2nd Order Non-Homogeneus please help driving crazy !

[cihadkoc]

2y²y" + 2y (y')² = 1

Thats the equation. Which method should i use please help?

 

[Deleted member 4993]

2y²y" + 2y (y')² = 1

Thats the equation. Which method should i use please help?

You are sure that the problem is NOT:

y²y" + 2y(y')² = 1

 

[cihadkoc]

Yes I am pretty sure :/ But I am glad to listen the solution if its starting with y^​2

 

[Deleted member 4993]

Yes I am pretty sure :/ But I am glad to listen the solution if its starting with y^​2

In that case, what are your thoughts?

 

[cihadkoc]

Actually I dont have much idea. I thought you have a sloution for that and wanted to see that.

I did v=y' and conitnued

But nonhomogeneous is really hard in that case

2y²v dv/dy + 2yv² - 1 = 0

then;

v ( 2y² dv/dy + 2yv -1/v) =0

Now v= 0 or ( 2y² dv/dy + 2yv -1/v)= 0

But I cant solve it.. :/ I am not sure if i am doing right also


What do you think ?

 

[Deleted member 4993]

I went to wolframalpha.com and fed the DE and got a horrendous answer.

 

[Deleted member 4993]

Yes I am pretty sure :/ But I am glad to listen the solution if its starting with y^​2

\(\displaystyle \dfrac{d}{dx}\left[y^2*y'\right] \ = \ ?\)

 

[cihadkoc]

Its = 2y(y')² + y²y''

Now its like the problem.. Bu unfortunately Its starting with 2.

 

[Deleted member 4993]

So now you know how to solve the problem if it did not have '2' in the first term!

 

[cihadkoc]

It changes to y².y' = x+c

And its 1st order nonlinear form..

I think answer is y = (3/2x²+3c₁x+3c₂)<sup>1/3

But I am not sure yet. Its really hard if its not that.</sup>

 

[Ishuda]

Its = 2y(y')² + y²y''

Now its like the problem.. Bu unfortunately Its starting with 2.

Nothing new, just wondering if the problem has actually changed from the initially stated. If the problem is supposed to be
2 y (y')² + y² y'' = 1
then re-write as suggested by Subhotosh Khan
2 y (y')² + y² y'' = (y² y')' = 1
and, as mentioned by cihadkoc, the final solution is
y(x) = \(\displaystyle (\frac{3}{2}\space x^2\space +\space 3\space c_1\space x\space +\space 3\space c_2)^{1/3}\)

Of course, you could just call the 3 c₁ and 3 c₂ new constants c₃ and c₄ and write
y(x) = \(\displaystyle (\frac{3}{2}\space x^2\space +\space c_3\space x\space +\space c_4)^{1/3}\)

 

[Ishuda]

2y²y" + 2y (y')² = 1

Thats the equation. Which method should i use please help?

You know, I missed the perfect opportunity here. When someone says something is driving them crazy, the proper response is 'Wrong. It's only a short walk."