This preview shows pages 1–3. Sign up to view the full content.
This preview has intentionally blurred sections. Sign up to view the full version.View Full Document
Unformatted text preview: SLG MOCK FINAL FOR PRACTICE ONLY FALL 2011 MATH 1080 ELEMENTS OF CALCULUS I FORMAT: 29 MULTIPLE CHOICE 5 SHORT ANSWER IMPORTANT: It is most beneficial to you to write this mock final UNDER EXAM CONDITIONS . This means: Complete the mock final in 2 hours. Work on your own. Keep your notes and textbook closed. Attempt every question. After the 2 hour time limit, go back over your work with a different colour or on a separate piece of paper and try to do the questions you are unsure of. Record your ideas in the margins to remind yourself of what you were thinking when you take it up next week. The purpose of this mock final is to give you practice answering questions in a timed setting and to help you to gauge which aspects of the course content you know well and which are in need of further development and review. Use this mock final as a learning tool in preparing for the actual final on December 16 th . THIS VERSION of the mock final will be reviewed and discussed during these SLG sessions: Day Time Location Leader Monday November 28 7-10 PM Lib 384 Jessa Tuesday November 29 7-10 PM Lib 384 Kim Wednesday November 30 11:30-1 PM Lib 359 Kate Thursday December 1 5:30-7 PM Lib 100A (Forster) Emerald & Zo GOOD LUCK! Disclaimer : Please note that this mock final was prepared by students. This resource is not designed to be used independently of the SLG Sessions listed above. Please use this resource for referral only it is supplemental review and is not meant to be a substitute for lecture or textbook material, or individual studying. This document may contain errors, which may not be apparent unless, or even if, you attend the session for which it is intended. This document has not been approved nor endorsed by, nor is it affiliated with, the Department of Mathematics and Statistics. PART A: Multiple Choice 1) An equation that passes through the point (8, 200) and plots a straight line on log-log paper with a slope of 2/3 is a) y = 200x 2/3 b) y = 200(2 x 8 ) c) y = 200(2 x2/3 ) d) y = 50x 2/3 e) y = (2/3)x + 584/3 2) ln(2x 2 + 1) x 0 Let f(x) = sin([[x]]) 0 < x < 1 3 x 1...
View Full Document