NAME: MA 300 Sample Final Exam PUID: INSTRUCTIONS There are 5 problems on 4 pages. Record all your answers on the answer sheet provided. The answer sheet is the only thing that will be graded. No books or notes are allowed. You may use a one-line scientific calculator. No other electronic device is allowed. Be sure to turn off your cellphone. Show all your work on the exam. If you need more space, use the backs of the pages. The last page is a formula sheet. You may detach this page from the exam for easy reference, but you must hand it with your exam booklet.
. Evaluate e 3x dx. 7 e3x 3(7 e 3 x) + C 3 e3x 7x 3 e3x + C 3 e3x 7x 3 e3x + C D. 3 ln 7 e 3x + C 3 ln 7 e 3x + C. Evaluate 4 ln 4 + ln 4 (ln 4) D. 4 ln 4 + 4 4 ln 4 4 ln x x dx.
3. Use the Trapezoid Rule with n = 4 trapezoids to estimate 3 Round your answer to three decimal places. 0.808.490.303 D..606.98 x x + dx. 4. Find the volume of the solid generated by rotating about the x-axis the region bounded by the curves y = x + x, x = and x = 4 and the x-axis..75π 6.5π 7.75π D. (7.5 ln 4)π (7.5 + ln 4)π 3
5. A volume has cross-sections which are rectangles with length x + 3 and width x for 0 x 4. Find the volume of this solid. 4 44 5 48 D. 98 30 3 6. Evaluate xe x dx. 0 4 D. 4 This integral diverges. 0 4
7. Compute f x (3, 4). 4 65 65 0 D. 65 4 65 f(x, y) = y x + y. 8. Compute f yy (x, y). f(x, y) = e x cos y. (x cos y x sin y)e x cos y (x sin y cos y sin y)e x cos y x cos y sin ye x cos y D. x sin ye x cos y (x sin y x cos y)e x cos y 5
9. The function f(x, y) has partial derivatives and critical points f x (x, y) = 3y x 7, f y (x, y) = 3y 6y + 3x + 3 (, ), ( 6, 3). (There are no other critical points.) Which statement best describes these critical points? Both points are saddle points. (, ) is a saddle point and ( 6, 3) is a relative maximum. (, ) is a saddle point and ( 6, 3) is a relative minimum. D. (, ) is a relative minimum and ( 6, 3) is a relative maximum. (, ) is a relative maximum and ( 6, 3) is a relative minimum. 0. Sally sells seashells down by the seashore. She has found that if, in the morning, she spends x hours looking for seashells, and y hours polishing and decorating the seashells, she will sell S = 4xy + 4y 4x y + 96 seashells that day. How many hours should Sally spend looking for seashells, and how many polishing, in order to sell the highest number possible of shells that day? hour looking and 3 hours polishing. 3 hours looking and hour polishing. hour looking and hour polishing. D. hour looking and hours polishing. hours looking and hour polishing. 6
. Evaluate x 0 0 (y + x ) 5 dydx. 7 665 78 665 54 D. 43 6 745 6. Suppose with Find f(4). f (x) = x + x f() = and f () = 0. 35 3 40 3 5 6 D. 5 65 7
3. Suppose y 4y = e 6x y(0) = 3. Compute y(). e6 + 5 e4 e 6 + e 4 e 6 + D. e6 + 3 e 4 6 9 5 9 e6 4. Find the general solution to the differential equation y = x3 3 + x3 9 ln x + C ln x y = x3 3 x3 9 ln x + C ln x y = + C 3x 4 x 6 D. y = x 8 + C x 6 y = x3 9 + C x 6 xy + 6y = x. 8
5. The autonomous differential equation, y = y 4 4y 3 3y + 8y has exactly three equilibrium solutions: y =, y = 0 and y = 3. Which statement best describes the stability of these equilibrium solutions? y = is asymptotically stable, y = 0 is unstable and y = 3 is semi-stable. y = is asymptotically stable, y = 0 is semi-stable and y = 3 is unstable. y = is semi-stable, y = 0 is unstable and y = 3 is asymptotically stable. D. y = is unstable, y = 0 is semi-stable and y = 3 is asymptotically stable. y = is unstable, y = 0 is asymptotically stable and y = 3 is semi-stable. 6. Find the general solution to the differential equation Ce 3 x3 ± 3 C x 3 Ce 3 x3 D. 3 + C x 3 ln C x3 3 y = x y. 9
7. Suppose y = x + y y(0) =. Use Euler s method with x = 0.5 to approximate y()..5.75.5 D..875 3.785 8. A certain vine grows in such a way so that its length satisfies the differential equation L = 3 L where L is the length of the vine, in feet, t years from now. If a vine is initially measured at 4 feet long, how long will the vine be in 0 years? 5 ft 9 ft 89 ft D. 904 ft 04 ft 0
9. Which of the following matrices is singular? [ ] 3 4 [ ] 3 4 5 7 [ ] 3 4 6 8 [ ] 5 D. 4 [ ] 05 0 3 0. Find det(a), where A = 7 6 3 4 5. 59 3 9 D. 9
. Find the inverse of the matrix [ 7 3 [ 7 3 [ 7 ] ] ] [ ] 7 D. 3 4 [ ] 4 6 [ A = 4 3 7 ].. Find the eigenvalues for the matrix 3 and 6 and and D. 3 and and 7 A = [ 3 6 ].
3. The matrix A = 4 0 4 6 8 has r = 4 as one of its eigenvalues. Which of the following is an eigenvector associated to this matrix and eigenvalue? D. 4 0 0 3 8 0 3
4. The matrix A has eigenvalues r = and r = 3, with eigenvectors v = [ ] [ ] 4 v =. Compute A 5. 5 [ ] 5 [ ] 3 5 [ ] 43 [ ] 37 D. 43 [ ] 83 5 [ 0 ] and 5. Consider the difference equation x n+ = x n + 6x n. If x 0 = 0 and x = 0, find x 5. 5756700 5739568 5764556 D. 9066340 438675 4
Formula Sheet The Trapezoid Rule The Trapezoid Rule for estimating the integral b a f(x)dx with n trapezoids is given by T n = x [f(x 0) + f(x ) + + f(x n ) + f(x n )] where x = b a n, x 0 = a, x = a + x, x = a + x,..., x n = a + n x = b. D-Test To find the relative maximum and minimum values of f:. Find f x, f y, f xx, f yy and f xy.. Solve f x (x, y) = 0 and f y (x, y) = 0. 3. Evaluate D = f xx f yy [f xy ] at each point (a, b) found in Step. (a) If D(a, b) > 0 and f xx (a, b) < 0 then f has a relative maximum at (a, b). (b) If D(a, b) > 0 and f xx (a, b) > 0 then f has a relative minimum at (a, b). (c) If D(a, b) < 0 then f has a saddle point at (a, b). (d) If D(a, b) = 0 then the test is inconclusive... you will have to do something else to determine what is happening at that point. Euler s Method To approximate the solution to y = f(x, y), y(x 0 ) = y 0 using Euler s method with increments of x, we use the formula where x n+ = x n + x and y n = y(x n ). y n+ = y n + f(x n, y n ) x 5