sábado, 7 de abril de 2012

"Polynomial Tchebysheff , Tango"

                                            
(1-x^2)\,y'' - x\,y' + n^2\,y = 0
and
(1-x^2)\,y'' - 3x\,y' + n(n+2)\,y = 0

\sum_{n=0}^{\infty}T_n(x) t^n = \frac{1-tx}{1-2tx+t^2}.    "


                                                  Polynomial Tchebysheff, Tango"
                                                                                            (tango)

It was with the "polynomial Tchebysheff" ...
I managed to put a bow on top.
And diluted to the smallest doubt ...
Discover your hidden weaknesses.
With the resolution of those "Differential Equations"
You're no longer a "mystery" ...
Applying the "Theory of Approximations",
I managed to spy the message I were hiding.
And "x-X" and "y-i" are my allies ..
And I have good "in box" ...
I assigned numbers not dare ...
And I have you best "forecast" ...

By "Tn" you most incriminating ...
the "polynomial of first kind" ...
I traverse ... "term by term" ...
and hug him as a friend.
Every now and then I assign "complex numbers" ...
I just give me the "zero" I need ...
The "generating function" was a great light ...
Denied that he offered me the step.
I was gaining little by little ...
I took the "elbow" inside ...
Function will be more prosperous ...
That will give us the future ...
I control in my tidy
in a field not adverse ...
Extended Sum ...
between n = 0 and infinity Infinito elevado a infinito.


I allow myself to draw the map ...
unconcealed your scruples ...
Nothing will seem impossible ...
and control any other ...
The "polynomial" gave us ... balance ...
for us to grow together ...

                                                                       Daniel H Guasti
                                                                      pisulinoal@yahoo.com.ar
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