The `X`

(cross operator) and the `[+]`

(reduction metaoperator `[ ]`

with additive operator `+`

) make this surprisingly easy:

To represent^{1} the double summation **∑³**_{x = 1} ∑⁵_{y = 1} *2x* + *y* , you can do the following:

```
[+] do for 1..3 X 1..5 -> ($x, $y) { 2 * $x + $y }
# for 1..3 X 1..5 # loop cross values
# -> ($x, $y) # plug into x/y
# { 2 * $x + $y } # calculate each iteration
# do # collect loop return vals
# [+] # sum them all
```

If you wanted to create a `sub`

for this, you could write it as the following^{2}

```
sub ΣΣ (
Int $aₒ, Int $aₙ, # to / from for the outer
Int $bₒ, Int $bₙ, # to / from for the inner
&f where .arity = 2 # 'where' clause guarantees only two params
) {
[+] do for $aₒ..$aₙ X $bₒ..$bₙ -> ($a, $b) { &f(a,b) }
}
say ΣΣ 1,3, 1,5, { 2 * $^x + $^y }
```

Or even simplify things more to

```
sub ΣΣ (
Iterable \a, # outer values
Iterable \b, # inner values
&f where .arity = 2) { # ensure only two parameters
[+] do f(|$_) for a X b
}
# All of the following are equivalent
say ΣΣ 1..3, 1..5, -> $x, $y { 2 * $x + $y }; # Anonymous block
say ΣΣ 1..3, 1..5, { 2 * $^x + $^y }; # Alphabetic args
say ΣΣ 1..3, 1..5, 2 * * + * ; # Overkill, but Whatever ;-)
```

Note that by typing it, we can ensure ranges are passed, but by typing it as `Iterable`

rather than `Range`

we can allow more interesting summation sequences, like, say, `ΣΣ (1..∞).grep(*.is-prime)[^99], 1..10, { … }`

that would let us use sequence of the first 100 primes.

In fact, if we really wanted to, we could go overboard, and allow for an arbitrary depth summation operator, which is made easiest by moving the function to the left:

```
sub ΣΣ (
&function,
**@ranges where # slurp in the ranges
.all ~~ Iterable && # make sure they're Iterables
.elems == &function.arity # one per argument in the function
) {
[+] do function(|$_) for [X] @ranges;
};
```

Just like `[+]`

sums up all the values of our `f()`

function, `[X]`

calculates the cross iteratively, e.g., `[X] 0..1, 3..4, 5..6`

first does `0..1 X 3..4`

or `(0,3),(0,4),(1,3),(1,4)`

, and then does `(0,3),(0,4),(1,3),(1,4) X 5..6`

, or `(0,3,5),(0,4,5),(1,3,5),(1,4,5),(0,3,6),(0,4,6),(1,3,6),(1,4,6)`

.

^{1. Sorry, SO doesn't let me do LaTeX, but you should get the idea. 2. Yes, I know that's a subscript letter O not a zero, subscript numbers aren't valid identifiers normally, but you can use Slang::Subscripts to enable them.}