n ( 3) n is convergent c n (5) n is divergent c n ( 5) n is convergent c n ( 6) n is divergent (e) None of these statements is certain to be true. 6. What is the Maclaurin series for e 2x2? (a) (b) (e) 2 n x n (n!) 2x n+2 (n!) 2x n (n!) 2 n x 2n (n!) 2 n x 2n (2n!) 7. Which series converges absolutely? (a) (b) (e) n= n= ( ) n 2 n ( ) n e 2n e 2n+ ( ) 2n n n= ( ) n n= n ( 3) n n= n! 3
8. Which series diverges? (a) (b) (e) n=2 n= n= n= 2n 2 n + 2 3n 3 + 4 n 2 + 4n + 6 2ne n2 n! 2 n n 9. Let a, b, c and d be nonzero vectors where a is the length of a. Given 0 < a b < a b and c d = c d Which of these statements is true? (a) a and b are parallel; c and d are neither orthogonal nor parallel (b) a and b are orthogonal; c and d are neither orthogonal nor parallel a and b are neither orthogonal nor parallel; c and d are parallel. a and b are neither orthogonal nor parallel; c and d are orthogonal. (e) None of the above statements is true. 0. Find a unit vector in the direction of the vector, 2, 2. (a), 2, 2 9 (b), 2, 2 9, 2, 2 3 3, 2, 2 (e) 9, 2, 2 4
. Find the vector projection of the vector, 2, 3 onto the vector 3, 2,. (a) 5 7 0 (b) 4 (e) 0, 20, 30 4 30, 20, 0 4 0, 20, 30 4 5 n (x 3) n 2. Find the radius of convergence of the power series. n! (a) (b) 5 4 5 n= 5 (e) 0 5
PART II WORK OUT Directions: Present your solutions in the space provided. Show all your work neatly and concisely and box your final answer. You will be graded not merely on the final answer, but also on the quality and correctness of the work leading up to it. 3. (7 points) Compute the Maclaurin series for sin(x) x x 3. 6
4. (6 points) The series ( ) n n (5 n )(2n 2 converges conditionally. Determine whether this series n) n= also converges absolutely. Clearly explain your reasoning. (5 points) What is a bound on the error if we sum the first 3 terms of the series? 7
5. (8 points) Find the first four terms of the Taylor series for f(x) = x 3 2 centered at a = 9. (6 points) Use Taylor s Inequality to give a bound for the error when using T (x) (the first degree Taylor polynomial) centered at a = 9 to approximate f(x) = x 3 2 on [8, 0]. Taylor s Inequality: R n (x) on [8, 0]. M (n + )! x a n+ on the interval [8, 0] where M = max f (n+) (x) 8
6. (0 points) Find the interval of convergence for the power series (x 3) n 5 n (n 2 + 2) 9
7. (0 points) Find the radius and center of the sphere x 2 + y 2 + z 2 + 2x 4y + 6z = 0