Verify Stokes’ Theorem, given F (x,y,z) = < y,-x,yz > , and the region S of the surface z = x^2 + y^2 below z = 1.
b) Verify the Stokes' theorem where F = (2x - y)i + (x +z)j + (3x – 2y)k and S is the part of z = 5 – x2 - y2 above the plane z = 1. Assume that S is oriented upwards.
3. Verify Stokes' Theorem for the vector field F(x, y, z)= (x2)ĩ+(y2)]+(-xy)k where S is the surface of the cone +y parametrized by (u,v)-(ucos v, u sin v, hu) x2+y2 a at height h above the xy-plane Z = a V 0<vsa, OSvs 2n, and as is the curve parametrized by ē(f) =(acost,asint, h), 0sis27 as x2+ a
3. Verify Stokes' Theorem for the vector field F(x, y, z)= (x2)ĩ+(y2)]+(-xy)k where S is the surface of the cone +y parametrized...
4. (18 points) Verify Stokes' Theorem in finding the counterclockwise circulation of the vector field, F - (r-i + (42)j + (r) k around the curve, C, where C is the triangular path determined by the points (6,0,0),(0,-4,0),and (0,0,10) . (i.e. calculate the circulation % F.iF directly, and then by using Stokes' Theorem and doing a surface integral.) Which way was easier? (Hint: You will need to find the equation of the plane that goes through these three points.)
4....
solve using direct method then prove using Stokes’ theorem
3 Verify Stok sa theorem, for v = ys_ yz,3r+ 2x2, x3 +v) and C's the curve of intersection of the ,+y and C is the curve of intersection of the sphere x2 + y2 + 22-25 and the plane 2--4 1) Verify Stokes, theore G Verifty Stokes' theorem for F (u-x.v) over the part of the paraboloid: 2(a2+1') for which
3 Verify Stok sa theorem, for v = ys_ yz,3r+...
Stokes' Theorem Verify Stokes' Theorem by evaluating each side of the equation in the theorem Here, F (x2 y, y2 - z2,z2 -x2) S is the plane x + y z 1 in the first octant, oriented with upward pointing normal vector, and y is the boundary of S oriented counterclockwise when seen from above. State Stokes' Theorem in its entirety Sketch the surface S and curve, y Explain in detail how all the conditions of the hypothesis of the...
3. Consider the vector field A = (x – z)i + (x3 + yz)j – 3xyềk. Use Stokes' theorem to calculate S/CD x A) . nds where S is the surface of the cone z = 2 - V x2 + y2 above the zy plane. You may use the formula n cos" u du = – cos”- u sin u + 2 -1 [ cos”-2 u du.
1. Gauß theorem / Divergence Theorenm Given the surface S(V) with surface normal vector i of the volume V. Then, we define the surface integral fs(v) F , df = fs(v) F-ndf over a vector field F. S(V) a) Evaluate the surface integral for the vector field ()ze, - yez+yz es over a cube bounded by x = 0,x = 1, y = 0, y = 1, z 0, z = 1 . Then use Gauß theorem and verify it....
5. State Stokes' theorem and verify it for F (32, 2r, y) with S being the open paraboloid z = 2+y with height 4. With which simpler surface could you replace the paraboloid for the same contour? verify Stokes the orem to
5. State Stokes' theorem and verify it for F (32, 2r, y) with S being the open paraboloid z = 2+y with height 4. With which simpler surface could you replace the paraboloid for the same contour? verify...
4. Consider the vector field A - (x - 322)i [3 sin(xyz)]j - 3ry2 k. Use Stokes' theorem to calculate where S is the surface of the cone z 1-VT2 + y2 above the TU plane.
4. Consider the vector field A - (x - 322)i [3 sin(xyz)]j - 3ry2 k. Use Stokes' theorem to calculate where S is the surface of the cone z 1-VT2 + y2 above the TU plane.