5) Determine the equations of all asymptotes (Vertical, Horizontal, Oblique) and find and classify any local extreme points for the function ¦(x) = x2 – x + 1/x – 1

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5) Determine the equations of all asymptotes (Vertical, Horizontal, Oblique) and find and classify any local extreme points for the function ¦(x) = x² – x + 1/x – 1.

6) Use the techniques for curve sketching that you think are appropriate to sketch the curve defined by ¦(x) = 4 – x²/x² – 1. Label all key information.

7) What system of four equations and four unknowns would you set up to determine the values of a, b, c and d that guarantee that the general cubic polynomial function ¦(x) = ax³ + bx² + cx +d has a local max value of 1 when x = -1 and a local min value of 0 when x = 1?