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13 Nov 2019
Submit your assignment Q1 (4 points) Use Green's Theorem to find the counterclockwise circulation and outward flux for the vector field and curve C consisting of the segment of the parabola y=X"from (0, 0) to (1,1), and the segment of the parabola x=y2 from ( 1,1 ) to (0,0). + Drag and drop your images or click to browse... Q2 (3 points) Apply Green's Theorem to evaluate the integral where C is the triangle bounded by the lines y = 0,x = 3 and y = x with counterclockwise orientation. + Drag and drop your images or click to browse.. Q3 (3 points) Consider the vector field F=yzi+(z2-y,j-yzk. defined on IR3 1. Compute the curl of F 2. Use your answer to a) to explain why F cannot be a conservative vector field. 3. Verify that div(curl F) = 0. + Drag and drop your images or click to browse...
Submit your assignment Q1 (4 points) Use Green's Theorem to find the counterclockwise circulation and outward flux for the vector field and curve C consisting of the segment of the parabola y=X"from (0, 0) to (1,1), and the segment of the parabola x=y2 from ( 1,1 ) to (0,0). + Drag and drop your images or click to browse... Q2 (3 points) Apply Green's Theorem to evaluate the integral where C is the triangle bounded by the lines y = 0,x = 3 and y = x with counterclockwise orientation. + Drag and drop your images or click to browse.. Q3 (3 points) Consider the vector field F=yzi+(z2-y,j-yzk. defined on IR3 1. Compute the curl of F 2. Use your answer to a) to explain why F cannot be a conservative vector field. 3. Verify that div(curl F) = 0. + Drag and drop your images or click to browse...
Jamar FerryLv2
4 Jun 2019