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Determine whether or not f is a conservative vector field. If it is, find a function f such that f = ∇f. (if the vector field is not conservative, enter dne. ) f(x, y) = (y2 − 6x)i 2xyj

User Mmdc
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1 Answer

20 votes
20 votes

It looks like the vector field is


\vec f(x,y) = (y^2-6x) \, \vec\imath + 2xy \, \vec\jmath


\vec f is conservative if we can find a scalar function
f(x,y) whose gradient is
\vec f. This entails solving the partial differential equations


(\partial f)/(\partial x) = y^2 - 6x


(\partial f)/(\partial y) = 2xy

Integrate both sides of the second PDE with respect to y :


\displaystyle \int (\partial f)/(\partial y) \, dy = \int 2xy \, dy \implies f(x,y) = xy^2 + g(x)

Differentiate with respect to x and solve for
g(x) :


(\partial f)/(\partial x) = y^2 - 6x = y^2 + (dg)/(dx) \implies (dg)/(dx) = -6x \implies g(x) = -3x^2+C

It follows that
\vec f is indeed conservative with potential function


f(x,y) = xy^2 - 3x^2 + C

User Emilyk
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