Exercise 2 CONSERVATIVE VECTOR FIELD. -y The vector field F(r, y) = is defined on the region D = {(x, y) # (0, 0)}. (ax2 + y2)' (22 + y?), (i) Is D a simply connected region? (ii) Show that F satisfies the cross-partials condition. Does this guarantee that F is conservative? (iii) Show that F is conservative on D by finding a potential function.

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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Exercise 2 CONSERVATIVE VECTOR FIELD.
-y
The vector field F(r, y)
is defined on the region D =
{(x, y) # (0, 0)}.
(a² + y²) ' (x² + y²) /
(i) Is D a simply connected region?
(ii) Show that F satisfies the cross-partials condition. Does this guarantee that F is conservative?
(iii) Show that F is conservative on D by finding a potential function.
Transcribed Image Text:Exercise 2 CONSERVATIVE VECTOR FIELD. -y The vector field F(r, y) is defined on the region D = {(x, y) # (0, 0)}. (a² + y²) ' (x² + y²) / (i) Is D a simply connected region? (ii) Show that F satisfies the cross-partials condition. Does this guarantee that F is conservative? (iii) Show that F is conservative on D by finding a potential function.
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