Calculate curl(F) and then apply Stokes' Theorem to compute the flux of curl(F) through the surface in the figure using a line integral. 2a curl(F) = (0,a,2a) (a,0,2a) flux of curl(F) = a x+y=a The surface is a wedge-shaped box (bottom included, top excluded) with an outward-pointing normal. Assume that parameter a = 4. F = = (x + y₂ 2² - 64₁ x√√²+ (Express numbers in exact form. Use symbolic notation and fractions where needed.) y

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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Calculate curl(F) and then apply Stokes' Theorem to compute the flux of curl(F) through the surface in the figure using a
line integral.
2a
a
F =
curl(F) =
(0,a,2a)
*(a, 0,2a)
The surface is a wedge-shaped box (bottom included, top excluded) with an outward-pointing normal. Assume that
parameter a = 4.
: (x+y₁2² - 64₁x₁√√²+1)
(Express numbers in exact form. Use symbolic notation and fractions where needed.)
x+y=a
flux of curl(F) =
Transcribed Image Text:Calculate curl(F) and then apply Stokes' Theorem to compute the flux of curl(F) through the surface in the figure using a line integral. 2a a F = curl(F) = (0,a,2a) *(a, 0,2a) The surface is a wedge-shaped box (bottom included, top excluded) with an outward-pointing normal. Assume that parameter a = 4. : (x+y₁2² - 64₁x₁√√²+1) (Express numbers in exact form. Use symbolic notation and fractions where needed.) x+y=a flux of curl(F) =
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