Gaston Sanchez
- Understand the concept of R Expressions
- Learn the difference between simple and compound expressions
- Understand the use of braces to group expressions
- Conditional structures: if-then-else, and
switch()
Before talking about conditional structures and loops, we must first talk about expressions.
R programs are made up of expressions. These can be either simple expressions or compound expressions. Compound expressions consist of simple expressions separated by semicolons or newlines, and grouped within braces.
# structure of a compound expression
# with simple expressions separated by semicolons
{expression_1; expression_2; ...; expression_n}
# structure of a compound expression
# with simple expressions separated by newlines
{
expression_1
expression_2
expression_n
}Here’s a less abstract example:
# simple expressions separated by semicolons
{"first"; 1; 2; 3; "last"}## [1] "last"
# simple expressions separated by newlines
{
"first"
1
2
3
"last"
}## [1] "last"
Writing compound expressions like those in the previous example is not something common among R users. Although the expressions are perfectly valid, these examples are very dummy (just for illustration purposes).
I discourage you from grouping multiple expressions with semicolons because it makes it difficult to inspect things. As for the expressions separated by newlines, they do play an important role but they are typically used together with other programming structures (e.g. functions, conditionals, loops).
A fundamental notion about expressions is that every expression in R has a value. If you have a simple expression like:
a <- 5then a has the value 5. In contrast, the value of a compound
expression is the value of the last evaluated expression.
Here’s one example of a compund expression. Note that the entire
expression is assigned to x:
x <- {5; 10}- What is the value of
x?- 5?
- 10?
- 5, 10?
In this case, the compound expression has a value of 10, which was the
last expression inside the braces.
Here’s the same compound expression as above, but now with simple expressions in newlines:
x <- {
5
10
}
x## [1] 10
To make sure you don’t forget it, repeat this mantra:
- Every expression in R has a value: the value of the last evaluated statement.
- Every expression in R has a value: the value of the last evaluated statement.
- Every expression in R has a value: the value of the last evaluated statement.
It is possible to have assignments within compound expressions and the values of the variables which this produces can be used in later expressions.
# simple expressions (made up of assignments) separated by newlines
{
one <- 1
pie <- pi
zee <- "z"
}
one## [1] 1
pie## [1] 3.141593
zee## [1] "z"
Here’s another example:
z <- { x = 10 ; y = x^2; x + y }
x## [1] 10
y## [1] 100
z## [1] 110
Now that we’ve introduced the concept of R expressions, let’s introduce conditional structures
Every programming language comes with a set of structures that allows us to have control over how commands are executed. One of these structures is called conditionals, and as its name indicates, they are used to evaluate conditions.
The most common conditional structure, conceptually speaking, is the if-then-else statement. This type of statement makes it possible to choose between two (possibly compound) expressions depending on the value of a (logical) condition.
In R (as in many other languages) the if-then-else statement has the following structure:
if (condition) {
# do something
} else {
# do something else
}As you can tell, the if clause works like a function: if(condition).
Likewise, braces are used to group one or more expressions. If the
condition to be evaluated is true, then just the expressions inside the
first pair of braces are executed. If the condition is false, then the
expressions inside the second pair of braces are executed:
x <- 1
if (x > 0) {
print("positive")
} else {
print("not positive")
}## [1] "positive"
For readability reasons, most users prefer to write if (condition)
instead of if(condition). The condition is an expression that when
evaluated returns a logical value of length one. In other words,
whatever you pass as the input of the if clause, it has to be
something that becomes TRUE or FALSE
if (TRUE) {
print("TRUE")
} else {
print("FALSE")
}## [1] "TRUE"
if (FALSE) {
print("TRUE")
} else {
print("FALSE")
}## [1] "FALSE"
if statements can be written in different forms, depending on the
types of expressions that are evaluated. If the expressions of both the
True part and the False part are simple expressions, the
if-then-else can be simplified as:
if (condition) expression_1 else expression_2With simple expressions there’s actually no need to use braces:
x <- 10
if (x > 0) y <- sqrt(x) else y <- -sqrt(-x)
y## [1] 3.162278
The previous statement can be written more succinctly in R as:
x <- 10
y <- if (x > 0) sqrt(x) else -sqrt(-x)
y## [1] 3.162278
Again, even though the previous commands are perfectly OK, it is preferred to use braces when working with conditional structures. This is a good practice that improves readibility:
# embrace braces: use them as much as possible!
x <- 10
if (x > 0) {
y <- sqrt(x)
} else {
y <- -sqrt(-x)
}
y## [1] 3.162278
There is a simplified form of if-then-else statement which is available when there is no expression in the False part to evaluate. This statement has the general form:
if (condition) expressionand is equivalent to:
if (condition) expression else NULLHere’s an example:
x <- 4
y <- 2
if (x > y) print("x is greater than y")## [1] "x is greater than y"
A common situation involves working with multiple conditions at the same time. You can chain multiple if-else statements:
y <- 1 # Change this value!
if (y > 0) {
print("positive")
} else if (y < 0) {
print("negative")
} else {
print("zero?")
}## [1] "positive"
Write R code that will “squish” a number into the interval [0, 100], so that a number less than 0 is replaced by 0 and a number greater than 100 is replaced by 100.
z <- 100 * pi
# Fill in the following if-else statements. You may (or may not)
# have to add or subtract else if or else statements.
if (TRUE) { # Replace TRUE with a condition.
} else if (TRUE) { # Replace TRUE with a condition.
} else {
}## NULL
Working with multiple chained if’s becomes cumbersome. Consider the following example that uses several if’s to convert a day of the week into a number:
# Convert the day of the week into a number.
day <- "Tuesday" # Change this value!
if (day == 'Sunday') {
num_day <- 1
} else {
if (day == "Monday") {
num_day <- 2
} else {
if (day == "Tuesday") {
num_day <- 3
} else {
if (day == "Wednesday") {
num_day <- 4
} else {
if (day == "Thursday") {
num_day <- 5
} else {
if (day == "Friday") {
num_day <- 6
} else {
if (day == "Saturday") {
num_day <- 7
}
}
}
}
}
}
}
num_day## [1] 3
Working with several nested if’s like in the example above can be a nightmare.
In R, you can get rid of many of the braces like this:
# Convert the day of the week into a number.
day <- "Tuesday" # Change this value!
if (day == 'Sunday') {
num_day <- 1
} else if (day == "Monday") {
num_day <- 2
} else if (day == "Tuesday") {
num_day <- 3
} else if (day == "Wednesday") {
num_day <- 4
} else if (day == "Thursday") {
num_day <- 5
} else if (day == "Friday") {
num_day <- 6
} else if (day == "Saturday") {
num_day <- 7
}
num_day## [1] 3
But still we have too many if’s, and there’s a lot of repetition in the code. If you find yourself using many if-else statements with identical structure for slightly different cases, you may want to consider a switch statement instead:
# Convert the day of the week into a number.
day <- "Tuesday" # Change this value!
switch(day, # The expression to be evaluated.
Sunday = 1,
Monday = 2,
Tuesday = 3,
Wednesday = 4,
Thursday = 5,
Friday = 6,
Saturday = 7,
NA) # an (optional) default value if there are no matches## [1] 3
Switch statements can also accept integer arguments, which will act as indices to choose a corresponding element:
# Convert a number into a day of the week.
day_num <- 3 # Change this value!
switch(day_num,
"Sunday",
"Monday",
"Tuesday",
"Wednesday",
"Thursday",
"Friday",
"Saturday")## [1] "Tuesday"
Consider the formula for the area (A) of a circle of given radius (r):
[ A = \pi r^2 ]
We can write a function circle_area() that calculates the area of a
circle. This function takes one argument radius, and we can give
radius a default value of 1:
circle_area <- function(radius = 1) {
pi * radius^2
}For example:
# default (radius 1)
circle_area()## [1] 3.141593
# radius 3
circle_area(radius = 3)## [1] 28.27433
What happens if you give radius a negative value?
# default (radius 1)
circle_area(-1)## [1] 3.141593
The function circle_area() still returns a value even when the radius
is negative, which does not make sense. In many cases, it is desirable
to make some checkings on the provided input. If the input is not
appropriate, we should stop the execution of the function. For this
purpose, we can use the function stop()
circle_area <- function(radius = 1) {
if (radius < 0) {
stop("radius must be positive")
}
pi * radius^2
}
# this should work
circle_area(1)
# this should not work
circle_area(-1)