I am a beginner following SICP course on MIT OpenCourseWare using both the video lectures and the book available online. Yesterday I came across an example, which ask if we can write a procedure to compute the number of ways to change any given amount of money.

This problem has a simple solution as a recursive procedure:

```
(define (count-change amount)
(cc amount 5))
(define (cc amount kinds-of-coins)
(cond ((= amount 0) 1)
((or (< amount 0) (= kinds-of-coins 0)) 0)
(else (+ (cc amount
(- kinds-of-coins 1))
(cc (- amount
(first-denomination kinds-of-coins))
kinds-of-coins)))))
(define (first-denomination kinds-of-coins)
(cond ((= kinds-of-coins 1) 1)
((= kinds-of-coins 2) 5)
((= kinds-of-coins 3) 10)
((= kinds-of-coins 4) 25)
((= kinds-of-coins 5) 50)))
```

If you want to check more of it, I took it from here.

they are calculating the number (N) of ways of change a quatity (A) using K kinds of coins by adding:

the number of ways (X) of changing A without coins of the first type.

The number of ways (Y) of changing (A - D), where D is the denomination of the fisrt coin, using ALL K types of coins.

The problem is, I just don't understand this. Following, they try to explain saying:

"To see why this is true, observe that the ways to make change can be divided into two groups: those that do not use any of the first kind of coin, and those that do. Therefore, the total number of ways to make change for some amount is equal to the number of ways to make change for the amount without using any of the first kind of coin, plus the number of ways to make change assuming that we do use the first kind of coin. **(Is the last sentence the same as the addition N = X + Y ? )** But the latter number is equal to the number of ways to make change for the amount that remains after using a coin of the first kind. **(After using this coin, they refer to ways of making change with or without the first kind of coin? )** "

I understand how they implemented the recursive algorithm, but I am unable to see how they got there. English is not my native language, so I might be missing something. If you could explain me, using other terms, the logic behind the solution I would really appreciate it. Thanks.

But the latter number is equal to the number of ways to make change for the amount that remains after using a coin of the first kindWhy is that? I cannot see it. – nonameable Jan 6 '15 at 23:05