PM The base of a certain solid is the area bounded above by the graph of y = f(x) = 9 and below by the graph of y = g(x) = 4x². Cross-sections perpendicular to the x-axis are squares. (See picture above, click for a better view.) Use the formula -A(z) dz V = to find the volume of the solid. The lower limit of integration is a = The upper limit of integration is b = 9. The sides of the square cross-section is the following function of x: A(x)= Thus the volume of the solid is V. = 9.

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PM PM The base of a certain solid is the area bounded above by the graph of y = f(x) = 9 and below by the graph of y = g(x) = 4x². Cross-sections perpendicular to the x-axis are squares. (See picture above, click for a better view.) Use the formula to find the volume of the solid. The lower limit of integration is a = The v = f* A(z) dz V 4. e upper limit of integration is b = The sides of the square cross-section is the following function of x: A(x)= Thus the volume of the solid is V = 8.