Let V be the volume of the solid bounded above by thehemisphere z = 1 r2 and bounded
Chapter 14, Problem 3(choose chapter or problem)
Let \(V\) be the volume of the solid bounded above by the hemisphere \(z=\sqrt{1-r^{2}}\) and bounded below by the disk enclosed within the circle \(r=\sin \theta\). Expressed as a double integral in polar coordinates, \(V=\)_____ .
Equation Transcription:
_____
Text Transcription:
V
z=sqrt 1-r^2
r=sin theta
V=_____
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