Prove that converting the Higher-Order derivatives to the finite difference formula would be: f(x) – 2f(xi-1) + f(x¡-2) (Ax)2 1) f"(x;) = "Backward Method" f(xi+2) – 2f(x;+1) + f(x¡) (Ax)2 2) f"(xi) =...

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Prove that converting the Higher-Order derivatives to the finite difference formula<br>would be:<br>f(x) – 2f(xi-1) + f(x¡-2)<br>(Ax)2<br>1) f

Extracted text: Prove that converting the Higher-Order derivatives to the finite difference formula would be: f(x) – 2f(xi-1) + f(x¡-2) (Ax)2 1) f"(x;) = "Backward Method" f(xi+2) – 2f(x;+1) + f(x¡) (Ax)2 2) f"(xi) = "Forward Method" f (xi+3) – 3f(xi+2) + 3f(xi+1) – f(x;) (Ax)3 3) f"'(x;) = "Forward Method"

Jun 05, 2022

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Prove that converting the Higher-Order derivatives to the finite difference formula would be: f(x) – 2f(xi-1) + f(x¡-2) (Ax)2 1) f"(x;) = "Backward Method" f(xi+2) – 2f(x;+1) + f(x¡) (Ax)2 2) f"(xi) =...

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