Racket on the Raspberry Pi

Racket is a nice programming language to experiment with -- OK there's a bit of adjustment to the lisp syntax, but once you get that you get access to a wealth of built-in libraries for graphics, animation, UIs and more.

The Racket package in the official Raspian repo doesn't work out of the box, but you can download and compile it yourself. It takes an hour or so, but is not hard to do.

I've tried this on both the newer model 2, and the older version of the Raspberry Pi. It works reasonable well on the newer model, but is frustratingly slow on the older one.

Step 1: Download the latest version from the website

Go to http://download.racket-lang.org/ and choose Unix source + built packages.

You can also download with:
wget http://mirror.racket-lang.org/installers/6.2.1/racket-6.2.1-src-builtpkgs.tgz

Step 2: Compile it from source

Check the version numbers in the commands below. At the time of writing 6.1 was available.

tar zxvf racket-6.1-src-builtpkgs.tgz
cd racket-6.1/src

Finally run:

sudo make install

Step 3: Run DrRacket to try it out

Start up DrRacket, you can find it in the bin directory:

cd ~/racket-6.1/bin

Enter the following into the top part of the window (the Definitions) and click Run.

#lang racket
(require pict)

(define (circles n)
  (if (zero? n) empty
      (cons (circle (* n 15)) (circles (sub1 n)))))

(define (squares n)
  (if (zero? n) empty
      (cons (rectangle (* n 15) (* n 15)) (squares (sub1 n)))))

Now run these in the bottom part, the Interactions:

(apply cc-superimpose (squares 8))
(shuffle (append (circles 4) (squares 4)))

DrRacket has great built in help, simply place your cursor a command and hit F1 to read the docs.

Step 4: Check out the games

There are a bunch of games in ~/racket-6.2.1/share/pkgs/realm/ -- from the book Realm of Racket.
The snake game in chapter6 is a good place to start.

Have fun...

Programming Number Squares

I want to produce number squares (10 x 10 grids of numbers up to 100) and highlight different sequences of numbers to help in my maths teaching. For example: what sequence is highlighted in the number square below?

I could make these in a spreadsheet, but why not program it so that I can quickly produce a range of number squares?

I've been playing with the Racket programming language (http://racket-lang.org/) and given that it has graphics primitives built in to the basic language it seems like a good choice.

Here's an example of what it can do with graphics, try each line in turn...
(require 2htdp/image) 
(text "21" 50 "black") 
(rectangle 70 70 "solid" "yellow") 
(overlay (text "21" 50 "black")  (rectangle 70 70 "solid" "yellow")) 
OK, so we have a yellow square with 21 in it. So from these basics we can build some number squares:
(require 2htdp/image)  
(require math/number-theory)
(define NUMBERS-PER-LINE 10)  
(define NUMBER-SIZE 30)
(define BOX-SIZE 60)
(define (number-in-box n pred)
  (overlay (text (number->string n) NUMBER-SIZE "black")
           (if (pred n)
               (rectangle BOX-SIZE BOX-SIZE "solid" "pink")
               (rectangle BOX-SIZE BOX-SIZE "outline" "black"))))
(define (number-block n pred)
  (define numbers (rest (build-list (+ n 1)
                                    (λ (x) (number-in-box x pred)))))
  (define (number-lines l)
    (cond [(= (length l) NUMBERS-PER-LINE)
           (apply beside (take l NUMBERS-PER-LINE))]
            (apply beside (take l NUMBERS-PER-LINE))
            (number-lines (drop l NUMBERS-PER-LINE)))]))
  (number-lines numbers))
The first procedure number-in-box draws one number and colours it (or not) depending on the predicate pred, which is a test for the number. Try these:

(number-in-box 5 odd?)
(number-in-box 5 even?)

The second procedure number-block draws the block of numbers, again with the predicate (which it simply passes on to number-in-box. Try these:
(number-block 100 odd?)  
(number-block 100 prime?) 
(number-block 100 square-number?)

Making times tables with curry

To make tables for times tables you need to add a predicate to test for multiples of a number, e.g.:
(define (multiple-of-3? n)
  (zero? (remainder n 3))) 
Now you can run:
(number-block 100 multiple-of-3?)
However, it's a bit of work to have to define a new procedure each time we want a new times table. What about a predicate like this?

(define (multiple-of? m n)
  (zero? (remainder n m)))

This takes two parameters like this: (multiple-of? 3 9)
in this example, is 9 a multiple of 3?

However, our predicate that we want to pass to number-block expects a single argument: the number in the number square. How can we adapt this procedure to accept a single argument? The answer: with currying.

(curry multiple-of? 3) is a new version of our procedure with the three already passed, so this version is ready to accept the number from the number square. Try these examples:

(number-block 100 (curry multiple-of? 4))
(number-block 100 (curry multiple-of? 5))
(number-block 100 (curry multiple-of? 6))