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 byv = (x – y, z + y + 9, z?) and the net is decribed by the equation y = V1- x2 - z?, y > 0, and oriented in the positive y-direction.(Use symbolic notation and fractions where needed.)v • dS =Incorrect

Given that v=<x-y, z+y+9, z2> and the given curve is y=1-x2-z2,y≥0 To find: The value of ∬S…

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 (x - y, z + y + 9, z2) and the net is decribed by the equation y = V1 – x² – z?, y 2 0, and oriented in the positive y- direction. (Use symbolic notation and fractions where needed.) v• dS

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 (x - y, z + y + 9, z2) and the net is decribed by the equation y = V1 – x² – z?, y 2 0, and oriented in the positive y- direction. (Use symbolic notation and fractions where needed.) v• dS

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter8: Applications Of Trigonometry

Section8.3: Vectors

Problem 60E

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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 given by
v = (x – y, z + y + 9, z?) and the net is decribed by the equation y = V1- x2 - z?, y > 0, and oriented in the positive y-
direction.
(Use symbolic notation and fractions where needed.)
v • dS =
Incorrect

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