Find a flux of the vector field ä(M)= (2z– y)i +6xj + ykthrough a part of the surface S: x-4y+2z-4=0, created asa result of intersection of the plane S with coordinate planes.please use given formulaCalculation of a FLUX, using the 1" kind surface integrala, = proj; ä =| ä |-cos Z(ā,ñ) =%3DD = J[ a, (M )dS = |=lä||n° ]- cos Z(ā,ñ") = ä - ñº.=10 = [[a(M)-ñ'dS%3D(35)where n°is a unit vector of the normal vector i to the surface S,n =+ grad F(x, y, z) is a normal vector to surface S: F(x,y,z)=0,as = 1+(z,)' +(z,)" dxdy for the regular with respect to zsurface S: 7 = P(x, y).

Given, a→M=2z-yi^ +6x j^ +y k^ Also given surface is, S: x-4y+2z-4=0 So the normal vector to the…

Answered: Find a flux of the vector field ä(M)=…

Find a flux of the vector field ä(M)= (2z– y)i +6xj + yk through a part of the surface S: x - 4y+2z – 4 =0, created as a result of intersection of the plane S with coordinate planes.

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Triple Integral

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Question

Find a flux of the vector field ä(M)= (2z– y)i +6xj + yk
through a part of the surface S: x-4y+2z-4=0, created as
a result of intersection of the plane S with coordinate planes.
please use given formula
Calculation of a FLUX, using the 1" kind surface integral
a, = proj; ä =| ä |-cos Z(ā,ñ) =
%3D
D = J[ a, (M )dS = |
=lä||n° ]- cos Z(ā,ñ") = ä - ñº.
=1
0 = [[a(M)-ñ'dS
%3D
(35)
where n°
is a unit vector of the normal vector i to the surface S,
n =+ grad F(x, y, z) is a normal vector to surface S: F(x,y,z)=0,
as = 1+(z,)' +(z,)" dxdy for the regular with respect to z
surface S: 7 = P(x, y).

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ISBN:

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Author:

Erwin Kreyszig

Publisher:

Wiley, John & Sons, Incorporated