Simpsons Rule: With for loops

10 Mayo 2015
2 Respuestas
Respuesta aceptada
Actualizado a las 20 Dic. 2017
8 Visualizaciones (30 días)

0 votos

Hi, So I have a question where I have to use Simpsons rule to integrate (1-x^3)*sin(x) + exp(x^2/20) between -1 and 4 with 20 intervals. The function has 4 inputs, f(x), a,b (start and end points) and n intervals
I know that I can make this code simpler with the sum function but unfortunately I have to use loops for this exercise.
My code looks like this:
function integral = simpsonsrule(f,a,b,n)
h = (b-a)/n;
x = linspace(a,b,n);
x4=0;
x2=0;
for j=2:2:b
x4 = x4 + f(x4);
end
for k=3:2:b
x2= x2 + f(x2);
end
integral = (h/3)*(f(a)+ f(b) + 4*(x4)+ 2*(x2));
end
And I'm calling it like this:
clear;
integral = simpsonsrule((1-x.^3)*sin(x) + exp(x.^2/20),-1,4,20)
But I'm getting the error: Undefined function or variable 'x'. but haven't I defined it with x=linspace(a,b,n)?

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 Respuesta aceptada

Walter Roberson
Walter Roberson el 10 de Mayo de 2015

0 votos

integral = simpsonsrule(@(x) (1-x.^3)*sin(x) + exp(x.^2/20),-1,4,20)
You need the @(x) to make an anonymous function

8 comentarios
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Eric
Eric el 10 de Mayo de 2015
Thanks Walter.
The program works but I now see the code is wrong as I'm getting incorrect integrals. I changed my loop code to:
x4=0;
x2=0;
for j=2:2:b
x4 = x4 + f(j);
end
for k=3:2:b
x2 = x2 + f(k);
end
When I increase n intervals, the integral decreases. I think its calculating the area of the individual interval area but not adding them all up.
Walter Roberson
Walter Roberson el 10 de Mayo de 2015
for j=2:2:b
x4 = x4 + f(x(j));
end
Eric
Eric el 10 de Mayo de 2015
No luck. Integral still keeps decreasing as n increases and doesn't stabilise. I'm thinking maybe I have to force the use of absolute values.
function integral = simpsonsrule(f,a,b,n)
h = (b-a)/n;
x = linspace(a,b,n);
x4=0;
x2=0;
for j=2:2:b
x4 = x4 + f(x(j));
end
for k=3:2:b
x2 = x2 + f(x(k));
end
integral = (h/3)*(f(x(a))+ f(x(b)) + 4*(x4)+ 2*(x2));
end
Walter Roberson
Walter Roberson el 10 de Mayo de 2015
Your start and end points are numeric, not indices into x, so in your integral line you should be using f(a) and f(b)
Eric
Eric el 10 de Mayo de 2015
Yup, changed that earlier but same result.
Walter Roberson
Walter Roberson el 10 de Mayo de 2015
You need a small correction to the anonymous function. You currently have
@(x) (1-x.^3)*sin(x) + exp(x.^2/20)
and you need instead
@(x) (1-x.^3).*sin(x) + exp(x.^2/20)
I don't think it will change your output
Walter Roberson
Walter Roberson el 10 de Mayo de 2015
What kind of n are you using?
Eric
Eric el 10 de Mayo de 2015
I've been using 20,50,100,500,1000.

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Preguntada:

Eric
Eric
el 10 de Mayo de 2015

Respondida:

Malek Arnous
Malek Arnous
el 20 de Dic. de 2017

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