(1 point) Use the "mixed partials" check to see if the following differential equation is exact.If it is exact find a function F(x, y) whose differential, dF(x, y) gives the differential equation. That is, level curves F(x, y) =C are solutions to the differentialequation:dy223 + 2ydx-2x + y?First rewrite asM(x, y) dæ + N(x, y) dy = 0where M(x, y)and N(x, y)If the equation is not exact, enter not exact, otherwise enter in F(x, y) as the solution of the differential equation here= C.

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= C are solutions to the differential If it is exact find a function F(x, y) whose differential, dF(x, y) gives the differential equation. That is, level curves F(x, y) equation: dy 2x3 + 2y da -2x + y? First rewrite as M(x, y) dx + N(x, y) dy = 0 where M(x, y) = and N(x, y) If the equation is not exact, enter not exact, otherwise enter in F(x, y) as the solution of the differential equation here = C.

= C are solutions to the differential If it is exact find a function F(x, y) whose differential, dF(x, y) gives the differential equation. That is, level curves F(x, y) equation: dy 2x3 + 2y da -2x + y? First rewrite as M(x, y) dx + N(x, y) dy = 0 where M(x, y) = and N(x, y) If the equation is not exact, enter not exact, otherwise enter in F(x, y) as the solution of the differential equation here = C.

College Algebra (MindTap Course List)

12th Edition

ISBN:9781305652231

Author:R. David Gustafson, Jeff Hughes

Publisher:R. David Gustafson, Jeff Hughes

Chapter2: Functions And Graphs

Section2.6: Proportion And Variation

Problem 17E: Find the constant of proportionality. y is directly proportional to x. If x=30, then y=15.

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Question

(1 point) Use the "mixed partials" check to see if the following differential equation is exact.
If it is exact find a function F(x, y) whose differential, dF(x, y) gives the differential equation. That is, level curves F(x, y) =C are solutions to the differential
equation:
dy
223 + 2y
dx
-2x + y?
First rewrite as
M(x, y) dæ + N(x, y) dy = 0
where M(x, y)
and N(x, y)
If the equation is not exact, enter not exact, otherwise enter in F(x, y) as the solution of the differential equation here
= C.

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