Let S be the surface in the xy-plane defined by the inequalities |æ|+ |y| < 1, k. Verify the Stokes Theorem for and supplied with the normal vector field n = this surface and the vector field F = x³j. (I. e. calculate both integrals.)

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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Let S be the surface in the xy-plane defined by the inequalities, and supplied with the normal vector field n=k. Verify Stokes' theorem for this surface and the vector field F= x^3 j. (i.e. calculate both integrals)

Let S be the surface in the xy-plane defined by the inequalities |æ|+ |y| < 1,
k. Verify the Stokes Theorem for
and supplied with the normal vector field n =
this surface and the vector field F = x³j. (I. e. calculate both integrals.)
Transcribed Image Text:Let S be the surface in the xy-plane defined by the inequalities |æ|+ |y| < 1, k. Verify the Stokes Theorem for and supplied with the normal vector field n = this surface and the vector field F = x³j. (I. e. calculate both integrals.)
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