There are at least three approaches:
- use primitive Lisp to practice recursion in a functional programming language
- use higher order functions: MAP and REDUCE, and a side-effect-free programming style
- use iteration and side effects
I'll show you approach 2:
One important tool is functional abstraction. Use functions to implement self-contained functionality, which can be reused and which can be easily tested.
You need a price. Write a
(defun get-price (item price-list)
(getf price-list item))
Above makes use of the price-list being a property list.
GETF does the look-up. You can re-implement it as a task.
Applying a function over a list and collecting the return values is called *mapping' in list. Unfortunately Lisp provides mapping functions which take one item a time, not two. We write one:
(defun map2 (function list)
(loop for (a b) on list by #'cddr
collect (funcall function a b)))
MAP2 maps over a list and applies a function on the first and second argument, then the third and fourth, ... it collects the results in a new list, which is returned then.
Above makes use of the
LOOP construct. You can re-implement it using
DO as a task.
(defun calc-total (cart price-list)
(map2 (lambda (item n)
(* n (get-price item price-list)))
Above uses two higher-order functions:
MAP2. Higher-order means that they take functions as parameters.
REDUCE is a library function in Common Lisp. We use it to sum up a list of numbers. With
MAP2 we compute the price for each shopping cart element by multiplying the number of items with the price per item.
CL-USER > (calc-total '(shirtA 3 shirtB 1) '(shirtA 25 shirtB 55))
Above approach has several advantages:
- we have small/compact functions which are easy to understand and test
- no visible side effects
- the basic model of mapping and reducing is a pattern that appears often in list processing and is easy to understand
- the functions are easy to combine
- the 'MAP2' function is a new useful reusable tool
- the code layout is much better to read
For the other approaches here are hints:
- you need to use a recursive call
- you need to use a variable for the sum, add the prices as a side effect and return the sum at the end.