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A particle is moved along the different ...

A particle is moved along the different paths `OAC, OBC & ODC` as shown in the figure . Path `ODC` is a parabola , `y=4x^(2)`. Find the work done by a forc `vec(F)=xyhat(i)+x^(2)yhat(j)` on the particle along these paths. Is this force a conservative force ?

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The correct Answer is:
`w_(OAC)=8J,w_(OBC)=2J;w_(ODC)=19//3j,No`
`(W_(F))_(OAC)=int (xydx+x^(2)ydy)`
`=underset(0)overset(A)int (xydx=x^(2)ydy)+underset(A)overset(C)int(xydx+s^(2)ydy)`
ON `OA` path `,`
`y=0,dy=0` and on `AC` path
`x=1.dx=0`
`(W_(F))_(OAC)=underset(0)overset(A)int (0.dx+0.dy)+underset(y=0)overset(y=4)int(0+1ydy)=8J`
`(W_(F))_(OAC)=0+underset(B)overset(C)int(xy dx+x^(2)ydy)`
`=underset(x=0)overset(1)int {x4x+x^(2)4(0)}=2J`
`=underset(0)overset(1)int (x4x^(2)dx+x^(2)4x^(2)8xdx)=1+(32)/(6)=(19)/(3)J`
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