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(5) (a) Suppose that S is the boundary of a region in R3. It is known that (i) Explain this result in terms of Stokes's theorem. (ii) Explain this result in terms of Divergence Theorem (b) Suppose that n is the outward unit normal at any point on the surface S of a region V. Prove that the surface area of S is equal to ///v a dsdbrds.
(5) (a) Suppose that S is the boundary of a region in...
(7) Let V be the region in R3 enclosed by the surfaces+2 20 and z1. Let S denote the closed surface of V and let n denote the outward unit normal. Calculate the flux of the vector field F(x, y, z) = yi + (r2-zjy + ~2k out of V and verify Gauss Divergence Theorem holds for this case. That is, calculate the flux directly as a surface integral and show it gives the same answer as the triple integral...
3) Consider the vector field F-ra where a is a constant vector and let V be the region in R3 bounded by the surfaces r y24,1, z0. Find the outward flux of F i1n across the closed surface S of V
3) Consider the vector field F-ra where a is a constant vector and let V be the region in R3 bounded by the surfaces r y24,1, z0. Find the outward flux of F i1n across the closed surface S...
(a) [4]Use the Divergence Theorem to prove that ſſF. n dS = 8, S where S is the surface of the cube -15 x 51, -15y51, -15 z 51 oriented outward, and F(x, y, z) = (4y2, 32-cosx, z’ - x). (b) [1] Would it have been easier to just calculate the given surface integral directly? Explain.
1. Evaluate the surface Integrals using Divergence (Gauss') Theorem. a) ff(xyi +2k)ndS where S is the surface enclosing the volume in the first octant bounded by the planes z-O, y-x, y-2x, x + y+1-6 and n İs the unit outer normal to S. b) sffex.y,22)idS, where S is the surface bounding the volume defined by the surfaces z-2x2 +y, y +x2-3, z-0 and n İs the unit outer normal to S. o_ ffyi+y'j+zykids, where S is the ellipsoid.x^+-1 and iis...
I'll ask again, Please DON'T use the divergence
theroem, I cant do the surface integral.
(7) Let V be the region in R3 enclosed by the surfaces ++22,0 and1. Let S denote the closed surface of V and let n denote the outward unit normal. Calculate the flux of the vector field Fx, y, z)(2 - 2)j 22k out of V and verify Gauss' Divergence Theorem holds for this case. That is, calculate the flux directly as a surface integral...
6. (12pts) Use the divergence theorem to find the flux F.ndS with outward pointing normal n with F(x, y, z) =< x2,-y, z >, where s is the surface of the hemisphere z = V 1-x2-y2 and its base in the xy plane.
6. (12pts) Use the divergence theorem to find the flux F.ndS with outward pointing normal n with F(x, y, z) =, where s is the surface of the hemisphere z = V 1-x2-y2 and its base in...
Please only answer if you know how. Please show full workings.
Regards
(3) Consider the vector field Fa where a is a constant vector and let V be the region in R3 bounded by the surfaces2 +y2-4, 1,z-0. Find the outward flux of F onsider the vector ће across the closed surface S ofV.
(3) Consider the vector field Fa where a is a constant vector and let V be the region in R3 bounded by the surfaces2 +y2-4, 1,z-0....
We were unable to transcribe this imageLet us denote the volume and the surface area of an n-dimensional sphere of adius R as V(OR)-VR and S(R)-S.),respectively (a) Find the relation between V(0) and S 1) (b) Calculate the Gaussian integral 3. (c) Calculate the same integral in spherical coordinates in terms of the gamma function re)-e'd (d) Obtain the closed forms of S,,(1) and V(1) (e) Calculate r5) and S.,0), p.(1) for n-1, 2, 3. (40 points)
Let us denote...
5. Calculate the surface area of the portion of the sphere x2+y2+12-4 between the planes z-1 and z ะไ 6. Evaluate (xyz) dS, where S is the portion of the plane 2x+2y+z-2 that lies in the first octant. 7. Evaluate F. ds. a) F = yli + xzj-k through the cone z = VF+ア0s z 4 with normal pointing away from the z-axis. b) F-yi+xj+ek where S is the portion of the cylinder+y9, 0szs3, 0s r and O s y...