m Southern New Hampshire Univer X + X G A snhu.mobius.cloud/2033/3373/assignments/163318/0 Update G Gmail YouTube V Maps Statutes & Constitu... Statutes & Constitu... Benefits Online | Lo... (us The Official Home.. Download music, m... X Welcome to Conne.. [Solved] Scenario Y... Help | Marquis Sawyer (marquis.sawyer@snhu.edu) | Logout mobius Gradebook External */ MAT-225-J7066 22EW2 Calc I: Single-Variable Calc / Module Six / 6-1 Module Six Discussion: Finding a Function to Match a Shape 6-1 Module Six Discussion: Finding a Function to Match a Current Grade: 0.0 / 1.0 Remaining Time: Unlimited Shape Module Six Discussion For this week's discussion, you are asked to generate a continuous and differentiable function f () with the following properties: . f (z) is decreasing at c = -5 . f (x) has a local minimum at z = -2 . f (x) has a local maximum at z = 2 Your classmates may have different criteria for their functions, so in your initial post in Brightspace be sure to list the criteria for your function. Hints: Use calculus! . Before specifying a function f (I), first determine requirements for its derivative f (x). For example, one of the requirements is that f (-2) = 0. If you want to find a function g (r) such that g (-9) = 0 and g (8) = 0, then you could try g (z) = (1 + 9) (1 -8) If you have a possible function for f(I), then use the techniques in Indefinite Integrals this Module to try a possible f (I). You can generate a plot of your function by clicking the plotting option (the page option with a "P" next to your function input). You may want to do this before clicking "How Did I Do?". Notice that the label " f (x) =" is already provided for you. Once you are ready to check your function, click "How Did I Do?" below (unlimited attempts). Please note that the bounds on the -axis go from -6 to 6. f (z) = h cin fal Save Quit & Save Previous Unit Item Next Unit Item Previous Page Next Page 53.F 10:14 AM Clear 9 O 11/28/2022