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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!

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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

2 Answers 2

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}])
*)
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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.

I hope this helped answer the question you were actually asking.

Fred Klingener

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1  
QED are the Latin initials for "quod erat demonstrandum", which (if both my Latin and English don't fail me) means something like "which was the thing to be demonstrated". So perhaps is not used properly in your answer. –  belisarius Jun 29 '12 at 3:17

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