Let r = (x2 + y?)/2 and consider the vector field F = r4(-yi + xj), where r 0 and A is a constant. F has no z-component and is indepen fz. a) Find curl (r4(-yi + xj)), and show that it can be written in the form url F = E rak, where a = , for any constant A. p) Using your answer to part (a), find the direction of the curl of the vector fields with each of the following values of A (enter your answer as a unit vector in th irection of the curl): 1= -7: direction = 1= 5: direction = :) For each values of A in part (b), what (if anything) does your answer to part (b) tell you about the sign of the circulation around a small circle oriented ounterclockwise when viewed from above, and centered at (1, 1, 1)? A = -7, the circulation is negative A = 5, the circulation is positive

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Let r = (x2 + y?)/2 and consider the vector field F = r4(-yi + xj), where r # 0 and A is a constant. F has no z-component and is independent of z. (a) Find curl (rA(-yi + xj), and show that it can be written in the form curl F = pak, where a = , for any constant A. (b) Using your answer to part (a), find the direction of the curl of the vector fields with each of the following values of A (enter your answer as a unit vector in the direction of the curl): A = -7: direction = A = 5: direction = (c) For each values of A in part (b), what (if anything) does your answer to part (b) tell you about the sign of the circulation around a small circle oriented counterclockwise when viewed from above, and centered at (1, 1,1)? If A = -7, the circulation is negative If A = 5, the circulation is positive (Be sure you can say how your answer in part (c) would change if the question were about a small circle centered at (0, 0,0).)