Consider the solid Q bounded by the surfacesS₁: z-1=(y-2)², S₂: 1+y=2, S3:2=0, S₁: y=0, S₁: z=0Let C be the boundary of the surface Sı, oriented as shown in the following figure:xS.F.An integral that allows us to determine the value ofA)²2x(y-2) dy drB)**-2(y-2) dy dr0C) **(0,2,0) - √4(y - 2)² + 1 dy drD)²² (-2(1 + (y-2)²)(y-2) + y) dr dyF.dr.whereF(x, y, z) = (zz, z, y), is:

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Answered: Consider the solid Q bounded by 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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7. Let F(x, y,z)=-2yi +2xj. Use Stokes' Theorem to find F-dr where C is a circle (a) Parallel to the yz-plane, of radius a, centered at a point on the x-axis, with either orientation. (b) Parallel to the xy-plane, of radius a, centered at a point on the z-axis, oriented counterclockwise as viewed from a point on the z-axis above the circle.
Consider a surface defined by F(x, Y, z) = 0 whose gradient is (cos(r2), z² e", 2ze"). The equation of the tangent plane to the surface at the point (-2,0, 1) is O x + y+ 2z -1 = 0 x - y – 2z + 4 = 0 x – z + 3 = 0 O x + y + 2z = 0
Please need solution for number 7 and 8
Let F = (3z + 3x²) ¿+ (6y + 4z + 4 sin(y²)) 3+ (3x + 4y + 6e²²) k (a) Find curl F. curl F - (b) What does your answer to part (a) tell you about SF. dr where C' is the circle (x − 15)² + (y – 10)² = 1 in the xy-plane, oriented clockwise? ScF. dr = 0 (c) If C is any closed curve, what can you say about ScF. dr? SoF. dr = 0 (d) Now let C be the half circle - (x − 15)² + (y − 10)² = 1 in the xy-plane with y > 10, traversed from (16, 10) to (14, 10). Find SF. dr by using your result from (c) and considering C plus the line segment connecting the endpoints of C. -0 Lc F. dr =
2. Determine whether the given set is a subspace of the given space. If it is a subspace give a proof, if it is not give a counterexample. (a) V = R¹, S = (b) W = {[1]. a ER -b+c=0. V = R³. ab (c) W = (ar²+2x+e: a,care real numbers) V = P₂ (d) W = The set of all symmetric matrices (A= A). V= M₂x2(R).
Evaluate the unoriented line integral +y² + z²) ds along the parametric curve a : [0, 1] → R³ with a(t) = (t, cos(3t), sin(3t)). (2a² + y? + z²) ds =
Consider surface z = sin(T(3x+ 2y)) + x²y².
Evaluate /// 20° dV if G is a solid in the first octant bounded by the plane y +z 2 and the surface y = 1 – x².
6. Use the Stokes theorem to evaluate f Fdr where F (3x – 2y +32) i +(4x – 2y+32) 5 + (2x – 3y | 22) k and C is the circle: æ = 3, y? | 22 = 4, oricnted counterclockwisc when vicwcd from the positive part of x-axis. Describe the surface S whose boundary is C and state its orientation.

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