Let S be a solid of revolution obtained by rotating the finite region bounded by the...

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Let S be a solid of revolution obtained by rotating the finite region bounded by the curves y = sin x, x = Slicing/Disk A=T f/² cos² xdx B= π πT Sπ/2₁ sin? adr Tf¹ (arcsin x)²dx D=T ¹ (arccos x)²dx C=T Shell E=2π ₁¹ y arcsin ydy F=2π ₁/² y(- arcsin y)dy G=2π fy(arcsin y)dy H=27 | æ sin xdæ By using the disk/slicing method, we obtain the volume of the solid S by the following integral By using the cylindrical shell method, we obtain the volume of the solid S by the following integral and x-axis. Choose... Choose... Let S be a solid of revolution obtained by rotating the finite region bounded by the curves y = sin x, x = Slicing/Disk A=T f/² cos² xdx B= π πT Sπ/2₁ sin? adr Tf¹ (arcsin x)²dx D=T ¹ (arccos x)²dx C=T Shell E=2π ₁¹ y arcsin ydy F=2π ₁/² y(- arcsin y)dy G=2π fy(arcsin y)dy H=27 | æ sin xdæ By using the disk/slicing method, we obtain the volume of the solid S by the following integral By using the cylindrical shell method, we obtain the volume of the solid S by the following integral and x-axis. Choose... Choose...