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Question: a ximeraosuedu exercise the base of a solid is the...

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a ximera.osu.edu Exercise. The base of a solid is the region in the zy-plane bounded by y 6- y 2 4z. The cross-sections through the solid taken parallel to the y-axis are semicircles. and 6-2 Exercise. To express the volume as an integral, we must: integrate with respect to r integrate with respect to y Correct Exercise. Now, set up an integral to compute the volume of this solid then evaluate it to find the volume of the solid An integral that gives the volume of the solid is: An integral that glvhe 1/2(6-2x 24x Chat Evaluating it, we find the volume of the solid is cubic units, (type an exact answer in terms of π) 1/(2pi)(18-33
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