Question: A net is dipped in a river. Determine the flow rate of water across the net if the velocity vector field for the river is
A net is dipped in a river. Determine the flow rate of water across the net if the velocity vector field for the river is given by \(\mathbf{v}\) and the net is described by the given equations.
\(\mathbf{v}=\left\langle x-y, z+y+4, z^{2}ightangle\), net given by \(y=\sqrt{1-x^{2}-z^{2}}, y \geq 0\), oriented in the positive \(y\)-direction
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Parametrize the net by a variant of cylindrical coordinates x r cos z r sin y y x r cos z r sin y y just as in the previous two exercises The paramete... View full answer
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