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Finding the area of a surface of revolution. = Area of a surface of revolution for y = f(x). Let f(x) be a nonnegative smooth function (smooth means continuously differentiable) over the interval (a, b). Then, the area of the surface of revolution formed by revolving the graph of y = f(x) about the z-axis is given by s/* = [*2=512) = 27 f(x)/1+ [f'(x) dx a Part 1. Setup the integral that will give the area of the surface 23 generated by revolving the curve f(x) = over the interval 7 2,6) about the x-axis. S S = Part 2 Calculate the area of the surface of revolution described above. Round answer to three decimal places. S units squared.