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13 Nov 2019
(34 pts.) 4. For parts (a) through (d) find the work done by he given force FCx, y) in moving a particle along the given curve C in the xy-plane using the specified method. (a) Force: F(x. )-(x'y.-) C: Circle of radius 2 centered at (0, 0) oriented in the counterclockwise direction. Method: Compute the line integral directly, F(x,y)=(x,y,_xy2 C: Circle of radius 2 centered at (0, 0) oriented in the counterclockwise direction. (b) Force: Method: Use Green's Theorem. (c) Force: F(3y6x) C: The curve x2 +ã)-= l oriented in the counterclockwise direction Method: Any method discussed in class. (d) Force : F(x,y)=(e- r +3y-, e--'+6p) C: The arc of the curve x2 + Method: Any method discussed in class = 1 in the first quadrant from (1,0) to (0, 2).
(34 pts.) 4. For parts (a) through (d) find the work done by he given force FCx, y) in moving a particle along the given curve C in the xy-plane using the specified method. (a) Force: F(x. )-(x'y.-) C: Circle of radius 2 centered at (0, 0) oriented in the counterclockwise direction. Method: Compute the line integral directly, F(x,y)=(x,y,_xy2 C: Circle of radius 2 centered at (0, 0) oriented in the counterclockwise direction. (b) Force: Method: Use Green's Theorem. (c) Force: F(3y6x) C: The curve x2 +ã)-= l oriented in the counterclockwise direction Method: Any method discussed in class. (d) Force : F(x,y)=(e- r +3y-, e--'+6p) C: The arc of the curve x2 + Method: Any method discussed in class = 1 in the first quadrant from (1,0) to (0, 2).
Nestor RutherfordLv2
7 May 2019