You can access different parts of a list using `Part`

or (depending on what parts you need) some of the more specialised commands, such as `First`

, `Rest`

, `Most`

and (the one you need) `Last`

. As noted in comments, `Histogram[Last/@F]`

or `Histogram[F[[All,-1]]]`

will work fine.

Although it wasn't part of your question, I would like to note some things you could do for your specific problem that will speed it up enormously. You are defining `Mu`

, `Sigma`

etc 10,000 times, because they are inside the `Table`

command. You are also recalculating `Mu - Sigma^2/2)*t + Sigma*Sqrt[t]`

120,000 times, even though it is a constant, because you have it inside the `FoldList`

inside the `Table`

.

On my machine:

```
F = Table[(Xi = RandomVariate[NormalDistribution[], 12];
Mu = -0.00644131;
Sigma = 0.0562005;
t = 1/12; s = 0.6416;
FoldList[(#1*Exp[(Mu - Sigma^2/2)*t + Sigma*Sqrt[t]*#2]) &, s,
Xi]), {SeedRandom[2]; 10000}]; // Timing
{4.19049, Null}
```

This alternative is *ten times faster*:

```
F = Module[{Xi, beta}, With[{Mu = -0.00644131, Sigma = 0.0562005,
t = 1/12, s = 0.6416},
beta = (Mu - Sigma^2/2)*t + Sigma*Sqrt[t];
Table[(Xi = RandomVariate[NormalDistribution[], 12];
FoldList[(#1*Exp[beta*#2]) &, s, Xi]), {SeedRandom[2];
10000}] ]]; // Timing
{0.403365, Null}
```

I use `With`

for the local constants and `Module`

for the things that are other redefined within the `Table`

(`Xi`

) or are calculations based on the local constants (`beta`

). This question on the Mathematica StackExchange will help explain when to use `Module`

versus `Block`

versus `With`

. (I encourage you to explore the Mathematica StackExchange further, as this is where most of the Mathematica experts are hanging out now.)

For your specific code, the use of `Part`

isn't really required. Instead of using `FoldList`

, just use `Fold`

. It only retains the final number in the folding, which is identical to the last number in the output of `FoldList`

. So you could try:

```
FF = Module[{Xi, beta}, With[{Mu = -0.00644131, Sigma = 0.0562005,
t = 1/12, s = 0.6416},
beta = (Mu - Sigma^2/2)*t + Sigma*Sqrt[t];
Table[(Xi = RandomVariate[NormalDistribution[], 12];
Fold[(#1*Exp[beta*#2]) &, s, Xi]), {SeedRandom[2];
10000}] ]];
Histogram[FF]
```

Calculating `FF`

in this way is even a little faster than the previous version. On my system `Timing`

reports 0.377 seconds - but such a difference from 0.4 seconds is hardly worth worrying about.

Because you are setting the seed with `SeedRandom`

, it is easy to verify that all three code examples produce exactly the same results.

`Histogram[Last /@ F]`

? – mohit6up Apr 5 '12 at 13:21`F[[All, -1]]`

would work as well. – Heike Apr 5 '12 at 13:53