Solving a Differential Equation: y'/(1+y'^2) = 2y^2 + C

psid
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Homework Statement



How to solve the following DE:
\frac{1}{\sqrt{1+(dy/dx)^{2}}}=\frac{2y^{2}}{2}+C?
 
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I suppose solving it for dy/dx might enable you to do a separation of variables...

I.e. (since you are posting this in advanced physics): write
dy/dx = f(y)
for some function f only depending on y; then integrate
dx = dy / f(y)
and invert to find y(x).

Granted, it's probably easier said than done, but you can give it a try.
 
It is indeed separable. I get it into the following form, but don't know how to integrate
dx=\sqrt{\frac{((2/\gamma)y^{2}+C)^{2}}{1-((2/\gamma)y^{2}+C)^{2}}}dy
 
psid said:
It is indeed separable. I get it into the following form, but don't know how to integrate
dx=\sqrt{\frac{((2/\gamma)y^{2}+C)^{2}}{1-((2/\gamma)y^{2}+C)^{2}}}dy

This is an elegant problem.

Superb.

First: Let's try to make the equation a bit less horrendous.

Take \sqrt{1-((2/\gamma)y^{2}+C)^{2}} = t

Proceed with that. Simplify it well and then take

t= sin\theta

Simplify it and then use De moivre's theorem.
 
May i know the name of the book.
 
But the problem with this substitution is that there is a second power of y in the square root. Thus there will be a term including y for the expression for dt...
 

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