Consider in (x, y, z) space the vector field V(x, y,z) = function (2x + 3y, 2y + 3x, –4z) and the %3D F(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 . %3D b) Compute the tangential line integral of V along the right half of the unit circle in the (y, z) plane centered at (0,1,1) with an orientation of your choice.

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
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Consider in (x, y, z) space the vector field V(x, y,z) = (2x + 3y, 2y + 3x, –4z) and the
function
F(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 in
the (y, z) plane centered at (0,1,1) with an orientation of your choice.
Transcribed Image Text:Consider in (x, y, z) space the vector field V(x, y,z) = (2x + 3y, 2y + 3x, –4z) and the function F(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 in the (y, z) plane centered at (0,1,1) with an orientation of your choice.
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