Question about Taylor Series While loop.
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I'm completely stuck on this While Loop using Taylor Series.
x = input('Input the angle in radians: ');
Cos_Estimate = 0;
k = 0;
Errrr = 1
while Errrr > .000001
if mod(k,2)
Sign = 1;
else
Sign = -1;
end
k = k + 2;
Cos_Estimate = Cos_Estimate + (x^k/(factorial(k)*Sign));
Errrr = abs(Cos_Estimate - cos(x));
end
err = abs(Cos_Estimate - cos(x));
fprintf('The estimated cosine value based on the Taylor Series is: %0.6f \n',Cos_Estimate)
fprintf('The actual cosine value is : %0.6f \n',cos(x))
fprintf('The estimation error is: %0.6f \n',err)
fprintf('The number of terms required was: \n',term)
Now I am getting NaN for my variable. I'm stuck.
Réponse acceptée
Azzi Abdelmalek
le 6 Mar 2013
Modifié(e) : Azzi Abdelmalek
le 6 Mar 2013
Try this
x = input('Input the angle in radians: ');
Cos_Estimate = 1;
Errrr=1
Sign = 1;
k = 0;
while Errrr > .000001 & k<60
Sign =-Sign;
k = k + 2;
Cos_Estimate = Cos_Estimate + (x^k/(factorial(k)*Sign))
Errrr = abs(Cos_Estimate - cos(x))
end
display(Cos_Estimate)
1 commentaire
Derryn
le 6 Mar 2013
Plus de réponses (2)
Azzi Abdelmalek
le 6 Mar 2013
Modifié(e) : Azzi Abdelmalek
le 6 Mar 2013
0 votes
Your code never enter in the loop because Errrr is not defined
5 commentaires
Derryn
le 6 Mar 2013
Matt Kindig
le 6 Mar 2013
Modifié(e) : Matt Kindig
le 6 Mar 2013
The issue is because the factorial() function, at very high values of k, exceeds the limit for double-precision numbers (specifically, you get a value of Inf). To demonstrate, run this at the command line:
>> factorial(160:180)
Notice that after the 11th column (i.e. factorial(170)) the factorial no longer is defined. When dividing by Inf, you get NaN in Cos_Estimate.
To fix this, the easiest way might be to add a second condition to your while loop, to terminate when k exceeds 170 or so.
Also, you don't define 'term' anywhere in your code, so the last line throws an error.
Matt Kindig
le 6 Mar 2013
Modifié(e) : Matt Kindig
le 6 Mar 2013
Also, what exactly is the point of the "estimation error" calculation (calculation of 'err')? By definition, won't this be equal to Errrr, because you have defined it that way? Also, won't 'err' always be less than 0.000001, because of the way you have defined your loop?
Derryn
le 6 Mar 2013
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