Let R be the region in the unit circle lying above the cut with the line y = mx + b
Chapter 6, Problem 64(choose chapter or problem)
Let R be the region in the unit circle lying above the cut with the line y = mx + b (Figure 20). Assume that the points where the line intersects the circle lie above the x-axis. Use the method of Exercise 63 to show that the solid obtained by rotating R about the x-axis has volume V = 6 hd2, with h and d as in the figure. x2 + y2 = 1 y = mx + b
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