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Let S be the part of the plane 1x+2y+z=2 which lies in the first oct.pdf

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Let S be the part of the plane 1x+2y+z=2 which lies in the first octant, oriented upward. Find the flux of the vector field F=4i+1j+2k across the surface S. Solution Using rectangular coordinates with z = 2 - 1x - 2y, n = (-dz/dx, -dz/dy, 1) = (1, 2, 1). The region R in the xy-plane is given by x + 2y = 2. Thus, flux = integral(R) F * n dA = integral(R) (4,1,2) * (1,2,1) dA = integral(R) (4*1+1*2+2*1) dA = integral(R) 8 dA = 19 * Area(R, which is a triangle) = 19 * ((1/1)*(1/2)/2) = 19/4..

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Let S be the part of the plane 1x+2y+z=2 which lies in the first octant, oriented upward. Find the flux of the vector field F=4i+1j+2k across the surface S. Solution Using rectangular coordinates with z = 2 - 1x - 2y, n = (-dz/dx, -dz/dy, 1) = (1, 2, 1). The region R in the xy-plane is given by x + 2y = 2. Thus, flux = integral(R) F * n dA = integral(R) (4,1,2) * (1,2,1) dA = integral(R) (4*1+1*2+2*1) dA = integral(R) 8 dA = 19 * Area(R, which is a triangle) = 19 * ((1/1)*(1/2)/2) = 19/4.

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Let S be the part of the plane 1x+2y+z=2 which lies in the first oct.pdf

  • 1. Let S be the part of the plane 1x+2y+z=2 which lies in the first octant, oriented upward. Find the flux of the vector field F=4i+1j+2k across the surface S. Solution Using rectangular coordinates with z = 2 - 1x - 2y, n = (-dz/dx, -dz/dy, 1) = (1, 2, 1). The region R in the xy-plane is given by x + 2y = 2. Thus, flux = integral(R) F * n dA = integral(R) (4,1,2) * (1,2,1) dA = integral(R) (4*1+1*2+2*1) dA = integral(R) 8 dA = 19 * Area(R, which is a triangle) = 19 * ((1/1)*(1/2)/2) = 19/4.