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13 Nov 2019
1 point) Verify Stokes' theorem for the helicoid Ψ(r, θ-(r cos θ, r sin θ, θã where (r, θ) lies in the rectangle 10, j X [O, Ï/2), and F is the vector field First, compute the surface integral iii ,b=pi/2 i and f(n ) = Finally, the value of the surface integral is Next compute the line integral on that part of the boundary from (1,0,0) to (0, 1, Ï/2). IcF . dr = la [email protected] (use "t" for theta) ,b= E and g(0) i (use "t" for theta).
1 point) Verify Stokes' theorem for the helicoid Ψ(r, θ-(r cos θ, r sin θ, θã where (r, θ) lies in the rectangle 10, j X [O, Ï/2), and F is the vector field First, compute the surface integral iii ,b=pi/2 i and f(n ) = Finally, the value of the surface integral is Next compute the line integral on that part of the boundary from (1,0,0) to (0, 1, Ï/2). IcF . dr = la [email protected] (use "t" for theta) ,b= E and g(0) i (use "t" for theta).
Trinidad TremblayLv2
2 Jun 2019