question 3 

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Exercise 1: Find the volume of the surface of revolution generated by revolving the following regions about the x-axis. (a) y = x2, y = 9 (b) y = Vx, x + y = 6, y = 1 (c) y = cos x, y = x + 1, x = 1/2 (d) y = V1 – x², x + y = 1 (e) y = x/2 – x, y = 0 Exercise 2: Find the volume of the surface of revolution generated by revolving the following regions about the y-axis. (a) y = x², y = T (b) y = x, y = 2x, y = 4 (c) x = |y|, x = 2 – y² (d) x = y?, x = 2 – y? (e) y = 1/x, y = 2/x, x = 1, x = 3 Exercise 3: Consider the ellipse b²x² + a²y² = a²b² (with a, b > 0 constants). (a) Find the volume of the surface of revolution given by revolving the ellipse about the x-axis. (b) Find the volume of the surface of revolution given by revolving the ellipse about the y-axis. Exercise 4: Suppose that a sphere is cut at two planes given by y = a and y = b with a < b. What is the volume of the upper portion of this sphere (a spherical cap)? What is the volume of the middle portion of this sphere? Exercise 5: Find the volume generated by revolving the region bounded by y = cos x, y = 0, and x = 0 about the y-axis. (Hint: Homework 2, 2(e).) Exercise 6: Find the volume of the surface of revolution generated by revolving the region bounded by y? = 4.x and y = x about the line x = 4. Remark: I would give more problems about revolving things not about axes, but the above is already a lot of problems so I'll stop here.