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Help with newton-raphson

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Ethan Cole
Ethan Cole on 31 Mar 2022
Answered: John on 31 Jul 2023
Construct a MATLAB function called newtonRaphson that implements n steps of the
Newton-Raphson method to find the root of some function f(z).
Your function should receive the following three inputs (in this order): an inline function
f; an initial guess cO; and the number of steps to be computed, n.
Your function should return a vector called c with n + 1 entries containing a vector of all
the approximations computed. The first entry in c should contain the initial guess; the
remaining n entries should contain the approximations that your function has computed
in order.
The definition of your function should look like this:
function c=newtonRaphson(f,c0,n)
Im unsure where to start as every type of code i try to use ends up coming back with an error. please help
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Sam Chak
Sam Chak on 31 Mar 2022
Edited: Sam Chak on 31 Mar 2022
I see... @Ethan Cole, you have tried writing many codes for the Newton–Raphson Method in solving root-finding problem .
Most likely you are a little rigid (restricted) and overwhelmed by the technical terms in the instructions, such as to have an inline function f, the number of steps to be computed, n, and then the solver shall return a vector called c with n + 1 entries. If you look at the Newton–Raphson Iteration Formula in mathematics book:
,
it definitely does not tell you what an inline function is, what steps are, and what a vector c is. That's why you don't know where to begin.
Can you put up the latest version of your code here?
Ethan Cole
Ethan Cole on 31 Mar 2022
Edited: Cris LaPierre on 31 Mar 2022
i am using aprogramme called matlab grader so a screenshot of the code is alli can give

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Accepted Answer

Torsten
Torsten on 31 Mar 2022
Edited: Torsten on 31 Mar 2022
f = inline('x.^2-3','x');
c0 = 2;
n = 10;
c = newtonRaphson(f,c0,n)
function c = newtonRaphson(f,c0,n)
df = @(x) (f(x+1.0e-6)-f(x))*1e6;
c = zeros(n+1,1);
c(1) = c0;
for i = 1:n
c(i+1) = c(i)-(f(c(i))/df(c(i)))
end
end
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Torsten
Torsten on 31 Mar 2022
Edited: Torsten on 31 Mar 2022
Isn't this exactly Sam Chak's code ?
function c = newtonRaphson2(f,c0,epsilon)
syms x
df = matlabFunction(diff(f,x));
error = 2*epsilon;
itermax = 30;
cold = c0;
iter = 0;
flag = 0;
while error > epsilon
iter = iter + 1;
cnew = cold - f(cold)/df(cold);
error = abs(cnew-cold)/max(1,abs(cold));
if iter > itermax
disp('Iteration limit exceeded.');
flag = 1;
break
end
cold = cnew;
end
if flag == 0
c = cnew;
else
c = c0;
end
end

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More Answers (2)

Sam Chak
Sam Chak on 31 Mar 2022
Hi @Ethan Cole
The method presented by @Torsten satisfies your requirements in your assignment. Here is an alternative. The main difference is the termination condition, where the program does not execute a fixed number of iterations, but the interation will stop once the condition is satisfied.
format long g
f = @(x) x^2 - 3; % to find the square root of 3
epsilon = 1e-6;
x0 = 1;
[c, Iterations] = NewtonRaphson(f, x0, epsilon)
function [x, Iter] = NewtonRaphson(f, x0, epsilon)
Iter = 0;
df = @(x) (f(x+1.0e-6)-f(x))*1e6;
x1 = x0 - f(x0)/df(x0);
while abs(f(x1)) > epsilon
x0 = x1;
x1 = x0 - f(x0)/df(x0);
Iter = Iter + 1;
end
x = x1;
  2 Comments
Ethan Cole
Ethan Cole on 31 Mar 2022
Ive seen a similar codelikethis online,the only downside is that i have tostay within certain inputs that being f-function, c0- intitial and n-number of steps to be computed
Sam Chak
Sam Chak on 31 Mar 2022
No worries. I understand that the assignment requires you to input the number of iterations/steps. @Torsten will surely fix it. But I wonder if you put n = 1e9, will the MATLAB Grader going to execute the 1 billion iterations? 😅

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John
John on 31 Jul 2023
function [p, PN] = Newton_371(p0,N,tol,f,fp)
p=p0;
PN(1)=p0;
for n= 1:N
p=p-f(p)/fp(p);
PN(n+1) =p;
if abs(p-PN(n)) <=tol
break
end
end
end

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