Heads up for a hot new root seeking algorithm!!
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01-21-2017, 02:35 PM
(This post was last modified: 01-21-2017 02:37 PM by Namir.)
Post: #20
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RE: Heads up for a hot new root seeking algorithm!!
(01-20-2017 08:59 AM)emece67 Wrote:(01-20-2017 01:24 AM)Namir Wrote: My own perception is that the efficiency index is a qualitative indicator that gives you a general idea about the convergence rate. I doubt there exists a general formula for what I am asking above. Regarding the link to the article you mentioned in your message. Can you check the new algorithm by the author Thukral. I implemented equation 7 in the article and got bizarre results! Perhaps I am doing something wrong? When I replaced the second subtraction in equation 7 with a multiplication, the algorithm worked but was painfully slow to converge! I suspect typos om the article since the title has one " Nonlinear Equations of Type f(0)=0" instead of " Nonlinear Equations of Type f(x)=0". Namir |
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