A light-weight question for the experts. I can't seem to figure the correct syntax to this replacement. I have this list

```
Clear[a, b, c, d]
polesList = {{3, {a, b}}, {5, {c, d}}};
```

It is of the form of a list with sublists each have the form {order,{x,y}} and I want to generate a new list of this form (x+y)^order

Currently this is what I do, which works:

```
((#[[2, 1]] + #[[2, 2]])^#[[1]]) & /@ polesList
(* -----> {(a + b)^3, (c + d)^5} *)
```

But I have been trying to learn to use `ReplaceAll`

as it is more clear to me than pure functions, since I can see the pattern better, like this:

```
Clear[a, b, c, d, n]
polesList = {{3, {a, b}}, {5, {c, d}}};
ReplaceAll[polesList, {n_, {x_, y_}} :> (x + y)^n] (*I thought this will work*)
```

I get strange result, which is

```
{(5 + c)^3, {(5 + d)^a, (5 + d)^b}}
```

What is the correct syntax to do this replacement using `ReplaceAll`

instead of the pure function method?

Thanks

**Update:**

I find that using Replace, instead of `ReplaceAll`

works, but need to say {1} at the end:

```
Clear[a, b, c, d, n]
polesList = {{3, {a, b}}, {5, {c, d}}};
Replace[polesList, {n_, {x_, y_}} :> (x + y)^n, {1}]
```

which gives

```
{(a + b)^3, (c + d)^5}
```

But `ReplaceAll`

does not take {1} at the end. I am more confused now which to use :)

`ReplaceAll[expr,rules]`

is essentially equivalent to`Replace[expr,rules,Infinity]`

. Replacing at all levels is a more common thing than just at a single level. That's why`ReplaceAll`

has a infix form`/.`

and`Replace`

doesn't. – Simon Aug 1 '11 at 2:44`Replace`

and`ReplaceAll`

traverse the expression tree is different.`Replace`

starts at the lowest level while`ReplaceAll`

starts at the highest. Compare`Replace[h[f1[a1], f2[e][a2]], (a_ /; Print[a] :> 0), Infinity]`

with`ReplaceAll[h[f1[a1], f2[e][a2]], (a_ /; Print[a] :> 0)]`

. – Simon Aug 1 '11 at 2:52`polesList = {{3, {a, b}}, {5, {c, d}}}`

):`Replace[polesList, {n_, {x_, y_}} :> (x + y)^n, Infinity]`

works, but`ReplaceAll[polesList, {n_, {x_, y_}} :> (x + y)^n]`

does not. – Simon Aug 1 '11 at 2:54