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How can I integrate a function?
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I have this numerical integration function:
function I = integrate(f, a, b, n)
h =(b-a)/n;%interval size
I=0;
for i=1:n %loop for the rest of the calculations
p1 =(a+((i-1)*h)) + (h/4) ;
m = ((a+((i-1)*h)) + (a+(i*h)))/2;
p2 =(a+(i*h))- (h/4);
I = I + (h/3)*((2*f(p1))-f(m)+(2*f(p2)));
end
end
I want to calculate the function f= @(x,N)x.^N when N = 1, N = 2, N = 3, N = 4, N = 5, using my numerical integration function I = integrate(f, a, b, n) . Two times : first when number of subintervals n=1, and the second time when n=2. How can I do this? I'm thinking about writing two for-loops.
x=a:1:b;
a =0;
b =1;
N=1:5;
n=1:2;
f= @(x,N)x.^N;%function
F=@(x,N)(x.^((N)+1))./((N)+1);% Primitive function
exact_value = F(b,N)-F(a,N); % exact value
int(N) = integrate(f(N),a,b, n);
for i=1:length(N)
exact_value(i) =(F(b,N(i))-F(a,N(i)));
end
for j=1:length(N)
int(j) = integrate (f(j),a,b,n);
for k=1:length(n)
int(k)=integrate(f, a, b,n(k));
end
end
but when I ran it I got this error:
Not enough input arguments.
Error in upp3b>@(x,N)x.^N (line 6)
f= @(x,N)x.^N;%function
Error in upp3b (line 13)
int(N) = integrate(f(N),a,b, n);
Answers (3)
Image Analyst
on 20 Dec 2020
You need to get the current value of N out of the N vector:
for j = 1 : length(N)
thisN = N(j); % Extract this particular value of N
int(j) = integrate (f(thisN), a, b, n);
for k = 1 : length(n)
int(k)=integrate(f, a, b, n(k));
end
end
1 Comment
Rik
on 16 Dec 2021
Deleted comment:
a =0;
b =1;
N=1:5;
n=1:2;
f= @(x,N)x.^N;%function
F=@(x,N)(x.^((N)+1))./((N)+1);% Primitive function
exact_value = F(b,N)-F(a,N); % exact value
int= integrate(f(x,N),a,b, n);
for i=1:length(N)
exact_value(i) =(F(b,N(i))-F(a,N(i)));
end
for j=1:length(N)
z = N(j); % Extract this particular value of N
int(j) = integrate (f(x,z),a,b,n);
for k=1:length(n)
int(k)=integrate(f(x,N),a,b,n(k));
end
end
i ran it and got this error :
Error using .^
Matrix dimensions must agree.
Error in upp3b>@(x,N)x.^N (line 5)
f= @(x,N)x.^N;%function
Error in upp3b (line 12)
int= integrate(f(x,N),a,b, n);
Jesús Zambrano
on 20 Dec 2020
You have defined 'f' as a function of x and N, but in the second for-loop and in the function 'integrate' you refer to 'f' with one argument instead of two.
1 Comment
Rik
on 16 Dec 2021
Edited: Rik
on 16 Dec 2021
Deleted comment:
a =0;
b =1;
N=1:5;
n=1:2;
f= @(x,N)x.^N;%function
F=@(x,N)(x.^((N)+1))./((N)+1);% Primitive function
exact_value = F(b,N)-F(a,N); % exact value
int= integrate(f(x,N),a,b, n);
for i=1:length(N)
exact_value(i) =(F(b,N(i))-F(a,N(i)));
end
for j=1:length(N)
z = N(j); % Extract this particular value of N
int(j) = integrate (f(x,z),a,b,n);
for k=1:length(n)
int(k)=integrate(f(x,N),a,b,n(k));
end
end
i ran it and got this error :
Error using .^
Matrix dimensions must agree.
Error in upp3b>@(x,N)x.^N (line 5)
f= @(x,N)x.^N;%function
Error in upp3b (line 12)
int= integrate(f(x,N),a,b, n);
Image Analyst
on 20 Dec 2020
OK, not really sure what you're after but at least this runs without error. Put it all in one m-file.
% Initialization steps. Brute force cleanup of everything currently existing to start with a clean slate.
clc; % Clear the command window.
fprintf('Beginning to run %s.m ...\n', mfilename);
clear; % Erase all existing variables. Or clearvars if you want.
workspace; % Make sure the workspace panel is showing.
format long g;
format compact;
a =0;
b =1;
x=a:1:b;
N=1:5;
n=1:2;
f = @(x,N) x.^N; % function
F = @(x,N) (x.^((N)+1))./((N)+1);% Primitive function
exact_value1 = F(b,N) - F(a,N); % exact value
% Looping way of doing the same thing.
for k = 1 : length(N)
exact_value2(k) = F(b,N(k)) - F(a,N(k));
end
% int(N) = integrate(@f, a, b, N); % Won't work because N is a vector.
for j=1:length(N)
thisN = N(j);
int1(j) = integrate (f, a, b, thisN);
for k=1:length(n)
int2(k)=integrate(f, a, b, n(k));
end
end
% Show values in the command window.
int1
int2
%=========================================================================
function I = integrate(f, a, b, n)
h = (b - a) / n; % interval size
I = 0;
for i = 1 : n % loop for the rest of the calculations
p1 =(a+((i-1)*h)) + (h/4) ;
m = ((a+((i-1)*h)) + (a+(i*h)))/2;
p2 =(a+(i*h))- (h/4);
I = I + (h/3)*((2 * f(p1, n)) - f(m, n) + (2 * f(p2, n)));
end
end
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