Im clueless on how to solve the following question... x e y </msup>

uto2rimxrs50

uto2rimxrs50

Answered question

2022-05-15

Im clueless on how to solve the following question...
x e y d y d x = e y + 1
What i've done is...
d y d x = 1 x + 1 x e e ; d y d x 1 x e e = 1 x
Find the integrating factor..
v ( x ) = e P ( x ) ; w h e r e P ( x ) = p ( x ) d x P ( x ) = 1 x d x = l n | x | v ( x ) = e P ( x ) = e l n | x | = x ; y = 1 v ( x ) v ( x ) q ( x ) d x = 1 x x 1 x d x = 1 + c
I know I made a mistake somewhere. Would someone advice me on this?

Answer & Explanation

empatteMattmkezo

empatteMattmkezo

Beginner2022-05-16Added 22 answers

You have x e y d y d x = e y + 1, so, by dividing both sides by x and by e y + 1, we get
e y e y + 1 d y d x = 1 x e y e y + 1 d y = 1 x d x e y e y + 1 d y = 1 x d x ln ( e y + 1 ) = ln ( C | x | ) e y + 1 = C | x |

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