# Derivative of series in mathematica

I have an equation like:

``````y= Sum[ i x[i] , {i,10}]
``````

and I want to calculate the derivative :

``````D[y,x[i]] -> = i
``````

How can I do that in mathematica ?

I can do `D[y, x[3]]` and it gives me 3 but if I enter `D[y, x[i]]` it returns 0 but I expect i.

Is there a way to define the parametric derivative for series like the above in Mathematica ?

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sugest you fix your notation .. y = Sum[i x[i], {i, 10}] ; D[y,x[3]]-> 3 ; D[y,x[i]] -> 0 –  agentp Dec 28 '12 at 21:24
The correct reult is not "i", but rather "i if i is an integer in range 1:10 and zero otherwise." That should give a clue why this isn't a trivial thing to implement. –  agentp Dec 28 '12 at 21:29

Probably not the best way to think about your problem, anyway :

Build the list of your variables :

``````vars = Table[Symbol["x" <> ToString[i]], {i, 1, 10}]
(* {x1, x2, x3, x4, x5, x6, x7, x8, x9, x10} *)
``````

``````expr = Dot[Range[10], vars]
(* x1 + 10 x10 + 2 x2 + 3 x3 + 4 x4 + 5 x5 + 6 x6 + 7 x7 + 8 x8 + 9 x9 *)
``````

Take the derivatives :

``````D[expr, #] & /@ vars
(* {1, 2, 3, 4, 5, 6, 7, 8, 9, 10} *)
``````
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Here is a few things to consider.

1. The notation `x_3` does not mean x with index 3. It means three times x_. You should use Subscript[x,3] instead.

2. Your y is: `Sum[n * Subscript[x, n], {n, 1, 5}]`

3. You can now find the partial deriviative: `D[Sum[n * Subscript[x, n], {n, 1, 5}], Subscript[x, 2]]` gives 2.

4. `D[Sum[Subscript[x, n], {n, 1, 5}], Subscript[x, j]]` gives 0. The reason is that `Subscript[x, j]` is considered a variable.

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