using this formula 2. Evaluate the surface integral F. dS, where F(x, y, z) = xi+yj+zk is taken over the paraboloid z=1 – x2 - y2, z > 0. SA errom bove de SS (-P (- Puerto Q + R) dA dy
(10 pts) Evaluate the surface integral | F. ndo where F = x'i+y’j + zk and S is the portion of the plane z = y + 1 that lies inside the cylinder 12 + y2 = 1.
Evaluate the surface integral of IjF.dS where F-xi+yj-zk and σ is the (a) 2, oriented by a downward portion of z-Vx2+y which lies between z1 and normal. Evaluate the surface integral of IjF.dS where F-xi+yj-zk and σ is the (a) 2, oriented by a downward portion of z-Vx2+y which lies between z1 and normal.
S SSF. ds, where F = ci + yj + 2zk and S is the portion of the surface z = 1 - 22 - y2 above the xy-plane, with upward orientation.
1, Evaluate Jsx2ds where s is the portion of the cylinder 22ヤU-9 lying between z-1 and 22. 2. Let F(, y, z)i+ j + zk. Use the divergence thecrem to compute s F.ds where S is the portion of the cylinder x2 +y2-4 lying between z 1 and-2. 1, Evaluate Jsx2ds where s is the portion of the cylinder 22ヤU-9 lying between z-1 and 22. 2. Let F(, y, z)i+ j + zk. Use the divergence thecrem to compute s...
xi+ yj + zk 3. Given the vector field in space F(x, y, z) = or more conveniently, (.x2 + y2 + 22)3/2 1 Fr) where r = xi + yj + zk and r= ||1|| = x2 + y2 + x2 (instead of p) 73 r (a) [10 pts) Find the divergence of F, that is, V.F. (b) (10 pts] Directly evaluate the surface integral [/F F.Nds where S is the unit sphere 22 + y2 + z2 1...
Q1. Evaluate the line integral f (x2 + y2)dx + 2xydy by two methods a) directly, b) using Green's Theorem, where C consists of the arc of the parabola y = x2 from (0,0) to (2,4) and the line segments from (2,4) to (0,4) and from (0,4) to (0,0). [Answer: 0] Q2. Use Green's Theorem to evaluate the line integral $. F. dr or the work done by the force field F(x, y) = (3y - 4x)i +(4x - y)j...
XZ 7. Use divergence the reom to calculate the surface integral Sss Fods F = 1rr, where r=xi ty j tak and s consists the hemisphere 2= V1x2 - y2 and the disk x?ty? al the xy-plane.
Let F(x, y, z) = xi + yj + zk and S be the surface defined by z = 9 – 22 - y2 and 2 > 0. Evaluate SsFinds, where n is the upward unit normal vector.
Evaluate the surface integral F.ds for the given vector field F and the oriented surface S. In other words, find the flux of F across S. For closed surfaces, use the positive (outward) orientation F(x, y, 2) = -xi - 1 + zk, Sis the part of the cone 2 V x2 + y2 between the planes 2 = 1 and 2 - 6 with downward orientation