This preview shows pages 1–2. 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: Calculus PreTest #2 Limits Objectives: □ You will be able to determine average the rate of change of a function □ You will be able to determine limits with an algebraic approach and limit laws □ You will be able to determine a limit with an analytical method □ You will be able to determine a limit with a graphical method □ You will be able to recognize when a limit does not exist □ You will be able to evaluate limits with an algebraic approach by simplifying. □ You will be able to determine limits using the squeeze theorem □ You will be able to determine the limits of trigonometric functions □ You will be able to evaluate one sided limits □ You will be able to describe the continuity of a function. □ You will be able to test for the existence of a limit □ You will be able to test for continuity at a point □ You will be able to apply the intermediate value theorem to predict the behavior of a function. □ You will be able to determine infinite limits of a function. Name___________________________________ Date: _______________________ Complete the table for the function and find the indicated limit. 1) If f(x) = x 4 x 2 , find lim f(x).x → 4 x 3.9 3.99 3.999 4.001 4.01 4.1 f(x) 2) If f(x) = x 3 6x + 8 x 2 , find lim f(x).x → x 0.1 0.01 0.001 0.001 0.01 0.1 f(x) Determine the limit graphically, if it exists....
View
Full
Document
This note was uploaded on 02/03/2012 for the course MATH 101 taught by Professor Lee during the Spring '11 term at International Institute for Higher Education.
 Spring '11
 Lee
 Algebra, Rate Of Change, Limits

Click to edit the document details