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I have wrongly formulated the question.i wanted to ask how can i pass values to a given expression with several variables,values for these variables are placed in a list and then to calculate the value of the expression.

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@user642327 Allow me to welcome you to StackOverflow and remind three things we usually do here: 1) As you receive help, try to give it too answering questions in your area of expertise 2) Read the FAQs 3) When you see good Q&A, vote them upusing the gray triangles, as the credibility of the system is based on the reputation that users gain by sharing their knowledge. Also remember to accept the answer that better solves your problem, if any, by pressing the checkmark sign –  belisarius Mar 3 '11 at 4:05

3 Answers 3

Your revised question is straightforward, simply

f @@ {a,b,c,...} == f[a,b,c,...]

where @@ is shorthand for Apply. Internally, {a,b,c} is List[a,b,c] (which you can see by using FullForm on any expression), and Apply just replaces the Head, List, with a new Head, f, changing the function. The operation of Apply is not limited to lists, in general

f @@ g[a,b] == f[a,b]

Also, look at Sequence which does

f[Sequence[a,b]] == f[a,b]

So, we could do this instead

f[ Sequence @@ {a,b}] == f[a,b]

which while pedantic seeming can be very useful.

Edit: Apply has an optional 2nd argument that specifies a level, i.e.

Apply[f, {{a,b},{c,d}}, {1}] == {f[a,b], f[c,d]}

Note: the shorthand for Apply[fcn, expr,{1}] is @@@, as discussed here, but to specify any other level description you need to use the full function form.

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A couple other ways...

  1. Use rule replacement

    f /. Thread[{a,b} -> l]

    (where Thread[{a,b} -> l] will evaluate into {a->1, b->2})

  2. Use a pure function

    Function[{a,b}, Evaluate[f]] @@ l

    (where @@ is a form of Apply[] and Evaluate[f] is used to turn the function into Function[{a,b}, a^2+b^2])

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Yeah. We could write a blog: The 1001 ways to get the SquaredEuclideanDistance[ ] without mentioning it. :D –  belisarius Mar 3 '11 at 4:03
    
I avoided mentioning Dot[l,l] b/c I figured it was a bit too tuned to the specifics of the question... –  Brett Champion Mar 3 '11 at 4:18
    
...until now, that is. :-) –  Brett Champion Mar 3 '11 at 4:18
    
@Brett See my answer. I wasn't ashamed to suggest l.l :D –  belisarius Mar 3 '11 at 4:27
    
@Belisarius Why'd you leave out z = Complex @@ l;z*Conjugate[z]? (And if we get to 1001, do we win a prize, or get kicked out?) :-) –  Brett Champion Mar 3 '11 at 4:42

For example, for two elements

f[l_List]:=l[[1]]^2+l[[2]]^2  

for any number of elements

g[l_List] := l.l

or

h[l_List]:= Norm[l]^2

So:

Print[{f[{a, b}], g[{a, b}], h[{a, b}]}]

{a^2 + b^2, a^2 + b^2, Abs[a]^2 + Abs[b]^2}  

Two more, just for fun:

i[l_List] := Total@Table[j^2, {j, l}]

j[l_List] := SquaredEuclideanDistance[l, ConstantArray[0, Length[l]]  

Edit

Regarding your definition

f[{__}] = a ^ 2 + b ^ 2;  

It has a few problems:

1) You are defining a constant, because the a,b are not parameters.
2) You are defining a function with Set, Instead of SetDelayed, so the evaluation is done immediately. Just try for example

 s[l_List] = Total[l]

vs. the right way:

 s[l_List] := Total[l]  

which remains unevaluated until you use it.

3) You are using a pattern without a name {__} so you can't use it in the right side of the expression. The right way could be:

f[{a_,b_}]:= a^2+b^2;
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