ModernDive

Chapter 4 Data Wrangling

So far in our journey, we’ve seen how to look at data saved in data frames using the glimpse() and View() functions in Chapter 2 on and how to create data visualizations using the ggplot2 package in Chapter 3. In particular we studied what we term the “five named graphs” (5NG):

  1. scatterplots via geom_point()
  2. linegraphs via geom_line()
  3. boxplots via geom_boxplot()
  4. histograms via geom_histogram()
  5. barplots via geom_bar() or geom_col()

We created these visualizations using the “Grammar of Graphics”, which maps variables in a data frame to the aesthetic attributes of one the above 5 geometric objects. We can also control other aesthetic attributes of the geometric objects such as the size and color as seen in the Gapminder data example in Figure 3.1.

Recall however in Section 3.9.4 we discussed that for two of our visualizations we needed transformed/modified versions of existing data frames. Recall for example the scatterplot of departure and arrival delay only for Alaska Airlines flights. In order to create this visualization, we needed to first pare down the flights data frame to a new data frame alaska_flights consisting of only carrier == "AS" flights using the filter() function.

In this chapter, we’ll introduce a series of functions from the dplyr package that will allow you to take a data frame and

  1. filter() its existing rows to only pick out a subset of them. For example, the alaska_flights data frame above.
  2. summarize() one of its columns/variables with a summary statistic. Examples include the median and interquartile range of temperatures as we saw in Section 3.7 on boxplots.
  3. group_by() its rows. In other words assign different rows to be part of the same group and report summary statistics for each group separately. For example, say perhaps you don’t want a single overall average departure delay dep_delay for all three origin airports combined, but rather three separate average departure delays, one for each of the three origin airports.
  4. mutate() its existing columns/variables to create new ones. For example, convert hourly temperature recordings from °F to °C.
  5. arrange() its rows. For example, sort the rows of weather in ascending or descending order of temp.
  6. join() it with another data frame by matching along a “key” variable. In other words, merge these two data frames together.

Notice how we used computer code font to describe the actions we want to take on our data frames. This is because the dplyr package for data wrangling that we’ll introduce in this chapter has intuitively verb-named functions that are easy to remember.

We’ll start by introducing the pipe operator %>%, which allows you to combine multiple data wrangling verb-named functions into a single sequential chain of actions.

Needed packages

Let’s load all the packages needed for this chapter (this assumes you’ve already installed them). If needed, read Section 2.3 for information on how to install and load R packages.

4.1 The pipe operator: %>%

Before we start data wrangling, let’s first introduce a very nifty tool that gets loaded along with the dplyr package: the pipe operator %>%. Say you would like to perform a hypothetical sequence of operations on a hypothetical data frame x using hypothetical functions f(), g(), and h():

  1. Take x then
  2. Use x as an input to a function f() then
  3. Use the output of f(x) as an input to a function g() then
  4. Use the output of g(f(x)) as an input to a function h()

One way to achieve this sequence of operations is by using nesting parentheses as follows:

The above code isn’t so hard to read since we are applying only three functions: f(), then g(), then h(). However, you can imagine that this can get progressively harder and harder to read as the number of functions applied in your sequence increases. This is where the pipe operator %>% comes in handy. %>% takes one output of one function and then “pipes” it to be the input of the next function. Furthermore, a helpful trick is to read %>% as “then.” For example, you can obtain the same output as the above sequence of operations as follows:

You would read this above sequence as:

  1. Take x then
  2. Use this output as the input to the next function f() then
  3. Use this output as the input to the next function g() then
  4. Use this output as the input to the next function h()

So while both approaches above would achieve the same goal, the latter is much more human-readable because you can read the sequence of operations line-by-line. But what are the hypothetical x, f(), g(), and h()? Throughout this chapter on data wrangling:

  • The starting value x will be a data frame. For example: flights.
  • The sequence of functions, here f(), g(), and h(), will be a sequence of any number of the six data wrangling verb-named functions we listed in the introduction to this chapter. For example: filter(carrier == "AS").
  • The result will the transformed/modified data frame that you want. For example: a data frame consisting of only the subset of rows in flights corresponding to Alaska Airlines flights.

Much like when adding layers to a ggplot() using the + sign at the end of lines, you form a single chain of data wrangling operations by combining verb-named functions into a single sequence with pipe operators %>% at the end of lines. So continuing our example involving Alaska Airlines flights, we form a chain using the pipe operator %>% and save the resulting data frame in alaska_flights:

Keep in mind, there are many more advanced data wrangling functions than just the six listed in the introduction to this chapter; you’ll see some examples of these near in Section 4.8. However, just with these six verb-named functions you’ll be able to perform a broad array of data wrangling tasks for the rest of this book.

4.2 filter rows

Diagram of filter() rows operation.

FIGURE 4.1: Diagram of filter() rows operation.

The filter() function here works much like the “Filter” option in Microsoft Excel; it allows you to specify criteria about the values of a variables in your dataset and then filters out only those rows that match that criteria. We begin by focusing only on flights from New York City to Portland, Oregon. The dest code (or airport code) for Portland, Oregon is "PDX". Run the following and look at the resulting “spreadsheet”-like view to ensure that only flights heading to Portland are chosen here:

Note the following:

  • The ordering of the commands:
    • Take the flights data frame flights then
    • filter the data frame so that only those where the dest equals "PDX" are included.
  • We test for equality using the double equal sign == and not a single equal sign =. In other words filter(dest = "PDX") will yield an error. This is a convention across many programming languages. If you are new to coding, you’ll probably forget to use the double equal sign == a few times before you get the hang of it.

You can use other mathematical operations beyond just == to form criteria:

  • > corresponds to “greater than”
  • < corresponds to “less than”
  • >= corresponds to “greater than or equal to”
  • <= corresponds to “less than or equal to”
  • != corresponds to “not equal to”. The ! is used in many programming languages to indicate “not”.

Furthermore, you can combine multiple criteria together using operators that make comparisons:

  • | corresponds to “or”
  • & corresponds to “and”

To see many of these in action, let’s filter flights for all rows that:

  • Departed from JFK airport and
  • Were heading to Burlington, Vermont ("BTV") or Seattle, Washington ("SEA") and
  • Departed in the months of October, November, or December.

Run the following:

Note that even though colloquially speaking one might say “all flights leaving Burlington, Vermont and Seattle, Washington,” in terms of computer operations, we really mean “all flights leaving Burlington, Vermont or leaving Seattle, Washington.” For a given row in the data, dest can be “BTV”, “SEA”, or something else, but not “BTV” and “SEA” at the same time. Furthermore, note the careful use of parentheses around the dest == "BTV" | dest == "SEA".

We can often skip the use of & and just separate our conditions with a comma. In other words the code above will return the identical output btv_sea_flights_fall as this code below:

Let’s present another example that uses the ! “not” operator to pick rows that don’t match a criteria. As mentioned earlier, the ! can be read as “not.” Here we are filtering rows corresponding to flights that didn’t go to Burlington, VT or Seattle, WA.

Again, note the careful use of parentheses around the (dest == "BTV" | dest == "SEA"). If we didn’t use parentheses as follows:

We would be returning all flights not headed to "BTV" or those headed to "SEA", which is an entirely different resulting data frame.

Now say we have a large list of airports we want to filter for, say BTV, SEA, PDX, SFO, and BDL. We could continue to use the | (“or”) operator as so:

but as we progressively include more airports, this will get unwieldy. A slightly shorter approach uses the %in% operator:

What this code is doing is filtering flights for all flights where dest is in the list of airports c("BTV", "SEA", "PDX", "SFO", "BDL"). Recall from Chapter 2 that the c() function “combines” or “concatenates” values in a vector of values. Both outputs of many_airports are the same, but as you can see the latter takes much less time to code.

As a final note we point out that filter() should often be among the first verbs you apply to your data. This cleans your dataset to only those rows you care about, or put differently, it narrows down the scope of your data frame to just the observations your care about.

Learning check

(LC4.1) What’s another way of using the “not” operator ! to filter only the rows that are not going to Burlington VT nor Seattle WA in the flights data frame? Test this out using the code above.

4.3 summarize variables

The next common task when working with data is to return summary statistics: a single numerical value that summarizes a large number of values, for example the mean/average or the median. Other examples of summary statistics that might not immediately come to mind include the sum, the smallest value AKA the minimum, the largest value AKA the maximum, and the standard deviation; they are all summaries of a large number of values.

Diagram of summarize() rows.

FIGURE 4.2: Diagram of summarize() rows.

Diagram of concept of a summary function.

FIGURE 4.3: Diagram of concept of a summary function.

Let’s calculate the mean and the standard deviation of the temperature variable temp in the weather data frame included in the nycflights13 package (See Appendix A). We’ll do this in one step using the summarize() function from the dplyr package and save the results in a new data frame summary_temp with columns/variables mean and the std_dev. Note you can also use the UK spelling of “summarise” using the summarise() function.

As shown in Figures 4.2 and 4.3, the weather data frame’s many rows will be collapsed into a single row of just the summary values, in this case the mean and standard deviation:

# A tibble: 1 x 2
   mean std_dev
  <dbl>   <dbl>
1    NA      NA

Why are the values returned NA? As we saw in Section 3.3.1 when creating the scatterplot of departure and arrival delays for alaska_flights, NA is how R encodes missing values where NA indicates “not available” or “not applicable.” If a value for a particular row and a particular column does not exist, NA is stored instead. Values can be missing for many reasons. Perhaps the data was collected but someone forgot to enter it? Perhaps the data was not collected at all because it was too difficult? Perhaps there was an erroneous value that someone entered that has been correct to read as missing? You’ll often encounter issues with missing values when working with real data.

Going back to our summary_temp output above, by default any time you try to calculate a summary statistic of a variable that has one or more NA missing values in R, then NA is returned. To work around this fact, you can set the na.rm argument to TRUE, where rm is short for “remove”; this will ignore any NA missing values and only return the summary value for all non-missing values.

The code below computes the mean and standard deviation of all non-missing values of temp. Notice how the na.rm=TRUE are used as arguments to the mean() and sd() functions individually, and not to the summarize() function.

# A tibble: 1 x 2
   mean std_dev
  <dbl>   <dbl>
1  55.3    17.8

However, one needs to be cautious whenever ignoring missing values as we’ve done above. In the upcoming Learning Checks we’ll consider the possible ramifications of blindly sweeping rows with missing values “under the rug.” This is in fact why the na.rm argument to any summary statistic function in R has is set to FALSE by default; in other words, do not ignore rows with missing values by default. R is alerting you to the presence of missing data and you should by mindful of this missingness and any potential causes of this missingness throughtout your analysis.

What are other summary statistic functions can we use inside the summarize() verb? As seen in Figure 4.3, you can use any function in R that takes many values and returns just one. Here are just a few:

  • mean(): the mean AKA the average
  • sd(): the standard deviation, which is a measure of spread
  • min() and max(): the minimum and maximum values respectively
  • IQR(): Interquartile range
  • sum(): the sum
  • n(): a count of the number of rows/observations in each group. This particular summary function will make more sense when group_by() is covered in Section 4.4.

Learning check

(LC4.2) Say a doctor is studying the effect of smoking on lung cancer for a large number of patients who have records measured at five year intervals. She notices that a large number of patients have missing data points because the patient has died, so she chooses to ignore these patients in her analysis. What is wrong with this doctor’s approach?

(LC4.3) Modify the above summarize function to create summary_temp to also use the n() summary function: summarize(count = n()). What does the returned value correspond to?

(LC4.4) Why doesn’t the following code work? Run the code line by line instead of all at once, and then look at the data. In other words, run summary_temp <- weather %>% summarize(mean = mean(temp, na.rm = TRUE)) first.

4.4 group_by rows

Diagram of group_by() and summarize().

FIGURE 4.4: Diagram of group_by() and summarize().

Say instead of the a single mean temperature for the whole year, you would like 12 mean temperatures, one for each of the 12 months separately? In other words, we would like to compute the mean temperature split by month AKA sliced by month AKA aggregated by month. We can do this by “grouping” temperature observations by the values of another variable, in this case by the 12 values of the variable month. Run the following code:

# A tibble: 12 x 3
   month  mean std_dev
   <dbl> <dbl>   <dbl>
 1     1  35.6   10.2 
 2     2  34.3    6.98
 3     3  39.9    6.25
 4     4  51.7    8.79
 5     5  61.8    9.68
 6     6  72.2    7.55
 7     7  80.1    7.12
 8     8  74.5    5.19
 9     9  67.4    8.47
10    10  60.1    8.85
11    11  45.0   10.4 
12    12  38.4    9.98

This code is identical to the previous code that created summary_temp, but with an extra group_by(month) added before the summarize(). Grouping the weather dataset by month and then applying the summarize() functions yields a data frame that displays the mean and standard deviation temperature split by the 12 months of the year.

It is important to note that the group_by() function doesn’t change data frames by itself. Rather it changes the meta-data, or data about the data, specifically the group structure. It is only after we apply the summarize() function that the data frame changes. For example, let’s consider the diamonds data frame included in the ggplot2 package. Run this code, specifically in the console:

# A tibble: 53,940 x 10
   carat cut       color clarity depth table price     x     y     z
   <dbl> <ord>     <ord> <ord>   <dbl> <dbl> <int> <dbl> <dbl> <dbl>
 1 0.23  Ideal     E     SI2      61.5    55   326  3.95  3.98  2.43
 2 0.21  Premium   E     SI1      59.8    61   326  3.89  3.84  2.31
 3 0.23  Good      E     VS1      56.9    65   327  4.05  4.07  2.31
 4 0.290 Premium   I     VS2      62.4    58   334  4.2   4.23  2.63
 5 0.31  Good      J     SI2      63.3    58   335  4.34  4.35  2.75
 6 0.24  Very Good J     VVS2     62.8    57   336  3.94  3.96  2.48
 7 0.24  Very Good I     VVS1     62.3    57   336  3.95  3.98  2.47
 8 0.26  Very Good H     SI1      61.9    55   337  4.07  4.11  2.53
 9 0.22  Fair      E     VS2      65.1    61   337  3.87  3.78  2.49
10 0.23  Very Good H     VS1      59.4    61   338  4     4.05  2.39
# … with 53,930 more rows

Observe that the first line of the output reads # A tibble: 53,940 x 10. This is an example of meta-data, in this case the number of observations/rows and variables/columns in diamonds. The actual data itself are the subsequent table of values.

Now let’s pipe the diamonds data frame into group_by(cut). Run this code, specifically in the console:

# A tibble: 53,940 x 10
# Groups:   cut [5]
   carat cut       color clarity depth table price     x     y     z
   <dbl> <ord>     <ord> <ord>   <dbl> <dbl> <int> <dbl> <dbl> <dbl>
 1 0.23  Ideal     E     SI2      61.5    55   326  3.95  3.98  2.43
 2 0.21  Premium   E     SI1      59.8    61   326  3.89  3.84  2.31
 3 0.23  Good      E     VS1      56.9    65   327  4.05  4.07  2.31
 4 0.290 Premium   I     VS2      62.4    58   334  4.2   4.23  2.63
 5 0.31  Good      J     SI2      63.3    58   335  4.34  4.35  2.75
 6 0.24  Very Good J     VVS2     62.8    57   336  3.94  3.96  2.48
 7 0.24  Very Good I     VVS1     62.3    57   336  3.95  3.98  2.47
 8 0.26  Very Good H     SI1      61.9    55   337  4.07  4.11  2.53
 9 0.22  Fair      E     VS2      65.1    61   337  3.87  3.78  2.49
10 0.23  Very Good H     VS1      59.4    61   338  4     4.05  2.39
# … with 53,930 more rows

Observe that now there is additional meta-data: # Groups: cut [5] indicating that the grouping structure meta-data has been set based on the 5 possible values AKA levels of the categorical variable cut: "Fair", "Good", "Very Good", "Premium", "Ideal". On the other hand observe that the data has not changed: it is still a table of 53,940 \(\times\) 10 values.

Only by combining a group_by() with another data wrangling operation, in this case summarize() will the actual data be transformed.

# A tibble: 5 x 2
  cut       avg_price
  <ord>         <dbl>
1 Fair          4359.
2 Good          3929.
3 Very Good     3982.
4 Premium       4584.
5 Ideal         3458.

If we would like to remove this group structure meta-data, we can pipe the resulting data frame into the ungroup() function. Observe how the # Groups: cut [5] meta-data is no longer present. Run this code, specifically in the console:

# A tibble: 53,940 x 10
   carat cut       color clarity depth table price     x     y     z
   <dbl> <ord>     <ord> <ord>   <dbl> <dbl> <int> <dbl> <dbl> <dbl>
 1 0.23  Ideal     E     SI2      61.5    55   326  3.95  3.98  2.43
 2 0.21  Premium   E     SI1      59.8    61   326  3.89  3.84  2.31
 3 0.23  Good      E     VS1      56.9    65   327  4.05  4.07  2.31
 4 0.290 Premium   I     VS2      62.4    58   334  4.2   4.23  2.63
 5 0.31  Good      J     SI2      63.3    58   335  4.34  4.35  2.75
 6 0.24  Very Good J     VVS2     62.8    57   336  3.94  3.96  2.48
 7 0.24  Very Good I     VVS1     62.3    57   336  3.95  3.98  2.47
 8 0.26  Very Good H     SI1      61.9    55   337  4.07  4.11  2.53
 9 0.22  Fair      E     VS2      65.1    61   337  3.87  3.78  2.49
10 0.23  Very Good H     VS1      59.4    61   338  4     4.05  2.39
# … with 53,930 more rows

Let’s now revisit the n() counting summary function we introduced in the previous section. For example, suppose we’d like to count how many flights departed each of the three airports in New York City:

# A tibble: 3 x 2
  origin  count
  <chr>   <int>
1 EWR    120835
2 JFK    111279
3 LGA    104662

We see that Newark ("EWR") had the most flights departing in 2013 followed by "JFK" and lastly by LaGuardia ("LGA"). Note there is a subtle but important difference between sum() and n(); While sum() returns the sum of a numerical variable, n() returns counts of the the number of rows/observations.

4.4.1 Grouping by more than one variable

You are not limited to grouping by one variable! Say you wanted to know the number of flights leaving each of the three New York City airports for each month, we can also group by a second variable month: group_by(origin, month). We see there are 36 rows to by_origin_monthly because there are 12 months for 3 airports (EWR, JFK, and LGA).

# A tibble: 36 x 3
# Groups:   origin [3]
   origin month count
   <chr>  <int> <int>
 1 EWR        1  9893
 2 EWR        2  9107
 3 EWR        3 10420
 4 EWR        4 10531
 5 EWR        5 10592
 6 EWR        6 10175
 7 EWR        7 10475
 8 EWR        8 10359
 9 EWR        9  9550
10 EWR       10 10104
# … with 26 more rows

Why do we group_by(origin, month) and not group_by(origin) and then group_by(month)? Let’s investigate:

# A tibble: 12 x 2
   month count
   <int> <int>
 1     1 27004
 2     2 24951
 3     3 28834
 4     4 28330
 5     5 28796
 6     6 28243
 7     7 29425
 8     8 29327
 9     9 27574
10    10 28889
11    11 27268
12    12 28135

What happened here is that the second group_by(month) overrode the group structure meta-data of the first group_by(origin), so that in the end we are only grouping by month. The lesson here is if you want to group_by() two or more variables, you should include all these variables in a single group_by() function call.

Learning check

(LC4.5) Recall from Chapter 3 when we looked at plots of temperatures by months in NYC. What does the standard deviation column in the summary_monthly_temp data frame tell us about temperatures in New York City throughout the year?

(LC4.6) What code would be required to get the mean and standard deviation temperature for each day in 2013 for NYC?

(LC4.7) Recreate by_monthly_origin, but instead of grouping via group_by(origin, month), group variables in a different order group_by(month, origin). What differs in the resulting dataset?

(LC4.8) How could we identify how many flights left each of the three airports for each carrier?

(LC4.9) How does the filter() operation differ from a group_by() followed by a summarize()?

4.5 mutate existing variables

Diagram of mutate() columns.

FIGURE 4.5: Diagram of mutate() columns.

Another common transformation of data is to create/compute new variables based on existing ones. For example, say you are more comfortable thinking of temperature in degrees Celsius °C and not degrees Farenheit °F. The formula to convert temperatures from °F to °C is:

\[ \text{temp in C} = \frac{\text{temp in F} - 32}{1.8} \]

We can apply this formula to the temp variable using the mutate() function, which takes existing variables and mutates them to create new ones.

Note that we have overwritten the original weather data frame with a new version that now includes the additional variable temp_in_C. In other words, the mutate() command outputs a new data frame which then gets saved over the original weather data frame. Furthermore, note how in mutate() we used temp_in_C = (temp-32)/1.8 to create a new variable temp_in_C.

Why did we overwrite the data frame weather instead of assigning the result to a new data frame like weather_new, but on the other hand why did we not overwrite temp, but instead created a new variable called temp_in_C? As a rough rule of thumb, as long as you are not losing original information that you might need later, it’s acceptable practice to overwrite existing data frames. On the other hand, had we used mutate(temp = (temp - 32) / 1.8) instead of mutate(temp_in_C = (temp - 32) / 1.8), we would have overwritten the original variable temp and lost its values.

Let’s compute average monthly temperatures in both °F and °C using the similar group_by() and summarize() code as in the previous section.

# A tibble: 12 x 3
   month mean_temp_in_F mean_temp_in_C
   <dbl>          <dbl>          <dbl>
 1     1           35.6           2.02
 2     2           34.3           1.26
 3     3           39.9           4.38
 4     4           51.7          11.0 
 5     5           61.8          16.6 
 6     6           72.2          22.3 
 7     7           80.1          26.7 
 8     8           74.5          23.6 
 9     9           67.4          19.7 
10    10           60.1          15.6 
11    11           45.0           7.22
12    12           38.4           3.58

Let’s consider another example. Passengers are often frustrated when their flights depart late, but change their mood a bit if pilots can make up some time during the flight to get them to their destination close to the original arrival time. This is commonly referred to as “gain” and we will create this variable using the mutate() function.

Let’s take a look at only the dep_delay, arr_delay, and the resulting gain variables for the first 5 rows in our updated flights data frame:

TABLE 4.1: Subset of flights data frame
dep_delay arr_delay gain
2 11 -9
4 20 -16
2 33 -31
-1 -18 17
-6 -25 19

The flight in the first row departed 2 minutes late but arrived 11 minutes late, so its “gained time in the air” is actually a loss of 9 minutes, hence its gain is -9. Contrast this to the flight in the fourth row which departed a minute early (dep_delay of -1) but arrived 18 minutes early (arr_delay of -18), so its “gained time in the air” is 17 minutes, hence its gain is +17.

Let’s look at summary measures of this gain variable and even plot it in the form of a histogram:

# A tibble: 1 x 8
    min    q1 median    q3   max  mean    sd missing
  <dbl> <dbl>  <dbl> <dbl> <dbl> <dbl> <dbl>   <int>
1  -196    -3      7    17   109  5.66  18.0    9430

We’ve recreated the summary function we saw in Chapter 3 here using the summarize() function in dplyr.

Histogram of gain variable.

FIGURE 4.6: Histogram of gain variable.

We can also create multiple columns at once and even refer to columns that were just created in a new column. Hadley and Garrett produce one such example in Chapter 5 of “R for Data Science” (Grolemund and Wickham 2016):

Learning check

(LC4.10) What do positive values of the gain variable in flights correspond to? What about negative values? And what about a zero value?

(LC4.11) Could we create the dep_delay and arr_delay columns by simply subtracting dep_time from sched_dep_time and similarly for arrivals? Try the code out and explain any differences between the result and what actually appears in flights.

(LC4.12) What can we say about the distribution of gain? Describe it in a few sentences using the plot and the gain_summary data frame values.

4.6 arrange and sort rows

One of the most common tasks people working with data would like to perform is sort the data frame’s rows in alphanumeric order of the values in a variable/column. For example, when calculating a median by hand requires you to first sort the data from the smallest to highest in value and then identify the “middle” value. The dplyr package has a function called arrange() that we will use to sort/reorder a data frame’s rows according to the values of the specified variable. This is often used after we have used the group_by() and summarize() functions as we will see.

Let’s suppose we were interested in determining the most frequent destination airports for all domestic flights departing from New York City in 2013:

# A tibble: 105 x 2
   dest  num_flights
   <chr>       <int>
 1 ABQ           254
 2 ACK           265
 3 ALB           439
 4 ANC             8
 5 ATL         17215
 6 AUS          2439
 7 AVL           275
 8 BDL           443
 9 BGR           375
10 BHM           297
# … with 95 more rows

Observe that by default the rows of the resulting freq_dest data frame are sorted in alphabetical order of dest destination. Say instead we would like to see the same data, but sorted from the most to the least number of flights num_flights instead:

# A tibble: 105 x 2
   dest  num_flights
   <chr>       <int>
 1 LEX             1
 2 LGA             1
 3 ANC             8
 4 SBN            10
 5 HDN            15
 6 MTJ            15
 7 EYW            17
 8 PSP            19
 9 JAC            25
10 BZN            36
# … with 95 more rows

This is actually giving us the opposite of what we are looking for: the rows are sorted with the least frequent destination airports displayed first. To switch the ordering to be descending instead of ascending we use the desc() function, which is short for “descending”:

# A tibble: 105 x 2
   dest  num_flights
   <chr>       <int>
 1 ORD         17283
 2 ATL         17215
 3 LAX         16174
 4 BOS         15508
 5 MCO         14082
 6 CLT         14064
 7 SFO         13331
 8 FLL         12055
 9 MIA         11728
10 DCA          9705
# … with 95 more rows

In other words, arrange() sorts in ascending order by default unless you override this default behavior by using desc().

4.7 join data frames

Another common data transformation task is “joining” or “merging” two different datasets. For example, in the flights data frame the variable carrier lists the carrier code for the different flights. While the corresponding airline names for "UA" and "AA" might be somewhat easy to guess (United and American Airlines), what airlines have codes? "VX", "HA", and "B6"? This information is provided in a separate data frame airlines.

We see that in airports, carrier is the carrier code while name is the full name of the airline company. Using this table, we can see that "VX", "HA", and "B6" correspond to Virgin America, Hawaiian Airlines, and JetBlue respectively. However, wouldn’t it be nice to have all this information in a single data frame instead of two separate data frames? We can do this by “joining” i.e. “merging” the flights and airlines data frames.

Note that the values in the variable carrier in the flights data frame match the values in the variable carrier in the airlines data frame. In this case, we can use the variable carrier as a key variable to match the rows of the two data frames. Key variables are almost always identification variables that uniquely identify the observational units as we saw in Subsection 2.4.4. This ensures that rows in both data frames are appropriately matched during the join. Hadley and Garrett (Grolemund and Wickham 2016) created the following diagram to help us understand how the different datasets are linked by various key variables:

Data relationships in nycflights13 from 'R for Data Science'.

FIGURE 4.7: Data relationships in nycflights13 from ‘R for Data Science’.

4.7.1 Matching “key” variable names

In both the flights and airlines data frames, the key variable we want to join/merge/match the rows of the two data frames by have the same name: carriers. We make use of the inner_join() function to join the two data frames, where the rows will be matched by the variable carrier.

Observe that the flights and flights_joined data frames are identical except that flights_joined has an additional variable name whose values correspond to the airline company names drawn from the airlines data frame.

A visual representation of the inner_join() is given below (Grolemund and Wickham 2016). There are other types of joins available (such as left_join(), right_join(), outer_join(), and anti_join()), but the inner_join() will solve nearly all of the problems you’ll encounter in this book.

Diagram of inner join from 'R for Data Science'.

FIGURE 4.8: Diagram of inner join from ‘R for Data Science’.

4.7.2 Different “key” variable names

Say instead you are interested in the destinations of all domestic flights departing NYC in 2013 and ask yourself:

  • “What cities are these airports in?”
  • “Is "ORD" Orlando?”
  • "Where is "FLL"?

The airports data frame contains airport codes:

However, looking at both the airports and flights frames and the visual representation of the relations between these data frames in Figure 4.8 above, we see that in:

  • the airports data frame the airport code is in the variable faa
  • the flights data frame the airport codes are in the variables origin and dest

So to join these two data frames so that we can identify the destination cities for example, our inner_join() operation will use the by = c("dest" = "faa") argument, which allows us to join two data frames where the key variable has a different name:

Let’s construct the sequence of commands that computes the number of flights from NYC to each destination, but also includes information about each destination airport:

# A tibble: 101 x 9
   dest  num_flights airport_name          lat    lon   alt    tz dst   tzone   
   <chr>       <int> <chr>               <dbl>  <dbl> <int> <dbl> <chr> <chr>   
 1 ORD         17283 Chicago Ohare Intl   42.0  -87.9   668    -6 A     America…
 2 ATL         17215 Hartsfield Jackson…  33.6  -84.4  1026    -5 A     America…
 3 LAX         16174 Los Angeles Intl     33.9 -118.    126    -8 A     America…
 4 BOS         15508 General Edward Law…  42.4  -71.0    19    -5 A     America…
 5 MCO         14082 Orlando Intl         28.4  -81.3    96    -5 A     America…
 6 CLT         14064 Charlotte Douglas …  35.2  -80.9   748    -5 A     America…
 7 SFO         13331 San Francisco Intl   37.6 -122.     13    -8 A     America…
 8 FLL         12055 Fort Lauderdale Ho…  26.1  -80.2     9    -5 A     America…
 9 MIA         11728 Miami Intl           25.8  -80.3     8    -5 A     America…
10 DCA          9705 Ronald Reagan Wash…  38.9  -77.0    15    -5 A     America…
# … with 91 more rows

In case you didn’t know, "ORD" is the airport code of Chicago O’Hare airport and "FLL" is the main airport in Fort Lauderdale, Florida, which we can now see in the airport_name variable in the resulting named_dests data frame.

4.7.3 Multiple “key” variables

Say instead we are in a situation where we need to join by multiple variables. For example, in Figure 4.7 above we see that in order to join the flights and weather data frames, we need more than one key variable: year, month, day, hour, and origin. This is because the combination of these 5 variables act to uniquely identify each observational unit in the weather data frame: hourly weather recordings at each of the 3 NYC airports.

We achieve this by specifying a vector of key variables to join by using the c() function for “combine” or “concatenate” that we saw earlier:

Learning check

(LC4.13) Looking at Figure 4.7, when joining flights and weather (or, in other words, matching the hourly weather values with each flight), why do we need to join by all of year, month, day, hour, and origin, and not just hour?

(LC4.14) What surprises you about the top 10 destinations from NYC in 2013?

4.7.4 Normal forms

The data frames included in the nycflights13 package are in a form that minimizes redundancy of data. For example, the flights data frame only saves the carrier code of the airline company; it does not include the actual name of the airline. For example the first row of flights has carrier equal to UA, but does it does not include the airline name “United Air Lines Inc.” The names of the airline companies are included in the name variable of the airlines data frame. In order to have the airline company name included in flights, we could join these two data frames as follows:

We are capable of performing this join because each of the data frames have keys in common to relate one to another: the carrier variable in both the flights and airlines data frames. The key variable(s) that we join are often identification variables we mentioned previously.

This is an important property of what’s known as normal forms of data. The process of decomposing data frames into less redundant tables without losing information is called normalization. More information is available on Wikipedia.

Learning check

(LC4.15) What are some advantages of data in normal forms? What are some disadvantages?

4.8 Other verbs

Here are some other useful data wrangling verbs that might come in handy:

  • select() only a subset of variables/columns
  • rename() variables/columns to have new names
  • Return only the top_n() values of a variable

4.8.1 select variables

Diagram of select() columns.

FIGURE 4.9: Diagram of select() columns.

We’ve seen that the flights data frame in the nycflights13 package contains 19 different variables. You can identify the names of these 19 variables by running the glimpse() function from the dplyr package:

However, say you only need two of these variables, say carrier and flight. You can select() these two variables:

This function makes exploring data frames with a very large number of variables easier for humans to process by restricting consideration to only those we care about, like our example with carrier and flight above. This might make viewing the dataset using the View() spreadsheet viewer more digestible. However, as far as the computer is concerned, it doesn’t care how many additional variables are in the data frame in question, so long as carrier and flight are included.

Let’s say instead you want to drop i.e deselect certain variables. For example, take the variable year in the flights data frame. This variable isn’t quite a “variable” in the sense that all the values are 2013 i.e. it doesn’t change. Say you want to remove the year variable from the data frame; we can deselect year by using the - sign:

Another way of selecting columns/variables is by specifying a range of columns:

The select() function can also be used to reorder columns in combination with the everything() helper function. Let’s suppose we’d like the hour, minute, and time_hour variables, which appear at the end of the flights dataset, to appear immediately after the year, month, and day variables while keeping the rest of the variables. In the code below everything() picks up all remaining variables.

Lastly, the helper functions starts_with(), ends_with(), and contains() can be used to select variables/column that match those conditions. For example:

4.8.2 rename variables

Another useful function is rename(), which as you may have guessed renames one column to another name. Suppose we want dep_time and arr_time to be departure_time and arrival_time instead in the flights_time data frame:

Note that in this case we used a single = sign within the rename(), for example departure_time = dep_time. This is because we are not testing for equality like we would using ==, but instead we want to assign a new variable departure_time to have the same values as dep_time and then delete the variable dep_time. It’s easy to forget if the new name comes before or after the equals sign. We usually remember this as “New Before, Old After” or NBOA.

4.8.3 top_n values of a variable

We can also return the top n values of a variable using the top_n() function. For example, we can return a data frame of the top 10 destination airports using the example from Section 4.7.2. Observe that we set the number of values to return to n = 10 and wt = num_flights to indicate that we want the rows corresponding to the top 10 values of num_flights. See the help file for top_n() by running ?top_n for more information.

Let’s further arrange() these results in descending order of num_flights:

Learning check

(LC4.16) What are some ways to select all three of the dest, air_time, and distance variables from flights? Give the code showing how to do this in at least three different ways.

(LC4.17) How could one use starts_with, ends_with, and contains to select columns from the flights data frame? Provide three different examples in total: one for starts_with, one for ends_with, and one for contains.

(LC4.18) Why might we want to use the select function on a data frame?

(LC4.19) Create a new data frame that shows the top 5 airports with the largest arrival delays from NYC in 2013.

4.9 Conclusion

4.9.1 Summary table

Let’s recap our data wrangling verbs in Table 4.2. Using these verbs and the pipe %>% operator from Section 4.1, you’ll be able to write easily legible code to perform almost all the data wrangling necessary for the rest of this book.

TABLE 4.2: Summary of data wrangling verbs
Verb Data wrangling operation
filter() Pick out a subset of rows
summarize() Summarize many values to one using a summary statistic function like mean(), median(), etc.
group_by() Add grouping structure to rows in data frame. Note this does not change values in data frame.
mutate() Create new variables by mutating existing ones
arrange() Arrange rows of a data variable in ascending (default) or descending order
inner_join() Join/merge two data frames, matching rows by a key variable

Learning check

(LC4.20) Let’s now put your newly acquired data wrangling skills to the test!

An airline industry measure of a passenger airline’s capacity is the available seat miles, which is equal to the number of seats available multiplied by the number of miles or kilometers flown summed over all flights. So for example say an airline had 2 flights using a plane with 10 seats that flew 500 miles and 3 flights using a plane with 20 seats that flew 1000 miles, the available seat miles would be 2 \(\times\) 10 \(\times\) 500 \(+\) 3 \(\times\) 20 \(\times\) 1000 = 70,000 seat miles.

Using the datasets included in the nycflights13 package, compute the available seat miles for each airline sorted in descending order. After completing all the necessary data wrangling steps, the resulting data frame should have 16 rows (one for each airline) and 2 columns (airline name and available seat miles). Here are some hints:

  1. Crucial: Unless you are very confident in what you are doing, it is worthwhile to not starting to code right away. Rather first sketch out on paper all the necessary data wrangling steps not using exact code, but rather high-level pseudocode that is informal yet detailed enough to articulate what you are doing. This way you won’t confuse what you are trying to do (the algorithm) with how you are going to do it (writing dplyr code).
  2. Take a close look at all the datasets using the View() function: flights, weather, planes, airports, and airlines to identify which variables are necessary to compute available seat miles.
  3. Figure 4.7 above showing how the various datasets can be joined will also be useful.
  4. Consider the data wrangling verbs in Table 4.2 as your toolbox!

4.9.2 Additional resources

An R script file of all R code used in this chapter is available here.

If you want to further unlock the power of the dplyr package for data wrangling, we suggest you that you check out RStudio’s “Data Transformation with dplyr” cheatsheet. This cheatsheet summarizes much more than what we’ve discussed in this chapter, in particular more-intermediate level and advanced data wrangling functions, while providing quick and easy to read visual descriptions.

You can access this cheatsheet by going to the RStudio Menu Bar -> Help -> Cheatsheets -> “Data Transformation with dplyr”:

Data Transformation with dplyr cheatsheet.

FIGURE 4.10: Data Transformation with dplyr cheatsheet.

On top of data wrangling verbs and examples we presented in this section, if you’d like to see more examples of using the dplyr package for data wrangling check out Chapter 5 of Garrett Grolemund and Hadley Wickham’s and Garrett’s book (Grolemund and Wickham 2016).

4.9.3 What’s to come?

So far in this book, we’ve explored, visualized, and wrangled data saved in data frames that are in spreadsheet-type format: rectangular with a certain number of rows corresponding to observations and a certain number of columns corresponding to variables describing the observations.

We’ll see in Chapter 5 that there are actually two ways to represent data in spreadsheet-type rectangular format: 1) “wide” format and 2) “tall/narrow” format also known in R circles as “tidy” format. While the distinction between “tidy” and non-“tidy” formatted data is very subtle, it has very large implications for whether or not we can use the ggplot2 package for data visualization and the dplyr package for data wrangling.

Furthermore, we’ve only explored, visualized, and wrangled data saved within R packages. What if you have spreadsheet data saved in a Microsoft Excel, Google Sheets, or “Comma-Separated Values” (CSV) file that you would like to analyze? In Chapter 5, we’ll show you how to import this data into R using the readr package.

References

Grolemund, Garrett, and Hadley Wickham. 2016. R for Data Science. http://r4ds.had.co.nz/.