MATH 1553 Midterm: MATH 1553 GT Spring Exam3

Pens, pencils, erasers are allowed. Note sheets, formula sheets and öthèr sia atus alt not allowed. No additional material is allowed. must be justified, unsupported answers may receive litle to no credit. SHOW ALL WORK. Justifications such as "my calculator says so" are not acceptable. Give EXACT answers, not decimal approximations. For example, v2 is exact, but 1.414 and 1.414213562 are approximations. The total number of points is 100. The number of points for each problem is indicated in square brackets > 7 Problem 1. [18] Find all critical points of the function fx,y)-36a Classify cach critical point as a local minimum, local maximum or saddle point Problem 2. [18] Let R be the region in the first quadrant that is bounded by the curves whose equations are y and y-7x. For your convenience, a graph of R is included on page Evaluate the integral Problem 3. [14] Consider the following iterated double integral: (a) Sketeh the region of integration b Write an equivalent doable integral with the order of integration reversed. DO NOT EVALUATE THE INTEGRAL PLEASE TURN OVER FOR PROBLEMS4THROUGH 6

Fall 2017 Math 2150 Final Exam Take 1 Part 2 Section 8 Closed book, closed notes. No caleulators. Show your work. No loitering, no smoking, no walking on the grass, no feeding the animals, no parking, no stopping or standing, no dumping, no running, no fishing, no vacancy. All problems weighted equally. (1) Use the power series method to solve (1-z)y" +zy-y = 0. Here's a standard power series that you will find useful in your answer: 23 2 3 4! n! nao (2) A 64 Ib object stretches a spring 4 ft in equilibrium. It is attached to a dashpot with damping constant c-8 lb-sec/ft. The object is initially displaced 18 inches above equilibrium and given a downward velocity of 4 ft/sec. Find its displacement for t>0. Assume the motion is free. Since the weight is 64, for the mass you can use m =64/32 = 2. The following equations will be useful: The equation of motion for this system is my" + c/ + ky= F, where m is the mass of the object, c is the damping constant, k is the spring constant, and F is the forcing function. mg = kar, where g 32n/s2 is the gravitational constant, and Al is the distance by which a spring is stretched from its natural length when the object is attached to it. Remember to convert from inches to feet, so all units are compatible.

8. Determine whether the vectors a = 121 - 20j + 16k and b = - 9i + 15j - 12k are parallel, perpendicular, or neither. 9. Find (to the nearest degree) the three angles of the triangle with vertices at A(1, 1, 1), B(3, -2, 3), and C(3, 4, 6). 10. Find the vector proj a b if a = 21 + 10j-11k and b = 21 + 2j + k. DIRECTIONS: The purpose of this assignment is to evaluate your knowledge of the topics covered in chapter 12 of the text. Read all directions carefully. Make sure to answer all parts of the question. Show all necessary work to receive full credit. Do all work by hand. Circle and label all answers. Please write neatly. Once you have completed the homework assignment, then please scan in your assignment and save it as a PDF file. Also, please make sure that the scan is readable (i.e. the text is dark enough to read). If the assignment is illegible (i.e. extremely messy handwriting or too light of copy) and I cannot read it, then I will not grade it. After have scanned the assignment in and saved it as a PDF file, then submit the assignment in the chapter 12 assignment dropbox. This assignment is worth 200 points. Good luck.