Let us verify Stokes' theorem using thevector field F = (x2 - y)i + 4zj + x2k, wherethe closed contour consists of the x and ycoordinate axes and that portion of thecircle2 + y2 = a2that lies in the first quadrant with z = 1

We are given a 3d vector field and a cloced conture, using which we have to justify the Stoke's…

Answered: Let us verify Stokes' theorem using the…

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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Use Stokes' Theorem to find the work done on a particle moves along the line segments from the origin to the points (2,0,0) (2,4,3) , (0,4,3). and back to the origin. Note that this (counterclockwise) path is a rectangle on the plane z = 3/4 y. The motion is under the influence of the force field F = z2 i+ 2xy j + 4y2 k
Find both the vector equation and the parametric equations of the line through (0,0,0) that is perpendicular to both u = (0,2,-2) and w= point. The vector equation is (x,y,z) = ([ + (1,0,1) where t= 0 corresponds to the given
Use Stokes' theorem to evaluate | (curl F· N) dS for the vector field and surface. F(x, y, z) = 6yi + zj + 4yk and S is the hemisphere z = V9 - x2 - y2 using the upward normal vector
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Let us verify Stokes' theorem using the vector field F = (x 2 - y)i + 4zj + x 2k, where the closed contour consists of the x and y coordinate axes and that portion of the circle 2 + y 2 = a 2 that lies in the first quadrant with z = 1