# Apply different functions (taken from a list), into a For loop

I have a list of functions: `DisUFuncList = Table[x^2, {n, 1, M}];`

and a list of arguments `y`. My goal is to receive the sum `DisUFuncList[[i]] [ y[[i]] ]`.

Here is the code:

``````    DisUFuncList = Table[x^2, {n, 1, M}];
Sum2=0;For[i = 1, i <= Length[y], i++,
Sum2 = Sum2 + Function[x, DisUFuncList[[i]] ] [ y[[i]] ]    ];
``````

This is also not working:

``````Apply[Function[DisUFuncList[[2]]], {2} ]
``````

Any ideas? Thanks!

-
I don't have Mathematica on this machine so can't help much, but what do you expect the list of functions, `DisUFuncList` to contain ? Evaluating it by eye I think it will contain M copies of `x^2`. Is that what you want ? – High Performance Mark Jun 28 '12 at 14:54
yes, at the beginning I want this list to contain M copies of `x^2` , but after that I can change it. – Stoyan Dimitrov Jun 28 '12 at 15:12

For example

``````DisUFuncList[x_] := Table[x^n, {n, 2, 6}]
y = Range[2, 6];
Sum[DisUFuncList[y[[i]]][[i]], {i, Length[y]}] == Sum[i^i, {i, 2, 6}]
(*
-> True
*)
``````

Please remember: `Looping in Mathematica is generally considered a bad practice.`

Edit

Regarding your comment, there are many ways to do that. Here is one:

``````M = 5;
DisUFuncList = Table[x^n, {n, 1, M}]
y = Range[M]
Sum[DisUFuncList[[i]] /. x -> y[[i]], {i, Length@y}]
(*
-> 3413  (==Sum[i^i, {i, 5}])
*)
``````
-
ok, thanks. However, with this approach we calculate many redundant values. Do you know some way to interpret expression as a function directly, not to generate a new list every time? – Stoyan Dimitrov Jun 28 '12 at 16:02

There are a lot of issues here, some of which get in the way of understanding (mine, anyway) exactly what you're after.

First, x^2 isn't a function in Mathematica. Functions ought to look like #^2& or however you've defined them. In a discussion that can get mired in arcane and stunt-like Mathematica forms, I'll try to keep some transparency by defining my function list as:

``````    funcList = {Sin, Cos,Tan}
``````

Second, it appears you want to thread that list of functions over a list of arguments,

``````    argList = {a1, a2, a3} say
``````

part by part, and, ultimately, if I understand the question correctly, you want an expression that'll generate the result

``````    Sin[a1] + Cos[a2] + Tan[a3]
``````

You can get MapThread to make the first step using the form

``````    MapThread[#1@#2&, {funcList, argList}]
``````

Then the sum is

``````    Plus@@%
``````

Niftier, but maybe more opaque would be:

``````    Inner[#1@#2&,funcList,argList]
``````

QED for my interpretation of the question.