Module 3 - Discussion 13 Instructions: 1. Choose one (1) of the following statements and elaborate on its validity. If f and g are differentiable, then a. dx [f (g(x))] = f'(g(x))g'(x) d b. (tan x) = (sec2x) dx dx C. (10*) = X10*-1 dx 2. Please respond to at least one (1) of your classmate'sModule 4 - Discussion Instructions: 1. Choose one (1) of the following statements and elaborate on its validity. a. If f'ici 0. then f has a local maximum or minimum alc. b. It i has an absolute minimum value at C. then 1' \"(cl = 0. If f is continuous on (a, bi. then i attains an absolute maxi- C. mum value first and an absolute minimum value rid } at some numbers as and d in (a. b}. 2. Please respond to at least one (1) of your classmate's posting. To begin the discussion, click on the \"Create Thread" link above. Module 5 - Discussion Instructions: 1. Choose one (1) of the following statements and elaborate on its validity. If f and g are continuous on is. b]. then [\"[rno + gm] dx = [\"fixidx + [\"ng m: b. [55 (ex? + bx + Cde = 2 |:{ax? + cidx 2. Please respond to at least one (1) of your classmate's posting. To begin the discussion, click on the \"Create Thread" link above. Module 6 - Discussion Instructions: 1. Choose one (1) of the following statements and elaborate on its validity. a. What is the volume of a cylindrical disk? b. Explain how to use slicing to find the volume of a solid of revolution. c. Why might you need to use the slicing of washers versus disks? 2. Please respond to at least one (1) of your classmate's posting. To begin the discussion, click on the "Create Thread" link above