MATH 1A03 Midterm: MATH1A03 Midterm 2011 Fall Practice

Math 1a03 fall 2011 12 practice version of midterm 1: no partial credit will be given on this question, find the derivative of f (x) = arctan(1 + x3). Do not simplify your answer: find the derivative of f (x) = Do not simplify your answer: find the derivative of f (x) = ln(2x) sec x. Do not simplify your answer: if g(x) = (f (x) + x)2, where f (3) = 6, f(cid:48)(3) = 8, f(cid:48)(6) = 10, nd f(cid:48)(3), find the derivative of the function f (x) = (cid:90) x2. Mcmaster university math 1a03 fall 2011 midterm 1: practice: state and prove the increasing test. page 2 of 7. Mcmaster university math 1a03 fall 2011 midterm 1: practice. Mcmaster university math 1a03 fall 2011 midterm 1: practice: state the de nition of a di erentiable function. Prove that if f is di erentiable at a then f is continuous at a. page 4 of 7.