Optimizing my MATLAB code, I stumbled upon a weird problem regarding anonymous functions.

Like in this thread I realized, that sometimes anonymous functions are running really slow. But with minimal changes to the function, it runs as fast as subfunctions or nested functions.

I used this (simple) test file to reproduce the behaviour with Matlab R2010b under Windows 7 64-bit:

```
clear all; close all; clc;
% functions
fn1 = @(x) x^2;
fn2 = @(x) double(x^2);
% variables
x = linspace(-100,100,100000);
N = length(x);
%% anonymous function
y = zeros(1,N);
t = tic;
for i=1:N
y(i) = fn1(x(i));
end
tm.anonymous_1 = toc(t);
%% anonymous function (modified)
y = zeros(1,N);
t = tic;
for i=1:N
y(i) = fn2(x(i));
end
tm.anonymous_2 = toc(t);
%% print
tm
```

The results I got were:

```
tm =
anonymous_1: 1.0605
anonymous_2: 0.1217
```

As you can see the first approach is about 10 times slower. I have no idea what triggers this speedup/slowdown. I tried different things, getting nearly the same (fast) timings:

```
fn2 = @(x) 1 * x^2;
fn2 = @(x) 0 + x^2;
fn2 = @(x) abs(x^2);
fn2 = @(x) x*x;
```

Before I start profiling all of my functions,
I would like to know if anyone has an explanation for this behaviour?

P.S.: I know that "vectorized" approaches are much faster, but in my case a solver will be evaluating the function for each variable time step, so that is not an option.

`fn1 = fn2 = @(x) x^2`

they're both slow and take the same time; if you make`fn1 = fn2 = @(x) double(x^2)`

or`fn1 = fn2 = @(x) 1 * x^2`

; they're both fast. It's quite curious, +1 for the question. It is something about`fn1 = @(x) x^2`

that is slow. – Ramashalanka Mar 19 '11 at 5:22