Solve the given differential equation by separation of variables. (e^y+1)^2e^(-y)dx+(e^x+1)^6e^(-x)dy=0

Carol Gates

Carol Gates

Answered question

2021-09-15

Solve the given differential equation by separation of variables.
(ey+1)2eydx+(ex+1)6exdy=0

Answer & Explanation

SoosteethicU

SoosteethicU

Skilled2021-09-16Added 102 answers

Step 1
Rearranging the given equation:
(ey+1)2eydx+(ex+1)6exdy=0
Rearranging, (ey+1)2eydx=(ex+1)6exdy
Separating the variables ,we get
dx(ex+1)6ex=dy(ey+1)2ey
or, exdx(ex+1)6=eydy(ey+1)2
Step 2
Now, integrating both sides, we get :
exdx(ex+1)6=eydy(ey+1)2
Let us take, (ex+1)=u  and  (ey+1)=v
Then, exdx=du  and  eydy=dv
Therefore, du(u)6=dv(v)2
or  u6+16+1=v2+12+1+c
or  u55=v11+c
or  15u5=1v+c
or  15(ex+1)5=1(ey+1)+c
Step 3
Thus, solution of the given differential equation by separation of variables is :

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