MATH 113 Midterm: MATH 113 BYU KeyW2007

Part i: short answer and multiple choice questions. Do not show your work for problems in this part: fill in the blanks with the correct answer. (a) 1 + x + x2 + is the maclaurin series for. 1 x (b) z ln (x) dx = x ln x x + c (c) what technique must be used to integrate z x + 1 x3 + 4x dx? partial fraction (d) Let p an = p n=1 an be an arbitrary series. 4 + converges absolutely. (a) f (b) t (c) t (d) t (e) f dx x3+1 converges. R sec (x) dx = ln|sec (x) + tan (x)| + c. If p n converges, then p n=1 a2 n=1 an converges absolutely, then it converges. n=1 an also converges. Each multiple choice problem is worth 3 points. In the grid below ll in the square corresponding to each correct answer.