Given the function g(x) = 8x* + 84x² + 288x, find the first derivative, g'(x). = (x),6 Notice that g'(x) = 0 when a = - 3, that is, g'( – 3) = 0. Now, we want to know whether there is a local minimum or local maximum at a = - 3, so we will use the second derivative test. Find the second derivative, g'"(x). = (x),,6 Evaluate g'"( – 3). g''(– 3) = Based on the sign of this number, does this mean the graph of g(x) is concave up or concave down at a = - 3? At z = - 3 the graph of g(x) is Select an answer ♥

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Given the function g(x) = 8x° + 84x² + 288x, find the first derivative, g'(x). = (x),6 Notice that g'(x) = 0 when a = - 3, that is, g'( – 3) = 0. Now, we want to know whether there is a local minimum or local maximum at a = - 3, so we will use the second derivative test. Find the second derivative, g'"(x). g''(x) = Evaluate g''( – 3). g''(– 3) = Based on the sign of this number, does this mean the graph of g(x) is concave up or concave down at x = - 3? At x = - 3 the graph of g(x) is Select an answer Based on the concavity of g(x) at z = 3, does this mean that there is a local minimum or local maximum at x = – 3? At x = - 3 there is a local Select an answer v