Utilizing root solving techniques such as:
- Bisection Method
- Fixed-Point Method
- Newton's Method
- Secant Method
Demonstrates numerical methods used to find solutions of nonlinear equations. Each script has a nonlinear function and error tolerance built into it, but both can be changed by the user.
These three files are all python 2.7 scripts. Each has a shebang (#!/usr/bin/env python2.7) which allows them to be run from the command line. However make sure your python version is 2.7.*:
$ python --version
Python 2.7.9
Bisection Method is a root finding method that solves the form: f(x) = 0.
- INPUTS: function (func), low guess (a), high guess (b), tolerance of error (tol), MAX number of iterations (N)
- CONDITIONS: f(x) must be continuous and defined on an interval [a,b], f(b)*f(b) < 0, a < b
- OUTPUT: Value which differs from a root of f(x) = 0 by less than tol
The current low guess, high guess, tol, and N for demonstration is (1, 2, 10^-5, 100) respectively
- Note these can be changed under:
# globals
TOL = 10**-5
A = 1
B = 2
N = 100The current fucntion for demonstration is: f(x) = x^3 - x - 2
- Note this can be changed under:
def f(x):
return (math.pow(x,3) - x - 2)Run from command line:
$ ./bisection.py
Bisection method soln: x = 1.52138519287
The Fixed-Point Iteration Method finds the root of an equation in the form: x = f(x) or g(x) = x - f(x)
- INPUTS: function (func), approximation (approx), tolerance of error (tol), MAX number of iterations (N)
- OUTPUT: Value which differs from a root of f(x) = 0 by less than tol
The current approx, tol, and N for demonstration is (4.6, 10^-4, 100) respectively
- Note these can be changed under:
# globals
APPROX = 4.6
TOL = 10**-4
N = 100The current fucntion for demonstration is: f(x) = (1/tan(x))- (1/x) + x
- Note this can be changed under:
def f(x):
return (1/math.tan(x)) - (1/x) + xRun from command line:
$ ./fixedPoint.py
Fixed point solution: x = 4.49340945791
The Newton's Method finds the root of an equation: x : f(x) = 0
- INPUTS: approximation (approx), tolerance of error (tol), MAX number of iterations (N)
- OUTPUT: THe value (guess) which differs from a root of f(x) = 0 by less than tol. Since the guess gets more accurate after every iteration, this is simply when the guess satisfies the following abs(guess - prev_guess) < tol
The current approx, tol, and N for demonstration is (4.6, 10^-4, 100) respectively
- Note these can be changed under:
# globals
APPROX = 0.1
TOL = 10**-5
N = 100The current fucntion for demonstration is: f(x) = (1 + x)^204 - 440x - 1
- Note this can be changed under:
def f(x):
return math.pow((1+x),204)-440*x-1For Newton's Method we also need to know f'(x). Currently, f'(x) = 204*(1 + x)^203 - 440
- Note that this MUST be changed when f(x) is changed. Do this under:
def fprime(x):
return 204*math.pow((x+1),203) - 440Run from command line:
$ ./newtons.py
Newton's Method soln: x = 0.00681932148758
The Newton's Method finds the root of an equation: x : f(x) = 0. Considered an approximation of Newton's Method. It is convienienvt since you do not need f' like in Newton's Method
- INPUTS: approximation (approx), tolerance of error (tol), MAX number of iterations (N)
- OUTPUT: THe value (guess) which differs from a root of f(x) = 0 by less than tol. Since the guess gets more accurate after every iteration, this is simply when the guess satisfies the following abs(guess - prev_guess) < tol
The current approx, tol, and N for demonstration is (4.6, 10^-4, 100) respectively
- Note these can be changed under:
# globals
APPROX = 0.1
TOL = 10**-5
N = 100The current fucntion for demonstration is: f(x) = (1 + x)^204 - 440x - 1
- Note this can be changed under:
def f(x):
return math.pow((1+x),204)-440*x-1Run from command line:
$ ./secant.py
Secant method soln: x = 0.00681932406799