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Calculus II (UN1102) Section 2 Final Exam Example Time Limit: 3hrs Name: UNI: Please write your name and UNI above. The exam consists of eight problems, each worth 20 points. No calculators are allowed in the exam. Please write neatly, and please justify your answers. You are free to use any trigonometric identities that you remember without ...
Quiz yourself with questions and answers for Calculus 2 Final Exam Review, so you can be ready for test day. Explore quizzes and practice tests created by teachers and students or create one from your course material.
FINAL EXAM CALCULUS 2 MATH 2300 FALL 2018 Name PRACTICE EXAM SOLUTIONS Please answer all of the questions, and show your work. You must explain your answers to get credit. You will be graded on the clarity of your exposition! Date: December 12, 2018. 1
Calculus II - Math 142 Final Exam Review Problems 1.Evaluate the following integrals. (a) Z ex cos(ex)dx. (b) Z tan5 θsec3 θdθ. (c) Z x2 cos(3x)dx 2.Find the third degree Taylor polynomial for f(x) = x3 + 2x−3 centered at c= 2.
In addition to a collection of 10 problems there are also some selected additional problems from old exams and reviews. The more problems that you are able to answer without outside help, the better you are doing; so try and answer as many as possible! Quiz 1 -- Review material. Quiz 2 -- Integration by parts; trigonometric integrals
Calc II: Practice Final Exam 4 Part II. Sequences and Numerical series. 1. Determine whether the sequence converges or diverges. If it con-verges, nd the limit. (a) an= nsin(2=n) It converges to 2, using L’Hopital (lim x!0 sin2x x = 2:) (b) an= 2n=n! 0 <an 4=n!0; hence an converges to 0 by the squeeze theorem. 2.
Calculus II Final Exam Practice Problems 1. (a) Sketch the conic section. Find and label any foci, vertices, and asymptotes. (x−3) −9y2 =36 (b) Find the equation of the ellipse with foci (0, 2) and semi-major axis length 3. 2. (a) Find the area of one petal of the rose r = 4sin(3 ).
