I'll give you some hints so you can solve this practice question yourself, filling the blanks. The first and possibly most useful thing you can do, is splitting the problem in two procedures. The first one, given a number `n`

takes care of producing a list with `i`

repetitions of `n`

:

```
(define (repeat n i)
(if (zero? i) ; if no more repeats are needed
<???> ; return the empty list
(cons <???> ; else cons `n` and advance the recursion
(repeat <???> ; `n` is left unchanged
<???>)))) ; but `i` is diminished by one
```

The second procedure uses the previous one as a helper, iterating over the input `lst`

and combining the results of all of the sublists produced by `repeat`

:

```
(define (repeats-a-lot lst)
(if (null? lst) ; if the list is empty
<???> ; return the empty list
(append (repeat <???> <???>) ; append n repetitions of current element
(repeats-a-lot <???>)))) ; and advance the recursion over the list
```

There are several possible ways to solve this problem, some fancier (using tail recursion, using a fold procedure, etc.) but this IMHO is the simplest way, in the sense that it only requires knowledge of some basic list manipulating procedures. Anyway, it works as expected:

```
(repeats-a-lot '(1 2 3))
=> '(1 2 2 3 3 3)
```