V=<x,x,x+y>;
Calculate the Stoke's theorem where S is the surface obtained by the intersection of a cylinder and a plane. Cylinder of radius R=3, with open upper lid the circle C, x^2+y^2=9. This cylinder has axis the z-axis, with z<=0. The cylinder is cut by plane of equation x + y + z =- 40. This surface looks like a water glass in normal position with its rim the circle C, but slanted (inclined) bottom in the z<0 region
The answer is 9
evaluate the line integrals as F.dr to be parameterised as
F(r(t)) * dr/dt
V=<x,x,x+y>; Calculate the Stoke's theorem where S is the surface obtained by the intersect...
a) Complete the statement of: Stoke's Theorem: Let S be an oriented surface bounded by a piecewise smooth simple closed curve with a positive orientation (i.e. clockwise relative to N). If F(x, y, z)=(M(x,y,z), N(x, y, z), P(x, y, z)) where M, N, and P have continuous partial derivatives in an open region containing Sand C, then: b) Use Stoke's theorem to write as an iterated integral, J. (y, -2', 1)odr where is the circle of radius 1 in the...
a) Draw a surface whose boundary in the curve C b) Use Stoke's Theorem to set up the alternative integral to Fodr Let C be the curve of intersection of the plane. X+2=6 and the cyclinder x² + y2 = 9. Where F(x, y, z)=<xy, 32, 7y) and C is the Curve of intersection of the plane X+Z²6 and the Cylinder x² + y2 =9 view as clockwise as above
Q4. 8pnts]If you haven't explored it yet, here is a magical property of the Stoke's theorem Suppose we have a vector field F(x,y, z) = -yi+ xj+ zk. Also, let C: x2y2 R2 for some R 0 be the curve in the xy-plane. Now, verify the Stoke's theorem when: (a) The surface S is given by the upper hemisphere 2y z2= R2,z0. R2 - y2, z 2 0. (b) The surface S is given by the paraboloid (c) The surface...
Use Stoke's Theorem to evaluate ScF. dr, where F(x, y, z) = -xzzi + y2zj + zºk and C is the curve of intersection of the planez = 1 – X – Y and the cylinder x2 + y2 = 1, oriented counterclockwise as viewed from above.
3] (a) Use Stoke's Theorem to evaluate ScF. dr by evaluating the related double inte- gral, where F(x, y, z) = (x2z, cy, 22) and C is the curve of intersection between the plane x+y+z=1 and the cylinder ? + y2 = 9 oriented clockwise when viewed from above. (b) Sketch a graph of both the plane and cylinder with so that the intersecting curve is clear. 2) Find the parametric equations for C and use them to sketch a...
10.) (19 pts.) Verify Stoke's Theorem for the Vector Field F(x, y, z) = (-y)ī+(x)]+(z)k, where Surface S is that portion of the paraboloid z = 6 - 22 - y2, which lies above the plane z = 2.
7. (a) State Stoke's Theorem. (b) Use Stoke's theorem to evaluate curl(F)d where F(x, y, z)-< x2 sin(z), y2, xy >, and s is the part of the paraboloid z = 1-2-1/2 that lies above the xy-plane. 7. (a) State Stoke's Theorem. (b) Use Stoke's theorem to evaluate curl(F)d where F(x, y, z)-, and s is the part of the paraboloid z = 1-2-1/2 that lies above the xy-plane.
1 Help Entering Answers 1 point) Use Stokes' Theorem to evaluateF.dr where F(x,y,z) 6yzi 3xzj +3e k and C is the circy4,z 5 oriented counterclockwise as viewed from above Since the circle is oriented counterclockwise as viewed from above the surface we attach to the circle is oriented upwards The easiest surface to attach to this curve is the disk x2 + y2 < 4, z-5. Using this surface in Stokes' Theorem evaluate the following. F-dr = where sqrt(4-xA2) sqrt(4-x^2)...
1 Use Stokes' theorem to evaluate the integrals: F(x, y, z) dr a) where F(r, y,z)(3yz,e, 22) and C is the boundary of the triangle i the plane y2 with vertices b) where F(x, y,z (-2,2,5xz) and C is in the plane 12- y and is the boundary of the region that lies above the square with vertices (3,5, 0), (3,7,0),(4,5,0), (4,7,0) c) where F(x, y,z(7ry, -z, 3ryz) and C is in the plane y d) where intersected with z...
7. (16pts) Use Stokes, Theorem to find ▽ × F . nd.S where s is the surface of the cube 0 < x < 1, 0Sy, and 0szS 1 with open bottom in the ry plane. F(x, y, z)-<y, -, z > and the normal field n is oriented so that it points up on the top surface. T, zand 7. (16pts) Use Stokes, Theorem to find ▽ × F . nd.S where s is the surface of the cube...