# Symbolic recursive function in Mathematica

I want to write a recursive function, that evaluates symbolic variables. Here's an example in python:

``````x = ["x0",...]
y = ["y0",...]
def f(n):
if n<=0:
return x[0]
t1 = x[n]
t2 = y[n]
r = f(n-1)
return t1+t2+r
``````

How can I reimplement that in Mathematica?

I tried creating variable names manually:

``````toFixedWidth[n_Integer, width_Integer] := \
make_var[i_] := ToExpression[StringJoin["x", toFixedWidth[i, 2]]]
xtab := Table[{make_var[i]}, {i, 0, 10}]
xtab
``````

But it doesn't work:

``````{{make_var[0]}, {make_var[1]}, {make_var[2]}, {make_var[3]}, {
make_var[4]}, {make_var[5]}, {make_var[6]}, {make_var[7]}, {
make_var[8]}, {make_var[9]}, {make_var[10]}}
``````

I want to see how the expression unfolds (for a more complicated function than in the example), that's why I want all variables to be symbolic.

-

Underscores are reserved for pattern matching (`Blank`). Try `makevar` instead:

``````toFixedWidth[n_Integer, width_Integer] :=
makevar[i_] := ToExpression[StringJoin["x", toFixedWidth[i, 2]]]
xtab := Table[{makevar[i]}, {i, 0, 10}]
xtab
``````
``````{{x00}, {x01}, {x02}, {x03}, {x04}, {x05}, {x06}, {x07}, {x08}, {x09}, {x10}}
``````

Incidentally:

``````Table[Unique["x"], {11}]
``````
``````{x1, x2, x3, x4, x5, x6, x7, x8, x9, x10, x11}
``````
-
Cool. Is there a way to make the output of `Table[Unique[]..` look better? x00 is easier to read than x\$151 –  user1367401 Jul 1 '12 at 13:02
@user1367401 sorry, that was my mistake, `x` should have been a string. –  Mr.Wizard Jul 1 '12 at 13:09
@user1367401 by the way, if you have more Mathematica questions be sure to join us at mathematica.stackexchange.com –  Mr.Wizard Jul 1 '12 at 13:12
thanks, mr. wizard ;) –  user1367401 Jul 1 '12 at 13:15
@user1367401 You're welcome. Also, when padding integers as strings to a given length, try this: `Table[IntegerString[i, 10, 2], {i, 0, 10}]` –  Mr.Wizard Jul 1 '12 at 13:19