taylor expanssion calculation result is wrong
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function [SN] = sintaylorfunction(A, tol)
k = 0;
error = 0 ;
sin = 0;
SN = sin;
sinplus1 = 0;
SM = sinplus1;
while E <= tol
sin = (-1)^k * A^(2*k+1)/factorial(2*k+1);
SN = SN + sin;
sinplus1 = (-1)^(k+1) * A^(2*(k+1)+1)/factorial(2*(k+1)+1);
SM = SM + sinplus1;
error= abs( max(SM - SN));
end
end
I wrote the sin function in this way. When I calculate sin(pi/2), I get sin(pi/2) = 1.5708. However, we know that sin(pi/2) = 1. Where is my mistake in my function?
Accepted Answer
Ameer Hamza
on 3 Nov 2020
Edited: Ameer Hamza
on 3 Nov 2020
kou are not incrementing 'k' inside the while-loop. Also, the while-condition is incorrect. Try the following code
sintaylorfunction(pi/2, 0.01)
function [SN] = sintaylorfunction(A, tol)
k = 0;
error = inf;
sin = 0;
SN = sin;
sinplus1 = 0;
SM = sinplus1;
while error >= tol
sin = (-1)^k * A^(2*k+1)/factorial(2*k+1);
SN = SN + sin;
sinplus1 = (-1)^(k+1) * A^(2*(k+1)+1)/factorial(2*(k+1)+1);
SM = SM + sinplus1;
error= abs( max(SM - SN));
k = k+1;
end
end
6 Comments
Zeynep Toprak
on 3 Nov 2020
Ameer Hamza
on 3 Nov 2020
Yes, the formula for taylor series of cos is a bit different as shown in your question too. The method will be same.
Zeynep Toprak
on 3 Nov 2020
Ameer Hamza
on 4 Nov 2020
I have simplified your code a bit. Following will work
[q, w] = sintaylorfunction(pi/2, 0.01)
function [SN CN] = sintaylorfunction(A, tol)
k = 0;
error = inf;
SN = 0;
while error >= tol
sin = (-1)^k * A^(2*k+1)/factorial(2*k+1);
SN = SN + sin;
sinplus1 = (-1)^(k+1) * A^(2*(k+1)+1)/factorial(2*(k+1)+1);
error= abs(sinplus1-sin);
k = k+1;
end
n=0;
error_cos=inf;
CN=0;
while error_cos >=tol
cos = (-1)^n * A^(2*n)/factorial(2*n);
CN = CN + cos;
cosplus1 = (-1)^(n+1) * A^(2*(n+1))/factorial(2*(n+1));
error_cos= abs(cosplus1-cos);
n = n+1;
end
end
Zeynep Toprak
on 4 Nov 2020
Ameer Hamza
on 4 Nov 2020
I am glad to be of help!
More Answers (1)
Steven Lord
on 3 Nov 2020
Edited: Steven Lord
on 3 Nov 2020
I want to walk through your code and comment on a few places.
function [SN] = sintaylorfunction(A, tol)
k = 0;
error = 0 ;
sin = 0;
The identifier sin also already has a meaning in MATLAB, so I recommend you choose a different variable name.
SN = sin;
sinplus1 = 0;
SM = sinplus1;
while E <= tol
The variable E doesn't exist.
sin = (-1)^k * A^(2*k+1)/factorial(2*k+1);
From the role this plays, a better name might be term.
SN = SN + sin;
sinplus1 = (-1)^(k+1) * A^(2*(k+1)+1)/factorial(2*(k+1)+1);
SM = SM + sinplus1;
error= abs( max(SM - SN));
In this loop you change neither the (nonexistent) variable E nor the variable tol. So if this were to enter the loop, you'd never exit.
FYI, you might want to check your answer using the funm function to compute the matrix cosine and matrix sine.
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