# Finding integers divisible by x an y in J

Writing my first J program to solver Euler problem #1 (find the sum of all natural numbers below 1000 that are multiples of 3 or 5), I got the following solution:

``````+/(+./0=3 5|/n)#n=.i.1000
``````

However, I pretty sure there is a clever way of doing it, without using a variable. I tried to rewrite it using a fork, but I don't see how I could replace the expression between () as a verb applied to `3 5` and `i.1000`. Could anybody help me?

-
This question has a list of other ways of solving PE1. –  Eelvex Feb 28 '13 at 23:37

To parameterize both values, and thus generalize to a dyadic verb, we'll need to pass each of the parameters through to the places where they're needed. We can focus on the sole point where `3 5` is actually needed by starting with this fork:

``````   3 5 ([ |/ i.@]) 1000
``````

In the overall program we need the integers list in two places. The name (`n`) gave us an easy way to use that list in both places. To quickly get the whole program in place, in writing this I initially calculated the list twice:

``````   3 5 ([: +/ i.@] # [:+./ 0= [ |/ i.@]) 1000
``````

This succeeds at phrasing your whole program as a dyadic verb, but there are disadvantages to having `i.` appear twice. We can extract it to occur only once by making it the right tine of a fork. The center of that fork is a new, inner, verb.

``````   3 5 ([: +/ [ (] # [:+./ 0= [ |/ ]) i.@]) 1000
NB.              ___________________             new "inner" verb, parenthesized
``````

This inner verb needs to receive the `3 5` as an argument so I pass through the left argument of the outermost verb as the left argument to this inner verb. This means Left (`[`) in the inner verb has the same value it had in the previous version, when it referred to the outermost argument. Within this new verb Right (`]`) refers to the list of integers, occurring in the two places that `i.@]` appeared before.

Postscript: As you showed in your comment, `[ |/ ]` simplifies to `|/`

-
Thank you. You learned me the cap. My solution is now `+/3 5(([:+./0=|/)#])i.1000` –  Charles Brunet Mar 1 '13 at 3:44
It helped my J greatly when I learned that Cap (`[:`) and At (`@:`) are synonyms with different syntax. Cap is part of the syntactic rules of forks, while At involves the syntactic rules of conjunctions. Both compose two verbs. E.g. `[: g f` and `g @: f` have the same meaning. –  kaleidic Mar 1 '13 at 18:25
The other potential simplification is that it is not necessary to filter the list, we can just find the indicies in the list so we can use monadic `I.` . If we also use a hook to simplify the selection of left or right argument we can write `3 5 +/@I.@(0 = */@(|/ i.)) 1000` –  Tikkanz Mar 2 '13 at 14:50