Consider in (x, y, z) space the vector field V(x, y,z) = (2x + 3y, 2y + 3x, –4z) and thefunctionF(x,y,z) = a · x² + b•y² + c•z² +d •x • y, (x,y,z) E R³.a) Find constants a, b,c and d so that V = VF .b) Compute the tangential line integral of V along the right half of the unit circle inthe (y, z) plane centered at (0,1,1) with an orientation of your choice.

Given : vector field Vx, y, z=2x+3y, 2y+3x, -4z and the function Fx, y,…

Answered: Consider in (x, y, z) space the vector…

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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Consider inner-product =| f(x)g(x) dx defined for vector space C[-1, 1] , then for the function f(x) = 3 x the inner-product equals: -1 Select one: а. 6 O b. 3 О с. 1 O d. zero
Compute the flux of the vector field F = 5yi +37-5xzk through the surface S, which is the surface y = x² + 2², with x² + 2² ≤ 1, oriented in the positive y-direction. flux = You can get a hint after 2 incorrect answers.
1. Consider two vector fields: F1(x, y) = -yi+ xj and F2(7) = F. (a) Evaluate F and F, at the given points. (x, y) (1,0) (0, 1) (-1,0) (0, –1) F(r, y) F(1, y) (т, у) (1,1) (-1,1) (-1,–1) (1, –1) F(1, y) F(x, y) On the grids shown below, sketch above vectors of vector fields F (b) and F. F;(x, y) = -yi + xj F2(F) = F.
Compute the flux of the vector field (x¹, — xy³), out of the rectangle with vertices (0,0), (4,0), (4,6), and (0,6).
Match each of the following three vector fields to one of the four vector fields graphed below (yes, one graph does not have a match), and then explain your thinking: 1. (a) F(x, y) = (2y, 2.r). Match (circle one): I II III IV (b) F(x, y) = (x², 2y). Match (circle one): I II III IV (c) F(x, y) = (x², y²). Match (circle one): I II III IV (d) Explain your choices. Explanation:
The vector field F(x,y)= can be written as: O1. F(x,y)=(xy+x2 )i - (8)j O II. F(x,y)=(xy+x² )i + (2-10)j O II. (x,y)=(xy-2)i + (x² -10)j O IV. F(x,y)=x(y+x)i + (2 -10)j
G is a vector field defined as G = Bxlnzi + Dy zj + (+ y³) k. b) If C is the straight line from (1,1,1) to (2,1,2) find S, 2xlnzdx + 2y²zdy +y dz.
What are V-F and VX F for the vector field F(x,y,z) = 3x²zi-ye*j - y²zk? OV.F = x²exy 2 VXF = x²i-3e²j+yk OF=3x²-xe* + 2yz VXF = 2i-3j-k V-F = 3x²-x-z VXF= -2yi+ 3xj + zk V-F = 6xz-e* - y² VXF = -2yzi + 3x²j-ye*k

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