Show that an implicit solution of2x sin2(y) dx – (x² + 11) cos(y) dy = 0is given by In(x2 + 11) + csc(y) = C.cos(y)Differentiating In(x2 + 11) + csc(y) = C we get2xdysin?(v)+x + 11dxor 2x sin2(y) dx +-cos (-)(2² + 11) - Jay = 0.Find the constant solutions, if any, that were lost in the solution of the differentialequation. (Let k represent an arbitrary integer.)In(x? + 11) + csc(v)| x

Answered: Image /qna-images/answer/20f0bb21-4624-491d-b48b-120610514c24.jpg

Show that an implicit solution of 2x sin2(y) dx – (x² + 11) cos(y) dy = 0 is given by In(x² + 11) + csc(y) = C. cos(y) 2x Differentiating In(x² + 11) + csc(y) = C we get dy dx 2 sin (y) x + 11 or 2x sin (y) dx + -cos (»)(?² + 11) ()(? + 11) dy = 0.

Show that an implicit solution of 2x sin2(y) dx – (x² + 11) cos(y) dy = 0 is given by In(x² + 11) + csc(y) = C. cos(y) 2x Differentiating In(x² + 11) + csc(y) = C we get dy dx 2 sin (y) x + 11 or 2x sin (y) dx + -cos (»)(?² + 11) ()(? + 11) dy = 0.

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

100%

Show that an implicit solution of
2x sin2(y) dx – (x² + 11) cos(y) dy = 0
is given by In(x2 + 11) + csc(y) = C.
cos(y)
Differentiating In(x2 + 11) + csc(y) = C we get
2x
dy
sin?
(v)
+
x + 11
dx
or 2x sin2(y) dx +
-cos (-)(2² + 11) - Jay = 0.
Find the constant solutions, if any, that were lost in the solution of the differential
equation. (Let k represent an arbitrary integer.)
In(x? + 11) + csc(v)| x

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