You need to read "What Every Computer Scientist Should Know About Floating-Point Arithmetic":

http://docs.oracle.com/cd/E19957-01/806-3568/ncg_goldberg.html

Realize that computers will never be able to give perfect floating point results, and that leaves you with a few options:

- Do as few operations as possible, that is, pick the order of operations for the purpose of having the fewest rounding errors
- Fixed decimal point arithmetic - or integer arithmetic - this isn't always practical for all applications, but in some applications, you can get away with this. Financial applications are the commonly cited example (multiply by 100 to make pennies go away! divide by 100 when you are done!).
- There are other tricks I can't think of this late.

I'm going to have to give your operations a spin - on my machine, `eps`

gives me `2.2204e-16`

, which is six orders of magnitude lower than what you are getting. See what `eps`

is on your machine - it should be similar - if it is something like `1e-12`

or so, I'd say your result is exactly what you'd expect from those operations.

When I do this with random numbers, I get

```
a = rand(6, 78);
b = rand(6, 6);
b = b + b'; % To make b symmetric
c = a' * b * a;
max(max(abs(c - c')))
ans =
7.1054e-15
```

Which is a bit closer to what I'd expect with rounding errors after that many operations, but I am not sure of your input, your machine, and I have no idea what else might be affecting things.

Cheers,--

`C_s = .5* (C +C')`

you can be sure.. – Acorbe Dec 5 '12 at 18:16