Show that the differential equation x¹y³ + x(1+y¹)y' = 0_ is notexact, but becomes exact when multiplied by the integrating factorThen solve the equation.μ(x, y)=1xy5*The given equation is not exact, because My :which is different from N =1+y405 x² yAfter multiplication with u(x, y), the equation is exact, because thenMy = N₂ =-The general solution of the differential equation is given implicitly by=c, for any constant c, where y+04 In y

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Answered: Show that the differential equation…

Show that the differential equation x¹y³ + x(1+y¹)y' = 0 is not exact, but becomes exact when multiplied by the integrating factor Then solve the equation. μ(x, y) = 1 xy5*

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Question

Show that the differential equation x¹y³ + x(1+y¹)y' = 0_ is not
exact, but becomes exact when multiplied by the integrating factor
Then solve the equation.
μ(x, y)
=
1
xy5*
The given equation is not exact, because My :
which is different from N =
1+y4
0
5 x² y
After multiplication with u(x, y), the equation is exact, because then
My = N₂ =
-
The general solution of the differential equation is given implicitly by
=
c, for any constant c, where y
+04 In y

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