newton-raphson-method
Find zeros of a function using Newton's Method
Introduction
The Newton-Raphson method uses the tangent of a curve to iteratively approximate a zero of a function, f(x). This yields the update:
Example
Consider the zero of (x + 2) * (x - 1) at x = 1:
var nr = ; { return x - 1 * x + 2; } { return x - 1 + x + 2; } // Using the derivative:// => 1.0000000000000000 (6 iterations) // Using a numerical derivative:// => 1.0000000000000000 (6 iterations)Installation
$ npm install newton-raphson-methodAPI
require('newton-raphson-method')(f[, fp], x0[, options])
Given a real-valued function of one variable, iteratively improves and returns a guess of a zero.
Parameters:
f: The numerical function of one variable of which to compute the zero.fp(optional): The first derivative off. If not provided, is computed numerically using a fourth order central difference with step sizeh.x0: A number representing the intial guess of the zero.options(optional): An object permitting the following options:tolerance(default:1e-7): The tolerance by which convergence is measured. Convergence is met if|x[n+1] - x[n]| <= tolerance * |x[n+1]|.epsilon(default:2.220446049250313e-16(double-precision epsilon)): A threshold against which the first derivative is tested. Algorithm fails if|y'| < epsilon * |y|.maxIterations(default:20): Maximum permitted iterations.h(default:1e-4): Step size for numerical differentiation.verbose(default:false): Output additional information about guesses, convergence, and failure.
Returns: If convergence is achieved, returns an approximation of the zero. If the algorithm fails, returns false.
See Also
modified-newton-raphson: A simple modification of Newton-Raphson that may exhibit improved convergence.newton-raphson: A similar and lovely implementation that differs (only?) in requiring a first derivative.
License
© 2016 Scijs Authors. MIT License.
Authors
Ricky Reusser