How to find the nth derivative of square root of a polynomial using forward or backward differences. f(x)=sqrt(a0+a1 x + a2 x^2+a3 x^3+...an x^n)

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TR RAO
TR RAO le 5 Fév 2018
Réponse apportée : Jim Riggs le 5 Fév 2018
f(x)=sqrt(a0+a1 x + a2 x^2+a3 x^3+...an x^n+...) How to find the nth derivative of square root of a polynomial using forward or backward difference formulas
  2 commentaires
Jan
Jan le 5 Fév 2018
If you use forward and backward differences, the function is evaluated numerically. Then it does not matter if it is the square root of a polynomial. But you can calculate the derivative by pencil and paper also. Please post, what you have tried so far, because this might help to understand, what you want.
John D'Errico
John D'Errico le 5 Fév 2018
What have you tried? If nothing, why not?
Since this looks like homework, making an effort will get you more help than if you just post a doit4me.
Do you know how to evaluate the polynomial? Can you take the square root? Surely you can find forward difference schemes on wikipedia.

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Jim Riggs
Jim Riggs le 5 Fév 2018
See the attachment for numerical derivative formulas from my collection.

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