lindrical coordinates, let w = z2S+s²@+s² sin² cylindrical surface shown below (where da is pic the direction of the line integral chosen for the cir sa radius of 1 unit, and a height of 2 units both abo

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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1)
In cylindrical coordinates, let w = z2S+s²0 + s² sin² p 2. Verify stokes
theorem for the cylindrical surface shown below (where da is picked to be in the +
direction). Show the direction of the line integral chosen for the circular boundary.
The cylinder has a radius of 1 unit, and a height of 2 units both above and below the xy
plane.
Transcribed Image Text:1) In cylindrical coordinates, let w = z2S+s²0 + s² sin² p 2. Verify stokes theorem for the cylindrical surface shown below (where da is picked to be in the + direction). Show the direction of the line integral chosen for the circular boundary. The cylinder has a radius of 1 unit, and a height of 2 units both above and below the xy plane.
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