the absolute maximum over the interval [0,10]. 20- 15- 10- 5- 0+ 10

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**Problem Statement:** For the graph of \( y = f(x) \) shown to the right, find the absolute minimum and the absolute maximum over the interval \([0,10]\). **Graph Details:** - The graph is a curve plotted on a coordinate plane with \( x \)-axis ranging from 0 to 10 and \( f(x) \)-axis ranging from 0 to 20. - The curve begins at \( (0, 5) \), decreases to a local minimum near \( (3, 5) \), increases to a local maximum near \( (6, 10) \), and then rises steeply after \( x = 8 \) to reach approximately \( (10, 18) \). **Multiple Choice Options:** A. The absolute minimum is \(\square\) at \( x = \square \) and \( x = \square \). (Round to the nearest integer as needed. Use ascending order.) B. The absolute minimum is \(\square\) at \( x = \square \). (Round to the nearest integer as needed.) C. There is no absolute minimum.