I need help with the secant method. Need to find the root of Wilkinson polynomial
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Im trying to use the secant method to prove that the root lies [20,22]. The equation that I'm trying to solve is
p(t) = (t-1)*(t-2)*...*(t-20) - (10^-8)*t^19
my code is as follows:
format long
my_tol = 1e-16
w =@(t,n) prod(t-n)-(10.^-8)*t.^19
t(1) = input('Enter first guess: ')
t(2) = input('Enter second guess: ')
iter = 0;
n = 1;
for i = 3:23
t(i) = t(i-1)-(w(t(i-1),n))*((t(i-1)-t(i-2))/(w(t(i-1),n))-w(t(i-2)));
iter = iter + 1;
n = n + 1;
if abs(t(i)-t(i-1))/t(i) < my_tol
wilkroot = t(i)
break
end
end
I'm not going to lie, i am terrible at this. This code looks like it should work but i get this error
*Error using @(t,n)prod(t-n)-(10.^-8)*t.^19
Not enough input arguments.
Error in test (line 9)
t(i) = t(i-1)-(w(t(i-1),n))*((t(i-1)-t(i-2))/(w(t(i-1),n))-w(t(i-2)));*
Can anyone help me with this?? I'm losing my f****** mind
1 Comment
John D'Errico
on 28 Sep 2014
Edited: John D'Errico
on 28 Sep 2014
It is much easier to read IF you flag as code those parts of your post that are code. In fact, simply preceding those lines with a double space will suffice.
Answers (2)
Guillaume
on 28 Sep 2014
You've defined w as a function of two variables, but the last part of your t calculation on line 9 calls w with only one argument, t(i-2). Maybe you meant:
t(i) = t(i-1)-(w(t(i-1),n))*((t(i-1)-t(i-2))/(w(t(i-1),n))-w(t(i-2), n));
0 Comments
John D'Errico
on 28 Sep 2014
Edited: John D'Errico
on 28 Sep 2014
Anyway, why do you think that your function w(t,n) evaluates that polynomial?
t is a vector of length 2, end points of your interval apparently. n is a scalar, that seems to change with iteration?
I think you need to first figure out how to write a function that will CORRECTLY evaluate that polynomial.
Your polynomial has a fixed order, so why make it a function of n at all? Next, you need to be careful trying to use tools like prod when t is a vector. How does MATLAB know what to take the product over? READ THE HELP FOR PROD.
For example, IF you know that t will always be a row vector, then you MIGHT do something like this:
w = @(t) prod(bsxfun(@minus,t,(1:20)'),1) - (10^-8)*t.^19;
Note how I've changed w. See that the last term uses the .^ operator, instead of the ^ operator. There is a difference, and it is an important one when t is a vector.
I've also made w not a function of n. Why would you have it that way anyway?
And, if you wanted to make w insensitive to whether t is a row or column vector, this would work.
w = @(t) prod(bsxfun(@minus,t(:).',(1:20)'),1) - (10^-8)*t(:).'.^19;
Having done that, what does it take to prove a root lies in an interval? So if your interval of interest is [20,22], what does w([20 22]) tell you? Do you really need to do much more than that if your goal is to show at least one root lies in an interval?
2 Comments
John D'Errico
on 28 Sep 2014
The polynomial is not a function of n. Somehow maybe you were confusing n with the numbers 1:20 in the polynomial. So rewrite it. Solve the small problem of determining there is a root in that interval.
The solve the secant method iteration. By the way, I'm not sure why you were using a var named n and iter, then incrementing both.
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