Show all work and include appropriate explanations when necessary. The last page contains some useful identities: (20pts) find the indicated derivatives (a) dx(ln (x2 + 1)) (b) dx(e x) (c) dx(log2 (tan x)) (d) dx(3cosh x) (e) dx(xsin x) 1: (20pts) evaluate the following inde nite integrals. (a) z xex2 dx (b) z. 3x + 1 dx (c) z x ln x dx (d) z sin (2x) sin (5x) dx (e) z e2x. 2: (10pts) the population of a certain species of penguin in the arctic was found to be 3,000 in 1998 and 4,000 in 2008. Let p (t) denote the penguin population (in thousands) t years since 1998 (that is. Assume that the population grows exponentially. (a) (8pts) write a formula for p (t). No need to simplify: (10pts) evaluate the following: (a) sin . 3: (10pts) use integration by parts to nd. Z xp4 x2 dx: (10pts) find. Trigonometric formulas: sin2 x + cos2 x = 1.
