I need to fix the code by using for loop to plot the relative error E in 2 norm versus n.

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ebtisam almehmadi
ebtisam almehmadi il 3 Ago 2021
Risposto: Sivani Pentapati il 2 Set 2021
%%%% Taylor ploynomials pn(x)
x=2:0.01:3;
f = 1./x;
p1=1/2.5;
p2= 1/2.5 -(4/25)*(x-2.5);
p3= 1/2.5 -(4/25)*(x-2.5) + (8/125)*(x-2.5).^2;
p4= 1/2.5 -(4/25)*(x-2.5) + (8/125)*(x-2.5).^2 -(16/625)*(x-2.5).^3;
E1=sqrt((f-p1).^2)/sqrt((f).^2)
E2=sqrt((f-p2).^2)/sqrt((f).^2)
E3=sqrt((f-p3).^2)/sqrt((f).^2)
E4=sqrt((f-p4).^2)/sqrt((f).^2)
n=[1 2 3 4]
E=[ E1 E2 E3 E4];
semilogy(n,E)

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Risposte (1)

Sivani Pentapati
Sivani Pentapati il 2 Set 2021
Please refer to the below code snippet to calculate the l2 norm of error in iterative way. For more information, please refer to for loop in MATLAB documentation.
p(1,:)=1/2.5;
for i=2:4
p(i,:)= p(i-1,:)+ (4/25)*(2/5).^(i-2)*(-1).^(i-1)*(x-2.5).^(i-1);
end
E=sqrt((f-p).^2)/sqrt((f).^2);
n=1:4;
semilogy(n,E);

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