# Adding the last two elements of a list

In Mathematica, what is the cleanest way of taking a list

``````{r1, r2, r3, ..., rn, a, b}
``````

and returning

``````{r1, r2, r3, ..., rn, a + b}
``````

or more generally

``````{r1, r2, r3, ..., rn, f[a, b]}
``````

for some function `f`?

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Simon, I expected a beginner to be asking this question, not you. What precisely are you after? Let me rephrase that: by what metric will you evaluate the replies? Execution speed? Shortest code? Most easily readable to Mathematica novices? –  Mr.Wizard Apr 12 '11 at 6:46
@Mr.Wizard: Just the cleanest/clearest code. I came up with a few options, but wasn't happy with most of them. So I thought that maybe someone else has a better idea. And they did - for some reason I had completely blanked on using `ReplaceAll`! –  Simon Apr 12 '11 at 6:53
@Mr.Wizard: Anyway - I thought it might be a nice simple/fun question after all of the murky digging in Mma's internals that has been going on! –  Simon Apr 12 '11 at 6:54
+1, for making me think I had a simple solution, `MapAt`, and then discovering that it clearly did not do what you asked for ... –  rcollyer Apr 12 '11 at 13:15

``````lst = {a[1], a[2], a[3], a[4], a[5], a[6], a[7], a, b};
lst /. {a___, b_, c_} -> {a, f[b, c]}

==> {a[1], a[2], a[3], a[4], a[5], a[6], a[7], f[a, b]}
``````

or (ugly):

``````Append[Take[lst, {1, -3}], f @@ lst[[{-2, -1}]]]
``````
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Thanks Sjoerd! The first solution probably wants to use `RuleDelayed` instead of `Rule`. Also the last one can be slightly prettified as `Append[lst[[1;;-3]], f@@lst[[-2;;-1]]]`. (of course, beauty is in the eye of the beholder and all that) –  Simon Apr 12 '11 at 7:06
btw: I had completely blanked about `ReplaceAll` when looking at this problem, so all of my solutions were like your second (ugly) one. –  Simon Apr 12 '11 at 7:24
Interestingly your "ugly" method is a little faster than mine, but I thought (in the past) I tested similar operations and found the form I posted to be faster. I guess not. Maybe I was able to do in-place manipulation at that time. –  Mr.Wizard Apr 12 '11 at 7:32
You get the "tick" since `/.` is visually the clearest and your "ugly" solution is (according to @Mr.W) the fastest! –  Simon Apr 12 '11 at 22:34

I'd use rules if performance is not a big issue (lists are not packed etc):

`````` lst = {a, b, c, d, e}

In[13]:= Replace[lst, {left__, ntl_, l_} :> {left, f[ntl, l]}, {0}]

Out[13]= {a, b, c, f[d, e]}
``````
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Performance is not an issue. Just clarity! –  Simon Apr 12 '11 at 6:58
@Simon In that case I lose. –  Mr.Wizard Apr 12 '11 at 7:28
Leonid, is the last part of your code: `, {0}` doing anything? –  Mr.Wizard Apr 12 '11 at 7:39
@Mr.Wizard Yes, it does. It makes sure that the replacement is only done on expression itself and not any of its parts. I find this a useful idiom in many cases, when you want to bullet-proof your rule-based solutions. In comparison, `ReplaceAll` often leads to bugs when rules are matched on a different level of expression than planned. –  Leonid Shifrin Apr 12 '11 at 7:46
But `Replace` already has that property, does it not? `Replace[{1, 2, 3}, _Integer -> "x"]` –  Mr.Wizard Apr 12 '11 at 7:47
show 1 more comment

If I hadn't second guessed Simon I would have been first to answer. Nuts. Anyway, here is my late-to-the-party reply.

``````combineLast =
Module[{x = #},
x[[-2]] = #2 @@ x[[-2 ;;]];
Most[x]
] &;
``````

Comparison:

``````leoCL[lst_, f_] := Replace[lst, {left__, ntl_, l_} :> {left, f[ntl, l]}, {0}]

a = RandomInteger[1*^9, 5000];

Do[combineLast[a, Plus], {5000}] // Timing
Do[leoCL[a, Plus], {5000}] // Timing
``````
```{0.078, Null}

{1.844, Null}```
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Wow! Your computer is MUCH faster than mine! If you want a little more speed, then the list slicing `[[-2;;]]` can be replaced with the more explicit `[[{-2, -1}]]`. –  Simon Apr 12 '11 at 7:11
@Simon, it shouldn't be faster; this is an old machine using an entry-level processor. What version of Mathematica are you using? I am not surprised if `[[{-2, -1}]]` is faster, but my love of terseness won. –  Mr.Wizard Apr 12 '11 at 7:18
I'm running `8.0.1.0 for Linux x86 (64-bit)` on a dual core AMD Turion 64 X2 in a low-end HP laptop. –  Simon Apr 12 '11 at 7:21
@Simon I wonder why this is slow on your machine. I just tried `[[{-2, -1}]]` and it is too close to call, another indication that behavior differs. I seem to recall someone on MathGroup complaining that Mma 8 was slow. Is is possible for you to try this operation on Mma 7? Did you do any speed comparisons when you got Mma 8? –  Mr.Wizard Apr 12 '11 at 7:24
@Simon @Mr. It's twice as fast as on my brand new i7 laptop 8-( (mma v8) –  Sjoerd C. de Vries Apr 12 '11 at 7:25

Suppose 'list' is defined:

``````Remove[list];
list = {r1, r2, r2, r4, r5, a, b};
``````

Re-set 'list' to be {r1, r2, r3, r4, r5, a} with the [[-1]] replaced by the sum of the last two elements in 'list'.

``````list = ReplacePart[Drop[list, -1], -1 -> Plus @@ list[[-2 ;; -1]]]
``````

Thanks for asking this, btw. :)

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Thanks for answering it! –  Simon Apr 12 '11 at 22:35

Here is my take on it:

``````addLastTwo = Function[Append[Drop[#, -2], Total[Take[#, -2]]]];

In[225]:= addLastTwo[{r1, r2, r3, r4, r5}]

Out[225]= {r1, r2, r3, r4 + r5}
``````

This is slightly faster than Mr.Wizard's solution, although less general:

``````In[226]:= Do[addLastTwo@a, {10000}] // Timing

Out[226]= {0.25, Null}

In[227]:= Do[combineLast[a, Plus], {10000}] // Timing

Out[227]= {0.39, Null}
``````
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