Posted by **ryan** on Saturday, November 17, 2012 at 4:27pm.

Derive the central difference approximation for f''(x) accurate to O(h^4)

by applying Richardson extrapolation to the central difference approximation of O(h^2).

where f'' = 2nd derivative of x

## Answer This Question

## Related Questions

- computing/maths - Derive the central difference approximation for f′&#...
- differentiation - Derive the central difference approximation for f′&#...
- Math - extrapolation - The forward difference formula can be expressed as : f'(...
- ap calculus ab - for f(x)=lnx we know that f(e)=1. Use the tangent line at(e,1) ...
- Math for Chem Lab - There are two ways in which you can obtain results from a ...
- math - The forward difference formula can be expressed as : f'(x0) = (1/h)[f(x0+...
- mathematics - What is the difference between an interpolated point and an ...
- science data - What is the difference between an interpolated point and an ...
- physics - extrapolation is the process whereby we extend an established ...
- CALCULUS - If the local linear approximation of f(x) = 3sin x + e3x at x = 2 is ...

More Related Questions