In Octave, it is important to note that `e^x`

and `exp(x)`

, where `x`

is a double precision scalar variable, are not necessarily the same.

For instance:

```
>> a = e ^ 2
a = 7.3891
>> b = exp (2)
b = 7.3891
>> b - a
ans = 8.8818e-16
```

The reason is that `exp (2)`

uses a dedicated algorithm to compute the exponential function, while `e ^ 2`

actually calls the function `e ()`

to get the value of e, and then squares it:

```
>> c = realpow (e (), 2)
c = 7.3891
>> c - a
ans = 0
```

Another reason why `e ^ x`

and `exp (x)`

differ is that they compute completely different things when `x`

is a square matrix, but this has already been discussed in Sardar's answer.