Question

7. (16 pts) Using the steps learned in section 12.6, sketch the graph of f(x) = 2x$^3$ - 15x$^2$ + 24x a. What are the coordinates of the relative maxima? b. What are the coordinates of the relative minima? c. What are the coordinates of the points of inflection? d. Find any other points that are necessary for you to give a \"good\" graph. Show your work for whatever points you are using. e. Put all the info together and graph. 

          7. (16 pts) Using the steps learned in section 12.6, sketch the graph of
f(x) = 2x$^3$ - 15x$^2$ + 24x
a. What are the coordinates of the relative maxima?
b. What are the coordinates of the relative minima?
c. What are the coordinates of the points of inflection?
d. Find any other points that are necessary for you to give a \"good\" graph. Show
your work for whatever points you are using.
e. Put all the info together and graph.
Show more…
7. (16 pts) Using the steps learned in section 12.6, sketch the graph of f(x) = 2x^3 - 15x^2 + 24x a. What are the coordinates of the relative maxima? b. What are the coordinates of the relative minima? c. What are the coordinates of the points of inflection? d. Find any other points that are necessary for you to give a g̈oodg̈raph. Show your work for whatever points you are using. e. Put all the info together and graph.

Added by Antonia B.

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Calculus: Early Transcendentals
Calculus: Early Transcendentals
James Stewart 8th Edition
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Can someone help me? (7.16 pts) Using the steps learned in section 12.6, sketch the graph of f(x) = 2x^3 - 15x^2 + 24x. a. What are the coordinates of the relative maxima? b. What are the coordinates of the relative minima? c. What are the coordinates of the points of inflection? d. Find any other points that are necessary for you to give a good graph. Show your work for whatever points you are using. e. Put all the info together and graph.
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Transcript

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00:01 So here function given to us is f of x equals to x lon x so it is given to us that using derivative analysis we have to analyze the coordinates of the local extreme okay derivative analysis means we have to analyze the extremum value with respect to derivative we have to derivative for local extreme local extrema here means the local minima or local maxim that will do because that only we do so what we do here simple just find the derivative of the point function so it is d by dx of x lon x so what we'll get here we'll use the product tool first one derivative of second one plus second…
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