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13 Nov 2019
008 10.0 points First determine functions z=au+bu, y=cu+du so that (z, y) â (u, u) maps the parallelogram with vertices O = (0,0), C = (9, 1), B = (5, 2), D = (4,-1) in the xy-plane onto the rectangle with ver- tices 13 O = (0,0), B' = (0, ) 13 12), D' = 13 in the uv-plane. Then compute the Jacobian of this transformation 8(x, y)22 1. 0(u, u) = 13 0(u, u) = 13 0(u,v) = 13 2 3 0(z, y) 0(u, u) 20 13 4 = = θ(x,y) θ(u, u) 21 13 5 =
008 10.0 points First determine functions z=au+bu, y=cu+du so that (z, y) â (u, u) maps the parallelogram with vertices O = (0,0), C = (9, 1), B = (5, 2), D = (4,-1) in the xy-plane onto the rectangle with ver- tices 13 O = (0,0), B' = (0, ) 13 12), D' = 13 in the uv-plane. Then compute the Jacobian of this transformation 8(x, y)22 1. 0(u, u) = 13 0(u, u) = 13 0(u,v) = 13 2 3 0(z, y) 0(u, u) 20 13 4 = = θ(x,y) θ(u, u) 21 13 5 =
Jean KeelingLv2
12 Mar 2019