Homework SourseGo with Fieldxy ex Cosy ex Siny Calculate rotational Fieldx
Go with: Field[x,y] = {-e^x Cos[y], e^x Sin[y]}
Calculate rotational Field[x, y].
What does your result tell you about the net flow of Field[x, y] along the circle (x-1)^2 + (y-6)^2 = 49?
Answers:
A. It varies depending on the point {x,y}
B. The net flow is counterclockwise
C. none of these
D. There is no net flow
E. The net flow is clockwise
Calculate rotational Field[x, y].
What does your result tell you about the net flow of Field[x, y] along the circle (x-1)^2 + (y-6)^2 = 49?
Answers:
A. It varies depending on the point {x,y}
B. The net flow is counterclockwise
C. none of these
D. There is no net flow
E. The net flow is clockwise
Solution
E. The net flow is clockwise![Go with: Field[x,y] = {-e^x Cos[y], e^x Sin[y]} Calculate rotational Field[x, y]. What does your result tell you about the net flow of Field[x, y] along the cir](/WebImages/28/go-with-fieldxy-ex-cosy-ex-siny-calculate-rotational-fieldx-1076932-1761564981-0.webp "Go with: Field[x,y] = {-e^x Cos[y], e^x Sin[y]} Calculate rotational Field[x, y]. What does your result tell you about the net flow of Field[x, y] along the cir")
