Solving a Homogeneous Linear Equation for x>0

AI Thread Summary
The discussion focuses on solving the second-order homogeneous linear equation x^2y'' - xy' + y = 0 for positive x, specifically exploring the Cauchy-Euler equation concept. Participants suggest trying a solution of the form y = x^r, which is typical for this type of equation. Questions arise regarding the reasoning behind the general solution's limitations to positive x, particularly for cases of double and complex conjugate roots. Clarifications on the Cauchy-Euler equation and its applications are sought, highlighting a need for deeper understanding. Overall, the conversation emphasizes the challenges in deriving solutions and the specific conditions under which they apply.
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Can someone give suggestions for this question?

Find a basis of solutions for the following second-order homogeneous linear equation for positive x:
x^2y``-xy`+y=0
 
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Do you know what a Cauchy-Euler equation is?
 
Also called an "equi-potential" equation since the "power" of x is always "equal" to the order of the derivative.

What happens if you try a solution of the form y= xr for some real number r?
 
i don't know what a Cauchy-Euler equation is, but how'd you think of
HallsofIvy said:
.
What happens if you try a solution of the form y= xr for some real number r?
 
ok, I've taken a look at the Cauchy-Euler equation in the AEM textbook, but there's two things that i think are strange:

1) for the case of double roots, the proof to the general solution only considers
x>O... why?
2) for the case of complex conjugate roots, there's only a general solution for all
positive x... why?

btw, I've been thinking all day of y=x^r... I'm still stumped over how'd you think of that?
 

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