I have this problem to work on:

The sum higher order procedure can be generalised even further to capture the idea of combining terms with a fixed operator. The mathematical product operator is a specific example of this idea, with multiplication replacing the addition of the summation operator. The procedure accumulate, started below, is intended to capture this idea. The combiner parameter represents the operator that is used to reduce the terms, and the base parameter represents the value that is returned when there are no terms left to be combined. For example, if we have already implemented the accumulate procedure, then we could define the sum procedure as:

(define sum (accumulate + 0))

Complete the definition of accumulate so that it behaves according to this description.

```
(define accumulate
(lambda (combiner base)
(lambda (term start next stop)
(if (> start stop)
...
...))))
```

I inserted as the last two lines:

```
base
(combiner base (accumulate (combiner start stop) start next stop))
```

but, I have no idea if this is correct nor how to actually use the sum procedure to call accumulate and hence sum up numbers.