y=((x) y=god) Consider the blue vertical line shown above (click on graph for better view) connecting the graphs y = g(x) = Referring to this blue line, match the statements below about rotating this line with the corresponding statemen Previous Problem Problem List Next Problem 2. The result of rotating the line about the y-axis is 3. The result of rotating the line about the line y = 1 is 4. The result of rotating the line about the line x = -2 is 5. The result of rotating the line about the line x = 7 is 6. The result of rotating the line about the line y = -2 is 7. The result of rotating the line about the line y = 7 is 8. The result of rotating the line about the line y = -7 is A. an annulus with inner radius sin(2x ) and outer radius cos(a) B. a cylinder of radius x + 2 and height cos(x) - sin(2x) C. an annulus with inner radius 7 + sin(2x) and outer radius 7 + cos(a) D. an annulus with inner radius 1 - cos(a) and outer radius 1 - sin(2x) E. an annulus with inner radius 2 + sin(2x) and outer radius 2 + cos(a) F. an annulus with inner radius 7 - cos() and outer radius 7 - sin(2x) G. a cylinder of radius 7 - x and height cos(x) - sin(2x) H. a cylinder of radius a and height cos(x ) - sin(2x)Use the method of cylindrical shells to find the voiume of the solid obtained by rotating the region bounded by x = . :5 = D and y = 9, about the .1: axis. The region bounded by y = a and y = sin(x/2) is rotated about the line x = -7. Using cylindrical shells, set up an integral for the volume of the resulting solid. The limits of integration are: and the function to be integrated is:Use the method of cylindrical shells to find the volume of the solid obtained by rotating the region bounded by y = 5va and y = 5x about the y axis.The region bounded by y = 7/(1 + 272), y = 0. :3 = [i and :1: = 7 is rotated about the line 3 = 7. Using cylindrical shells, set up an integral for the volume of the resulting solid. The limits of integration are: a=ll b=l1l and the function to be integrated is: l l The region bounded by m2 y2 : 9 and w : 5 is rotated about the line 3,: : 6. Using cylindrical shells, set up an integral for the volume of the resulting solid. The limits of integration are: a = i_i b = |:_| and the function to be integrated is: l l