Analyze and sketch the following function using the algorithm for curve sketching f(x) = 3x¹ - 16x³ 16x + 18x Algorithm for Curve Sketching 1. Determine any restrictions in the domain. State any horizontal and vertical asymptotes or holes in the graph. 2. Determine the intercepts of the graph 3. Determine the critical numbers of the function (where is f'(x) = 0 or undefined) 4. Determine the possible points of inflection (where is f"(x)=0 or undefined) 5. Create a sign chart that uses the critical numbers and possible points of inflection as dividing points. 6. Use the sign chart to find intervals of increase/decrease and the intervals of concavity. Use all critical numbers, possible points of inflection, and vertical asymptotes as dividing points. 7. Identify local extrema and points of inflection 8. Sketch the function

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6.4 Analyze and sketch the following function using the algorithm for curve sketching f(x) = 3x¹- 16x³ + 18x² Algorithm for Curve Sketching 1. Determine any restrictions in the domain. State any horizontal and vertical asymptotes or holes in the graph. 2. Determine the intercepts of the graph 3. Determine the critical numbers of the function (where is f'(x) = 0 or undefined) 4. Determine the possible points of inflection (where is f"(x)=0 or undefined) 5. Create a sign chart that uses the critical numbers and possible points of inflection as dividing points. 6. Use the sign chart to find intervals of increase/decrease and the intervals of concavity. Use all critical numbers, possible points of inflection, and vertical asymptotes as dividing points. 7. Identify local extrema and points of inflection 8. Sketch the function