Use the function h(x) = x + x2 - z to complete the problems given below. a) The function h(x) has two critical values A and B, with A < B. Identify those two values below: A = В - b) Use the First Derivative Test to determine what kind of local extrema (local minimum or local maximum) the function has at each of these values. Show your work by creating a Sign Chart (a number line that includes the critical values and the sign of the derivative in the intervals between the critical values) and uploading an image of the Sign Chart in the box below. U x, x' A <> Edit - Insert Formats - c) Based on your work in part (b), identify the type of local extrema that exist at each critical value from part (a). Critical Value A O Local Minimum O Local Maximum ONeither Critical Value B O Local Minimum OLocal Maximum O Neither

1. Use the function h(x)= x + x^2 - x^3 to complete the problems given below. a). The function h(x) has two critical values A and B, with A

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Use the function h(x) = x + x? - x to complete the problems given below. a) The function h(x) has two critical values A and B, with A < B. Identify those two values below: A = B = b) Use the First Derivative Test to determine what kind of local extrema (local minimum or local maximum) the function has at each of these values. Show your work by creating a Sign Chart (a number line that includes the critical values and the sign of the derivative in the intervals between the critical values) and uploading an image of the Sign Chart in the box below. Edit - Insert - Formats - BIUX, x² A A <> ΣΣμ c) Based on your work in part (b), identify the type of local extrema that exist at each critical value from part (a). Critical Value A O Local Minimum O Local Maximum O Neither Critical Value B O Local Minimum O Local Maximum O Neither III