# I need help overcoming an error in my Newton Algorithm

My name is Curtis and I'm a 1st year student in Biochemistry at the University of Geneva. I need some help completing the code for my NEWTON ALGORITHM. It is a bonus exercice to our autumn semester maths exam and we can hand it in or not. Usually people copy and paste but I decided to sit down and review theory and ask for help left right and center. Trust me, I've been at this assignment for the last 3 weeks (beginner) building up my skills slowly, but I've reached my limit.

Here is my code:

## PRIMARY FUNCTION

```f=function(x){ out=(2/(3))*exp(x^3)-(10)*log(x) return(out) }```

## 1ST DERIVATIVE

```fp=function(x){ out=(2)*(x^2)*exp(x^3)-(10/x) return(out)``` }

## 2ND DERIVATIVE

```fpp=function(x){ out=(4)*(x)*exp(x^3)+(6)*(x^4)*exp(x^3)+(10/x^2) return(out) }```

I am trying to find the "zero" of "fp",my 1st derivative, with my newton algorithm:

## NEWTON ALGORITHM

``````newbon=function(x0,epsi,f,fp){

## where "a" corresponds to x^n and

## "b" corresponds to x^n+1

## We are looking for x^n+1 such that f(x^n+1)=0

## NB: fp(a)*(a-b)=f(b)-f(a) when f(b)=0

a=x0
b=(fp(a)*a-f(a))/fp(a)
while(abs(-fp(a)*(b-a))>epsi){
a=b
b=(fp(a)*a-f(a))/fp(a)
}
out=NULL
out=a
return(out)
}
``````

I must admit that my algorithm was painfully congested and I've been having headaches to get it to work. However, I always get the same error message:

## ERROR MESSAGE

``````Erreur dans while (abs(-fp(a) * (b - a)) > epsi) { :
valeur manquante là où TRUE / FALSE est requis
De plus : Message d'avis :
In log(x) : production de NaN
``````

Please forgive the French; it is my study language. Quite frankly I don't mind if I don't get the bonus marks, what is really important is that I understand why it doesn't work and what condition is missing.

You're help would be kindly appreciated.

Curtis MOYO

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What programming language is this in? – corsiKa Dec 21 '11 at 22:10
seems you're taking logarithm of negative value, perhaps you call f where it is not defined – sdcvvc Dec 21 '11 at 22:21
Possibly helpful: stackoverflow.com/questions/7683688/…. There are quite a few questions and answers here about using Newton's Method to calculate derivatives. A search might be worth your time. – Jim Mischel Dec 21 '11 at 22:23
@sdcvvc you must be right. If I calculate newbon(1,10^-9,f,fp) I always get an error message. But when I search for the solution of my 1st derivative newbon(1,10^-9,fp,fpp), I get the correct value. Does that mean that mean that my primary function doesn't have any zeros/solutions? – Curtis Heart Moyo Dec 21 '11 at 22:31
@JimMischel thank you. I just but I'll surely get my way through the forums better next time. – Curtis Heart Moyo Dec 21 '11 at 22:33

`log` is returning `NaN`, so I'm guessing you're feeding it a negative value somewhere somehow.

So what I can glean from this is that `fp` is a function containing logs, so likely `function(x){ out=(2/(3))*exp(x^3)-(10)*log(x) return(out) }`
And it's being fed a negative argument, which is returning `NaN`. This can't be compared to `epsi`, therefore not returning a boolean to your loop condiditon.

It's also possible that this NaN is produced a bit earlier, in `b=(fp(a)*a-f(a))/fp(a)` where `f` is called, since that's the one that should contain `log` and that it's causing the above problem from there instead.

With a bit more info and what your `x0,epsi,f,fp` parameters are, I can try it in Matlab (or potentially whatever you are using)

Keep in mind that the standard way of implementing Newton's method is simply

``````while (abs(f(x)) > TOL)
x = x - f(x)/fp(x);
``````

for finding roots of f

Here's something I used for an assignment myself:

``````%x0 is a guess, a,b are bounds, f is the function, g is the derivative, TOL is epsi
function [x, flag] = SafeNewton1D(f, g, x0, a, b, TOL)
x = x0;
while (abs(f(x)) > TOL)
x = x - f(x)/g(x);
if (x < a || b < x)
%value does not fall between a and b, shorten bounds and then guess
%again from the midpoint.
midpoint = a + (b - a)/2;
if (sign(f(a)) == sign(f(midpoint)))
a = midpoint;
else
b = midpoint;
end
x = a + (b - a)/2;
else
%value falls between a and b, so may as well shorten the bounds.
if (sign(f(x)) ==  sign(f(a)))
a = x;
else
b = x;
end

end

end
end
``````
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Wow I'm so thankful. The most important thing is that I now understand why I was getting a negative value. I actually only needed to calculate newbon(1,10^-9,fp,fppget the root of fp. Seeing that f doesn't have any zeros which probably why I was getting an error message as well. Thank you once again for the enlightenment. – Curtis Heart Moyo Dec 21 '11 at 23:23
@CurtisHeartMoyo if this answers your question you can upvote or mark as accepted :) – Jean-Bernard Pellerin Dec 21 '11 at 23:46
I'll definitely upvote. By the way x0=initial value, epsi is the equivalent to your TOL which I presume is "tolerance", f= primary function (2/(3))*exp(x^3)-(10)*log(x) and fp is the derivative of my primary function (2)*(x^2)*exp(x^3)-(10/x). – Curtis Heart Moyo Dec 22 '11 at 0:00