How do I plot the value of `Approximation - Answer`

as `s`

varies in the code below? If you look at my code below, you can see the method I used (I put it in a separate file).

However, it does not show me a graph from `1`

to `1000`

. Instead the graph is from `999`

to `1001`

and does not have any points on it.

```
for s = 1:1000
error = LaplaceTransform(s,5) - (antiderivative(1,s)-antiderivative(0,s));
end
plot(s,error);
title('Accuracy of Approximation');
xlabel('s');
ylabel('Approximation - Exact Answer');
```

The functions used:

```
function g = LaplaceTransform(s,N);
% define function parameters
a=0;
b=1;
h=(b-a)/N;
x = 0:h:1;
% define function
g = ff(x).*exp(-s*x);
% compute the exact answer of the integral
exact_answer=antiderivative(b,s)-antiderivative(a,s)
% compute the composite trapezoid sum
If=0;
for i=1:(N-1)
If=If+g(i).*h;
end;
If=If+g(1).*h/2+g(N).*h/2;
If
```

with

```
function fx=ff(x)
fx=x;
```

and

```
function fx=antiderivative(x,s);
fx= (-exp(-s*x)*(s*x+1))/(s^2);
```

Any help would be appreciated. Thanks.

`error`

variable in each iteration. Instead store the values in a vector:`error(s) = ...`

and plot the result as`plot(1:1000,error)`

. On another note, ERROR is a built-in function, so avoid using it as variable name – Amro Oct 7 '11 at 1:12`If`

not`g`

from the`LaplaceTransform`

function – Amro Oct 7 '11 at 1:24