TDA 452
DIT 143
HT 2018

# Functional Programming 2018 Exercises for Week 1

## Exercises for Week 1: Getting Started with Haskell

This document is designed as introduction to Haskell and the interactive Haskell interpreter GHCi. You are supposed to go through this document using a computer. It's meant to be pretty simple stuff – feel free to skip over some exercises.

You are supposed to work through this document in an afternoon. The most important tasks are to answer questions that look like this: Example question.
The questions in the first part come with a suggested answer that you can see by clicking at the question mark at the left. Try to answer the questions yourself before looking!

### GHCi as a simple calculator

GHCi is an Haskell interpreter, i.e. it is a program that evaluates Haskell expressions.

You can start GHCi by typing `ghci` in a terminal.

``ghci``
We will use `this style` for the text that you as user of GHCi have to enter.

When you start GHCi you will see this welcome message:

```GHCi, version 8.0.1: http://www.haskell.org/ghc/  :? for help

```
Right now, we don't care about the precise meaning of the text in the welcome message, but focus on the last line with the `>` symbol. The `>` symbol indicates that GHCi is ready to receive a command. We will explain later on what the word `Prelude` means.

The simplest command one can give to GHCi is an Haskell expression, given an Haskell expression GHCi will evaluate it, and write the result on the screen. Try:

````4+5*6`
34

```

After that, as indicated by the `>` symbol, GHCi is ready to take a new command. We can repeat this interaction as many times as we want. Try:

````4*(8-5)+3`
15
`3.5/(3+4)*4.5`
2.25
`sin 1.57`
0.9999996829318346

``` The first of the expressions contains a multiplication-,  addition-,  and a subtraction operator. In which order are these operators applied? Which numbers are mulitplicated, added, and subtracted? What will the result be if we take away the parentheses in the first expression, i.e.`4*8-5+3`? In which order are the operators applied in the second expression?

We don't always get a value as result when we give GHCi an expression, it can be the case that our expression contains an error... Try:

````3+5*`

<interactive>:1:5: error:
parse error (possibly incorrect indentation or mismatched brackets)
`1 `div` 0`
*** Exception: divide by zero
```
The first expression contains a syntax error; there is no right operand of the multiplication operator (`*`). In the second expression we  try to divide by zero. Recognizing different kinds of errors and knowing their causes will take some  time to learn!

### More GHCi commands

We use the :q command to finish a GHCi session.
````:q`
Leaving GHCi.
```
```
```
All GHCi commands except evaluating an expressions start with a colon `:`.

Restart GHCi and try to answer the following questions by inspecting the welcome message. Which GHCi commands are there?

### Two simple examples The sell rate for the English pound was 12.7775 SEK on the 20th of October 2008. How many  pounds did one get for 1000 SEK that day? In some countries people use the Fahrenheit temperature scale. 0°C (Celsius) corresponds to 32°F (Fahrenheit), and an increase of 5°C corresponds to an increase of 9°F. How many Fahrenheit degrees is 28°C?

### A programmable pocket calculator

We have seen how we can use GHCi to do simple calculations. But this is just the beginning. To go further we need to define our own functions. As a first example we look at the currency conversion problem described above. If we need to repeatedly convert pounds to SEK we can define a function that does this for us. Defining a function consists of a number of steps.

• Decide upon a name for the function. A name should be chosen that is suggestive of it's purpose, and does not shadow a function currently in scope. For this example we chose the name `pound.`
• Decide which arguments (input) the function has, and what the result (output) of the function is. In this case this is simple:
• Input: a floating point number representing an amount of crowns.
• Output: a floating point number representing an an amount of pounds.
• Decide upon a name for the parameters of the function that indicates the usage of the argument. In this case we use the name `kr` as parameter.
• Express the result in terms of the parameters. In this case the result is: `kr/12.7775` pound.
• Decide upon the type of the function. In this case:
`pounds :: Double -> Double`
• Write the complete Haskell function definition. In this case:
`pounds :: Double -> Doublepounds kr = kr/12.7775`
Before we can use the definition we have to give it to GHCi. Although it is possible to do this directly in GHCi, it is more useful to learn how to do this in a seperate file, since this is what we have to do for larger programs.
1. Use an editor (for example Emacs or nedit) to write the function definition in a file. Do this, start Emacs with the command `emacs ex1.hs &` in a terminal, and write the definition above. Save this to a file with name ex1.hs
2. Give GHCi a command to load the file
````:l ex1.hs`
Compiling Main             ( ex1.hs, interpreted )
```
We can now use the definition: Try:
````pounds 1000`
78.2626
`pounds 12345`
966.151
`pounds 127775`
10000.0

``` Define a function that converts temperatures in °C to °F. Add this function to ex1.hs. Load the file and test your function. We will now introduce a new kind of error. What happens if one writes `pount 10` (note the spelling error)? What happens if one writes: `pounds kr`?

### Comparison and more complex functions

Up till now we have defined functions by equations of the form:

name(parameter) = an expressions containing the parameter, numbers and arithmetic operations.

It is not always this easy, consider the following example:

A shop sells potatoes for 3.50 SEK/kg. To stimulates large sales, the shop offers a reduced price of 3 SEK/kg for the quantity exceeding 10 kg.

We want to define the function that calculates the price.

Let's call this function `price` and the parameter `v`.
• When `v` is at most 10, then the price is `3.50*v`.
• If `v` is more than 10, the price is `35+3*(v-10)` (check this!) which is equal to `5+3*v`.
So, we have:

`price(v) = 3.5*v`, if `v<=10`
`price(v) = 5+3*v`, if `v>10`

How does one write this in Haskell? First, notice that it is possible to compare numbers.Try:

````3 < 6`
True
`3.5 <= 3`
False
`pounds 4000 > 3*100`
True
```
The result of such a comparison is either `True` or `False`. Notice, that smaller than or equal to is written as `<=`. Now, we can write the definition of price as follows:
```price :: Double -> Double
price v
| v <= 10 = 3.5*v
| v > 10  = 5+3*v
```
The Boolean expressions between `|` and `=` are called guards. When this function is applied to a particular argument, GHCi checks the guards from top to bottom until it finds one that evaluates to `True`, after that the right-hand side of the expression is used to calculate the result. If all guards evaluate to `False` GHCi gives an error message.

Load this function into GHCi, and test the function price on different arguments. Change the last of the definitions to:
`   |v > 11  = 5+3*v`
What is the result of applying the function to 9.5, 10.5 respective 11.5? Change the function to:
`price v    |v <= 11 = 3.5*v   |v > 10  = 5+3*v`
What is the now result of applying the function to 9.5, 10.5 respective 11.5?
We can use the keyword `otherwise` as a guard that is always true. So, if `otherwise` is used as the last guard, the expression at the right-hand side will be used if none of the other guards evaluates to `True`.
So, we can write:
```price :: Double -> Double
price v
|v <= 10   = 3.5*v
|otherwise = 5+3*v
``` The sale of potatoes has been so successful that the shop now can offer a price of 2.50 SEK/kilo for quantities exceeding 20kg (with the same prices for other amounts). Change the function to to calculate the correct price.

Is `otherwise` a Haskell keyword? What does Hoogle say?

When a function is applied to a simple argument (like 5) we don't need parentheses. But if the argument is composed (like 4 + 8) parentheses are needed.

````price 7.5`
26.25
`price 11`
38.5
`price (4+8)`
41.0

``` Try to evaluate the last expression without parentheses. Can you explain the result?

### Functions with more than one argument

Functions can have more than one argument. As an example we define a function that defines the average of two numbers:
• The name of the function: `average`.
• Input: Two floating point numbers.
• Output: A floating point number giving the average of the two arguments.
• Names of the parameters: `x` and `y`.
• The result in terms of the parameters: `(x+y)/2`
• The type:
`average :: Double -> Double -> Double`
• The complete definition:
```average :: Double -> Double -> Double
average x y = (x+y)/2
```
Observe that when a function has multiple arguments the parameters are written after each other separated by spaces. The same holds when the function is applied to parameters.
````average 5 8`
6.5
``` Define a function that gives the average of three numbers. Load in the function in GHCi and test it.

### The Prelude

Some functions are very frequently used and therefore pre-defined in a module (file) called the Prelude, which is loaded automatically every time GHCi is started. An overview of the functions defined can be found in e.g., A Tour of the Haskell Prelude.

To be able to program efficiently in Haskell it is necessary to know which functions are available in the Prelude. In the coming weeks you will become more familiar with them.

### Operators and functions with two arguments

Operators like *,-,+ are written infix, which means that the operator should be in between its arguments. Functions are usually written prefix, meaning that they are written before their arguments. However, one can use a function infix by writing it between  `   `. An operator can be used prefix by writing it in between parentheses. Try:
````5 `average` 4`
4.5
`4 `max` (5 `max` 2)`
5
`(+) 3 4`
7

```

### Integers

The prelude provide the function `div` for integer division. Try:
````div 17 5`
3
`div 34 8`
4
`div 5 9`
0
`4 `div` 2`
2
```
The function `mod` gives the remainder for integer division:
````17 `mod` 5`
2
`34 `mod` 8`
2
`5 `mod` 9`
5
`mod 4 2`
0
``` What is `5 `mod` 0`? Is 107139224 divisible by 11731? Define a function that given a year gives the number of days in that year. Used the simplified rule that year numbers divisible by four are leap years (years with 366 days).
You will have to use relational operator `==` which evaluates to `True` if its arguments are equal.

### A bigger example

Consider the following game:

Think of an whole number greater than one. If its even, divide it by two, otherwise multiply it by three and add one. Stop if the resulting number is one, otherwise repeat the procedure.
As example, we start width 10.
• 10 is even, so the next number is: 10/2 = 5
• 5 is odd so the next number is: 3*5+1=16
• 16 is even, so the next number is: 16/2 = 8
• 8 is even, so the next number is: 8/2 = 4
• 4 is even, so the next number is: 4/2 = 2
• 2 is even, so the next number is: 1.

7, 22, 11, 34, 17, 52, 26, 13, 40, 20, 10, 5, 16, 8, 4, 2, 1.

We are interested in the question: Given a number n, how many numbers are there in the sequence? For n=10, we get 7 numbers (10, 5, 16, 8, 4, 2, 1). For n=7 we get 17 numbers (See above).

Note that we include both the number n we start with and the final number 1.

How can GHCi help us to answer the question? We start with defining a function `next` that given a number computes the next number in the sequence. Define the function `next` What is the length of the sequence for n = 6? We want to define a function `steps` that takes a number n as argument and calculates the length of the generated sequence. What is ```steps 20```? And `steps 3`?
Guided by the previous exercise we observe that the function steps complies with:
```steps :: Int -> Int
steps n
| n == 1    = 1
| otherwise = steps(next n)+1
```
We call this a recursive definition. (You should have met this concept before - otherwise ask for a refund on your undergraduate education!) Write the definition in your file. Load it in to GHCi, and calculate `steps` n for several different values of n.

It all seems to work without any problem. But at the same time one can wonder: Can you be sure that eventually you will reach the number 1 no matter what number you start with?
Finally, we define the function `numbers` that calculates the actual list of numbers generated in the game:
```numbers :: Int -> [Int]
numbers n
| n==1      = 
| otherwise = n : numbers(next n)
```
Load the function into GHCi and try:
````numbers 10`
[10, 5, 16, 8, 4, 2, 1]
`numbers 17`
[17, 52, 26, 13, 40, 20, 10, 5, 16, 8, 4, 2, 1]
`numbers 1`


```
Study the function definition: When n=1 the result is the list ``. Otherwise we use the operator `:`, named cons, which constructs a list from an element and a list by placing the element at the front of the list. The result of `numbers n` is `n` followed by the list `numbers(next n)`.

Now we have defined the function numbers we don't need to define steps anymore because there is a function length in the prelude that calculates the length of a list. Try:

````length [1,6,33,8,7,14]`
6
`length (numbers 10)`
7

```