FIRST PROBLEM

I have timed how long it takes to compute the following statements (where V[x] is a time-intensive function call):

```
Alice = Table[V[i],{i,1,300},{1000}];
Bob = Table[Table[V[i],{i,1,300}],{1000}]^tr;
Chris_pre = Table[V[i],{i,1,300}];
Chris = Table[Chris_pre,{1000}]^tr;
```

Alice, Bob, and Chris are identical matricies computed 3 slightly different ways. I find that Chris is computed 1000 times faster than Alice and Bob.

It is not surprising that Alice is computed 1000 times slower because, naively, the function V must be called 1000 more times than when Chris is computed. But it is very surprising that Bob is so slow, since he is computed *identically* to Chris except that Chris stores the intermediate step Chris_pre.

Why does Bob evaluate so slowly?

SECOND PROBLEM

Suppose I want to compile a function in Mathematica of the form

```
f(x)=x+y
```

where "y" is a constant fixed at compile time (but which I prefer not to directly replace in the code with its numerical because I want to be able to easily change it). If y's actual value is y=7.3, and I define

```
f1=Compile[{x},x+y]
f2=Compile[{x},x+7.3]
```

then f1 runs 50% slower than f2. How do I make Mathematica replace "y" with "7.3" when f1 is compiled, so that f1 runs as fast as f2?

Many thanks!

EDIT:

I found an ugly workaround for the second problem:

```
f1=ReleaseHold[Hold[Compile[{x},x+z]]/.{z->y}]
```

There must be a better way...