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13 Nov 2019
Problem 5 (TWO PARTS) 1. State the second derivative test. 2. Find the intervals where the function is concave up or concave down for any two of the following functions. Using only the second derivative test, identify the critical points where there exists a relative maximum/minimum. You DO NOT have to solve for relative max/min, just the value of c that would give me the max/min based off of the second derivative test. (a) f(z) = z4-4x3 (b) h) In (d) /(z)-z§ (6-z)3-Bonus: Extra 5 pts If you tackle this one (c) f(z) = z3-32+ 4
Problem 5 (TWO PARTS) 1. State the second derivative test. 2. Find the intervals where the function is concave up or concave down for any two of the following functions. Using only the second derivative test, identify the critical points where there exists a relative maximum/minimum. You DO NOT have to solve for relative max/min, just the value of c that would give me the max/min based off of the second derivative test. (a) f(z) = z4-4x3 (b) h) In (d) /(z)-z§ (6-z)3-Bonus: Extra 5 pts If you tackle this one (c) f(z) = z3-32+ 4
Bunny GreenfelderLv2
19 Oct 2019