Probably Overthinking It

This is the fourth in a series of excerpts from Elements of Data Science, now available from Lulu.com and online booksellers. It’s from Chapter 15, which is part of the political alignment case study. You can read the complete chapter here, or run the Jupyter notebook on Colab.

In the previous chapter, we used data from the General Social Survey (GSS) to plot changes in political alignment over time. In this notebook, we’ll explore the relationship between political alignment and respondents’ beliefs about themselves and other people.

First we’ll use groupby to compare the average response between groups and plot the average as a function of time. Then we’ll use the Pandas function pivot table to compute the average response within each group as a function of time.

Are People Fair?

In the GSS data, the variable fair contains responses to this question:

Do you think most people would try to take advantage of you if they got a chance, or would they try to be fair?

The possible responses are:

Code	Response
1	Take advantage
2	Fair
3	Depends

As always, we start by looking at the distribution of responses, that is, how many people give each response:

values(gss["fair"])

1.0    16089
2.0    23417
3.0     2897
Name: fair, dtype: int64

The plurality think people try to be fair (2), but a substantial minority think people would take advantage (1). There are also a number of NaNs, mostly respondents who were not asked this question.

gss["fair"].isna().sum()

29987

To count the number of people who chose option 2, “people try to be fair”, we’ll use a dictionary to recode option 2 as 1 and the other options as 0.

recode_fair = {1: 0, 2: 1, 3: 0}

As an alternative, we could include option 3, “depends”, by replacing it with 1, or give it less weight by replacing it with an intermediate value like 0.5. We can use replace to recode the values and store the result as a new column in the DataFrame.

gss["fair2"] = gss["fair"].replace(recode_fair)

And we’ll use values to make sure it worked.

values(gss["fair2"])

0.0    18986
1.0    23417
Name: fair2, dtype: int64

Now let’s see how the responses have changed over time.

Fairness Over Time

As we saw in the previous chapter, we can use groupby to group responses by year.

gss_by_year = gss.groupby("year")

From the result we can select fair2 and compute the mean.

fair_by_year = gss_by_year["fair2"].mean()

Here’s the result, which shows the fraction of people who say people try to be fair, plotted over time. As in the previous chapter, we plot the data points themselves with circles and a local regression model as a line.

plot_series_lowess(fair_by_year, "C1")

decorate(
    xlabel="Year",
    ylabel="Fraction saying yes",
    title="Would most people try to be fair?",
)

Sadly, it looks like faith in humanity has declined, at least by this measure. Let’s see what this trend looks like if we group the respondents by political alignment.

Political Views on a 3-point Scale

In the previous notebook, we looked at responses to polviews, which asks about political alignment. The valid responses are:

Code	Response
1	Extremely liberal
2	Liberal
3	Slightly liberal
4	Moderate
5	Slightly conservative
6	Conservative
7	Extremely conservative

To make it easier to visualize groups, we’ll lump the 7-point scale into a 3-point scale.

recode_polviews = {
    1: "Liberal",
    2: "Liberal",
    3: "Liberal",
    4: "Moderate",
    5: "Conservative",
    6: "Conservative",
    7: "Conservative",
}

We’ll use replace again, and store the result as a new column in the DataFrame.

gss["polviews3"] = gss["polviews"].replace(recode_polviews)

With this scale, there are roughly the same number of people in each group.

values(gss["polviews3"])

Conservative    21573
Liberal         17203
Moderate        24157
Name: polviews3, dtype: int64

Fairness by Group

Now let’s see who thinks people are more fair, conservatives or liberals. We’ll group the respondents by polviews3.

by_polviews = gss.groupby("polviews3")

And compute the mean of fair2 in each group.

by_polviews["fair2"].mean()

polviews3
Conservative    0.577879
Liberal         0.550849
Moderate        0.537621
Name: fair2, dtype: float64

It looks like conservatives are a little more optimistic, in this sense, than liberals and moderates. But this result is averaged over the last 50 years. Let’s see how things have changed over time.

Fairness over Time by Group

So far, we have grouped by polviews3 and computed the mean of fair2 in each group. Then we grouped by year and computed the mean of fair2 for each year. Now we’ll group by polviews3 and year, and compute the mean of fair2 in each group over time.

We could do that computation “by hand” using the tools we already have, but it is so common and useful that it has a name. It is called a pivot table, and Pandas provides a function called pivot_table that computes it. It takes the following arguments:

• values, which is the name of the variable we want to summarize: fair2 in this example.
• index, which is the name of the variable that will provide the row labels: year in this example.
• columns, which is the name of the variable that will provide the column labels: polview3 in this example.
• aggfunc, which is the function used to “aggregate”, or summarize, the values: mean in this example.

Here’s how we run it.

table = gss.pivot_table(
    values="fair2", index="year", columns="polviews3", aggfunc="mean"
)

The result is a DataFrame that has years running down the rows and political alignment running across the columns. Each entry in the table is the mean of fair2 for a given group in a given year.

table.head()

polviews3	Conservative	Liberal	Moderate
year
1975	0.625616	0.617117	0.647280
1976	0.631696	0.571782	0.612100
1978	0.694915	0.659420	0.665455
1980	0.600000	0.554945	0.640264
1983	0.572438	0.585366	0.463492

Reading across the first row, we can see that in 1975, moderates were slightly more optimistic than the other groups. Reading down the first column, we can see that the estimated mean of fair2 among conservatives varies from year to year. It is hard to tell looking at these numbers whether it is trending up or down – we can get a better view by plotting the results.

Plotting the Results

Before we plot the results, I’ll make a dictionary that maps from each group to a color. Seaborn provide a palette called muted that contains the colors we’ll use.

muted = sns.color_palette("muted", 5)
sns.palplot(muted)

And here’s the dictionary.

color_map = {"Conservative": muted[3], "Moderate": muted[4], "Liberal": muted[0]}

Now we can plot the results.

groups = ["Conservative", "Liberal", "Moderate"]
for group in groups:
    series = table[group]
    plot_series_lowess(series, color_map[group])

decorate(
    xlabel="Year",
    ylabel="Fraction saying yes",
    title="Would most people try to be fair?",
)

The fraction of respondents who think people try to be fair has dropped in all three groups, although liberals and moderates might have leveled off. In 1975, liberals were the least optimistic group. In 2022, they might be the most optimistic. But the responses are quite noisy, so we should not be too confident about these conclusions.

The premise of Think Stats, and the other books in the Think series, is that programming is a tool for teaching and learning — and many ideas that are commonly presented in math notation can be more clearly presented in code.

In the draft third edition of Think Stats there is almost no math — not because I made a special effort to avoid it, but because I found that I didn’t need it. For example, here’s how I present the binomial distribution in Chapter 5:

Mathematically, the distribution of these outcomes follows a binomial distribution, which has a PMF that is easy to compute.

from scipy.special import comb

def binomial_pmf(k, n, p):
    return comb(n, k) * (p**k) * ((1 - p) ** (n - k))

SciPy provides the comb function, which computes the number of combinations of n things taken k at a time, often pronounced “n choose k”.

binomial_pmf computes the probability of getting k hits out of n attempts, given p.

I could also present the PMF in math notation, but I’m not sure how it would help — the Python code represents the computation just as clearly. Some readers find math notation intimidating, and even for the ones who don’t, it takes some effort to decode. In my opinion, the payoff for this additional effort is too low.

But one of the people who read the draft disagrees. They wrote:

Provide equations for the distributions. You assume that the reader knows them and then you suddenly show a programming code for them — the code is a challenge to the reader to interpret without knowing the actual equation.

I acknowledge that my approach defies the expectation that we should present math first and then translate it into code. For readers who are used to this convention, presenting the code first is “sudden”.

But why? I think there are two reasons, one practical and one philosophical:

• The practical reason is the presumption that the reader is more familiar with math notation and less familiar with code. Of course that’s true for some people, but for other people, it’s the other way around. People who like math have lots of books to choose from; people who like code don’t.

• The philosophical reason is what I’m calling math supremacy, which is the idea that math notation is the real thing, and everything else — including and especially code — is an inferior imitation. My correspondent hints at this idea with the suggestion that the reader should see the “actual equation”. Math is actual; code is not.

I reject math supremacy. Math notation did not come from the sky on stone tablets; it was designed by people for a purpose. Programming languages were also designed by people, for different purposes. Math notation has some good properties — it is concise and it is nearly universal. But programming languages also have good properties — most notably, they are executable. When we express an idea in code, we can run it, test it, and debug it.

So here’s a thought: if you are writing for an audience that is comfortable with math notation, and your ideas can be expressed well in that form — go ahead and use math notation. But if you are writing for an audience that understands code, and your ideas can be expressed well in code — well then you should probably use code. “Actual” code.

I’ve written before about changes in marriage patterns in the U.S., and it’s one of the examples in Chapter 13 of the new third edition of Think Stats. My analysis uses data from the National Survey of Family Growth (NSFG). Today they released the most recent data, from surveys conducted in 2022 and 2023. So here are the results, updated with the newest data:

The patterns are consistent with what we’ve see in previous iterations — each successive cohort marries later than the previous one, and it looks like an increasing percentage of them will remain unmarried.

Data: National Center for Health Statistics (NCHS). (2024). 2022–2023 National Survey of Family Growth Public Use Data and Documentation. Hyattsville, MD: CDC National Center for Health Statistics. Retrieved from NSFG 2022–2023 Public Use Data Files, December 11, 2024.

My analysis is in this Jupyter notebook.

This is the third is a series of excerpts from Elements of Data Science which available from Lulu.com and online booksellers. It’s from Chapter 10, which is about multiple regression. You can read the complete chapter here, or run the Jupyter notebook on Colab.

In the previous chapter we used simple linear regression to quantify the relationship between two variables. In this chapter we’ll get farther into regression, including multiple regression and one of my all-time favorite tools, logistic regression. These tools will allow us to explore relationships among sets of variables. As an example, we will use data from the General Social Survey (GSS) to explore the relationship between education, sex, age, and income.

The GSS dataset contains hundreds of columns. We’ll work with an extract that contains just the columns we need, as we did in Chapter 8. Instructions for downloading the extract are in the notebook for this chapter.

We can read the DataFrame like this and display the first few rows.

import pandas as pd

gss = pd.read_hdf('gss_extract_2022.hdf', 'gss')
gss.head()

	year	id	age	educ	degree	sex	gunlaw	grass	realinc
0	1972	1	23.0	16.0	3.0	2.0	1.0	NaN	18951.0
1	1972	2	70.0	10.0	0.0	1.0	1.0	NaN	24366.0
2	1972	3	48.0	12.0	1.0	2.0	1.0	NaN	24366.0
3	1972	4	27.0	17.0	3.0	2.0	1.0	NaN	30458.0
4	1972	5	61.0	12.0	1.0	2.0	1.0	NaN	50763.0

We’ll start with a simple regression, estimating the parameters of real income as a function of years of education. First we’ll select the subset of the data where both variables are valid.

data = gss.dropna(subset=['realinc', 'educ'])
xs = data['educ']
ys = data['realinc']

Now we can use linregress to fit a line to the data.

from scipy.stats import linregress
res = linregress(xs, ys)
res._asdict()

{'slope': 3631.0761003894995,
 'intercept': -15007.453640508655,
 'rvalue': 0.37169252259280877,
 'pvalue': 0.0,
 'stderr': 35.625290800764,
 'intercept_stderr': 480.07467595184363}

The estimated slope is about 3450, which means that each additional year of education is associated with an additional $3450 of income.

Regression with StatsModels

SciPy doesn’t do multiple regression, so we’ll to switch to a new library, StatsModels. Here’s the import statement.

import statsmodels.formula.api as smf

To fit a regression model, we’ll use ols, which stands for “ordinary least squares”, another name for regression.

results = smf.ols('realinc ~ educ', data=data).fit()

The first argument is a formula string that specifies that we want to regress income as a function of education. The second argument is the DataFrame containing the subset of valid data. The names in the formula string correspond to columns in the DataFrame.

The result from ols is an object that represents the model – it provides a function called fit that does the actual computation.

The result is a RegressionResultsWrapper, which contains a Series called params, which contains the estimated intercept and the slope associated with educ.

results.params

Intercept   -15007.453641
educ          3631.076100
dtype: float64

The results from Statsmodels are the same as the results we got from SciPy, so that’s good!

Multiple Regression

In the previous section, we saw that income depends on education, and in the exercise we saw that it also depends on age. Now let’s put them together in a single model.

results = smf.ols('realinc ~ educ + age', data=gss).fit()
results.params

Intercept   -17999.726908
educ          3665.108238
age             55.071802
dtype: float64

In this model, realinc is the variable we are trying to explain or predict, which is called the dependent variable because it depends on the the other variables – or at least we expect it to. The other variables, educ and age, are called independent variables or sometimes “predictors”. The + sign indicates that we expect the contributions of the independent variables to be additive.

The result contains an intercept and two slopes, which estimate the average contribution of each predictor with the other predictor held constant.

• The estimated slope for educ is about 3665 – so if we compare two people with the same age, and one has an additional year of education, we expect their income to be higher by $3514.
• The estimated slope for age is about 55 – so if we compare two people with the same education, and one is a year older, we expect their income to be higher by $55.

In this model, the contribution of age is quite small, but as we’ll see in the next section that might be misleading.

Grouping by Age

Let’s look more closely at the relationship between income and age. We’ll use a Pandas method we have not seen before, called groupby, to divide the DataFrame into age groups.

grouped = gss.groupby('age')
type(grouped)

pandas.core.groupby.generic.DataFrameGroupBy

The result is a GroupBy object that contains one group for each value of age. The GroupBy object behaves like a DataFrame in many ways. You can use brackets to select a column, like realinc in this example, and then invoke a method like mean.

mean_income_by_age = grouped['realinc'].mean()

The result is a Pandas Series that contains the mean income for each age group, which we can plot like this.

import matplotlib.pyplot as plt

plt.plot(mean_income_by_age, 'o', alpha=0.5)
plt.xlabel('Age (years)')
plt.ylabel('Income (1986 $)')
plt.title('Average income, grouped by age');

Average income increases from age 20 to age 50, then starts to fall. And that explains why the estimated slope is so small, because the relationship is non-linear. To describe a non-linear relationship, we’ll create a new variable called age2 that equals age squared – so it is called a quadratic term.

gss['age2'] = gss['age']**2

Now we can run a regression with both age and age2 on the right side.

model = smf.ols('realinc ~ educ + age + age2', data=gss)
results = model.fit()
results.params

Intercept   -52599.674844
educ          3464.870685
age           1779.196367
age2           -17.445272
dtype: float64

In this model, the slope associated with age is substantial, about $1779 per year.

The slope associated with age2 is about -$17. It might be unexpected that it is negative – we’ll see why in the next section. But first, here are two exercises where you can practice using groupby and ols.

Visualizing regression results

In the previous section we ran a multiple regression model to characterize the relationships between income, age, and education. Because the model includes quadratic terms, the parameters are hard to interpret. For example, you might notice that the parameter for educ is negative, and that might be a surprise, because it suggests that higher education is associated with lower income. But the parameter for educ2 is positive, and that makes a big difference. In this section we’ll see a way to interpret the model visually and validate it against data.

Here’s the model from the previous exercise.

gss['educ2'] = gss['educ']**2

model = smf.ols('realinc ~ educ + educ2 + age + age2', data=gss)
results = model.fit()
results.params

Intercept   -26336.766346
educ          -706.074107
educ2          165.962552
age           1728.454811
age2           -17.207513
dtype: float64

The results object provides a method called predict that uses the estimated parameters to generate predictions. It takes a DataFrame as a parameter and returns a Series with a prediction for each row in the DataFrame. To use it, we’ll create a new DataFrame with age running from 18 to 89, and age2 set to age squared.

import numpy as np

df = pd.DataFrame()
df['age'] = np.linspace(18, 89)
df['age2'] = df['age']**2

Next, we’ll pick a level for educ, like 12 years, which is the most common value. When you assign a single value to a column in a DataFrame, Pandas makes a copy for each row.

df['educ'] = 12
df['educ2'] = df['educ']**2

Then we can use results to predict the average income for each age group, holding education constant.

pred12 = results.predict(df)

The result from predict is a Series with one prediction for each row. So we can plot it with age on the x-axis and the predicted income for each age group on the y-axis. And we’ll plot the data for comparison.

plt.plot(mean_income_by_age, 'o', alpha=0.5)
plt.plot(df['age'], pred12, label='High school', color='C4')

plt.xlabel('Age (years)')
plt.ylabel('Income (1986 $)')
plt.title('Income versus age, grouped by education level')
plt.legend();

The dots show the average income in each age group. The line shows the predictions generated by the model, holding education constant. This plot shows the shape of the model, a downward-facing parabola.

We can do the same thing with other levels of education, like 14 years, which is the nominal time to earn an Associate’s degree, and 16 years, which is the nominal time to earn a Bachelor’s degree.

df['educ'] = 16
df['educ2'] = df['educ']**2
pred16 = results.predict(df)

df['educ'] = 14
df['educ2'] = df['educ']**2
pred14 = results.predict(df)

plt.plot(mean_income_by_age, 'o', alpha=0.5)
plt.plot(df['age'], pred16, ':', label='Bachelor')
plt.plot(df['age'], pred14, '--', label='Associate')
plt.plot(df['age'], pred12, label='High school', color='C4')

plt.xlabel('Age (years)')
plt.ylabel('Income (1986 $)')
plt.title('Income versus age, grouped by education level')
plt.legend();

The lines show expected income as a function of age for three levels of education. This visualization helps validate the model, since we can compare the predictions with the data. And it helps us interpret the model since we can see the separate contributions of age and education.

Sometimes we can understand a model by looking at its parameters, but often it is better to look at its predictions. In the exercises, you’ll have a chance to run a multiple regression, generate predictions, and visualize the results.

Here’s a question from the Reddit statistics forum.

If I have a tumor that I’ve been told has a malignancy rate of 2% per year, does that compound? So after 5 years there’s a 10% chance it will turn malignant?

This turns out to be an interesting question, because the answer depends on what that 2% means. If we know that it’s the same for everyone, and it doesn’t vary over time, computing the compounded probability after 5 years is a relatively simple.

But if that 2% is an average across people with different probabilities, the computation is a little more complicated – and the answer turns out to be substantially different, so this is not a negligible effect.

To demonstrate both computations, I’ll assume that the probability for a given patient doesn’t change over time. This assumption is consistent with the multistage model of carcinogenesis, which posits that normal cells become cancerous through a series of mutations, where the probability of any of those mutations is constant over time.

Click here to run this notebook on Colab.

Constant Hazard

Let’s start with the simpler calculation, where the probability that a tumor progresses to malignancy is known to be 2% per year and constant. In that case, we can answer OP’s question by making a constant hazard function and using it to compute a survival function.

empiricaldist provides a Hazard object that represents a hazard function. Here’s one where the hazard is 2% per year for 20 years.

from empiricaldist import Hazard

p = 0.02
ts = np.arange(1, 21)
hazard = Hazard(p, ts, name='hazard1')

The probability that a tumor survives a given number of years without progressing is the cumulative product of the complements of the hazard, which we can compute like this.

p_surv = (1 - hazard).cumprod()

Hazard provides a make_surv method that does this computation and returns a Surv object that represents the corresponding survival function.

surv = hazard.make_surv(name='surv1')

Here’s what it looks like.

surv.plot()
decorate(xlabel='Year', ylabel='P(survival > t)')

The y-axis shows the probability that a tumor “survives” for more than a given number of years without progressing. The probability of survival past Year 1 is 98%, as you might expect.

surv.head()

	probs
1	0.980000
2	0.960400
3	0.941192

And the probability of going more than 10 years without progressing is about 82%.

surv(10)

array(0.81707281)

Because of the way the probabilities compound, the survival function drops off with decreasing slope, even though the hazard is constant.

Knowledge is Power

Now let’s add a little more realism to the model. Suppose that in the observed population the average rate of progression is 2% per year, but it varies from one person to another. As an example, suppose the actual rate is 1% for half the population and 3% for the other half. And for a given patient, suppose we don’t know initially which group they are in.

[UPDATE: If you read an earlier version of this article, there was an error in this section – I had the likelihood ratio wrong and it had a substantial effect on the results.]

As in the previous example, the probability that the tumor goes a year without progressing is 98%. However, at the end of that year, if it has not progressed, we have evidence in favor of the hypothesis that the patient is in the low-progression group. Specifically, the likelihood ratio is 99/97 in favor of that hypothesis.

Now we can apply Bayes’s rule in odds form. Since the prior odds were 1:1 and the likelihood ratio is 99/97, the posterior odds are 99:97 – so after one year we now believe the probability is 50.5% that the patient is in the low-progression group.

p_low = 99 / (99 + 97)
p_low

0.5051020408163265

In that case we can update the probability that the tumor progresses in the second year:

p1 = 0.01
p2 = 0.03

p_low * p1 + (1-p_low) * p2

0.019897959183673472

If the tumor survives a year without progressing, the probability it will progress in the second year is 1.99%, slightly less than the initial estimate of 2%. Note that this change is due to evidence that the patient is in the low progression group. It does not assume that anything has changed in the world – only that we have more information about which world we’re in.

If the tumor lasts another year without progressing, we would do the same update again. The following loop repeats this computation for 20 years.

odds = 1
ratio = 99/97
res = []

for year in hazard.index:
    p_low = odds / (odds + 1)
    haz = p_low * p1 + (1-p_low) * p2
    res.append((p_low, haz))
    odds *= ratio

Here are the results in percentages.

df = pd.DataFrame(res, columns=['p_low', 'hazard'], index=hazard.index)
(df * 100).round(2).head()

	p_low	hazard
1	50.00	2.00
2	50.51	1.99
3	51.02	1.98
4	51.53	1.97
5	52.04	1.96

If we put the hazard rates in a Hazard object, we can compare them to the constant hazard model.

hazard2 = Hazard(df['hazard'], name='hazard2')

hazard.plot(label='Known probability')
hazard2.plot(label='Uncertain probability')
decorate(xlabel='Year', ylabel='Hazard')

Each year, the probability increases that the patient is in the low-progression group, so the probability of progressing in the next year is a little lower.

Here’s what the corresponding survival function looks like.

surv2 = hazard2.make_surv(name='surv2')

surv.plot(label='Known probability')
surv2.plot(label='Uncertain probability')
decorate(xlabel='Year', ylabel='P(survival > t)')

The difference in survival is small, but it accumulates over time. For example, the probability of going more than 20 years without progression increases from 67% to 68%.

surv(20), surv2(20)

(array(0.66760797), array(0.68085064))

In this example, there are only two groups with different probabilities of progression. But we would see the same effect in a more realistic model with a range of probabilities. As time passes without progression, it becomes more likely that the patient is in a low-progression group, so their hazard during the next period is lower. The more variability there is in the probability of progression, the stronger this effect.

Discussion

This example demonstrates a subtle point about a distribution of probabilities. To explain it, let’s consider a more abstract scenario. Suppose you have two coin-flipping devices:

• One of them is known to flips head and tails with equal probability.
• The other is known to be miscalibrated so it flips heads with either 60% probability or 40% probability – and we don’t know which, but they are equally likely.

If we use the first device, the probability of heads is 50%. If we use the second device, the probability of heads is 50%. So it might seem like there is no difference between them – and more generally, it might seem like we can always collapse a distribution of probabilities down to a single probability.

But that’s not true, as we can demonstrate by running the coin-flippers twice. For the first, the probability of two heads is 25%. For the second, it’s either 36% or 16% with equal probability – so the total probability is 26%.

p1, p2 = 0.6, 0.4
np.mean([p1**2, p2**2])

0.26

In general, there’s a difference between a scenario where a probability is known precisely and a scenario where there is uncertainty about the probability.

Our World in Data recently announced that they are providing APIs to access their data. Coincidentally, I am using one of their datasets in my workshop on time series analysis at PyData Global 2024. So I took this opportunity to update my example using the new API – this notebook shows what I learned.

Click here to run this notebook on Colab. It is based on Chapter 12 of Think Stats, third edition.

import numpy as np
import pandas as pd
import matplotlib.pyplot as plt

Air Temperature

In the chapter on time series analysis, in an exercise on seasonal decomposition, I use monthly average surface temperatures in the United States, from a dataset from Our World in Data that includes “temperature [in Celsius] of the air measured 2 meters above the ground, encompassing land, sea, and in-land water surfaces,” for most countries in the world from 1941 to 2024.

The following cells download and display the metadata that describes the dataset.

import requests

url = (
    "https://ourworldindata.org/grapher/"
    "average-monthly-surface-temperature.metadata.json"
)
query_params = {
    "v": "1",
    "csvType": "full",
    "useColumnShortNames": "true"
}
headers = {'User-Agent': 'Our World In Data data fetch/1.0'}

response = requests.get(url, params=query_params, headers=headers)
metadata = response.json()

The result is a nested dictionary. Here are the top-level keys.

metadata.keys()

dict_keys(['chart', 'columns', 'dateDownloaded'])

Here’s the chart-level documentation.

from pprint import pprint

pprint(metadata['chart'])

{'citation': 'Contains modified Copernicus Climate Change Service information '
             '(2019)',
 'originalChartUrl': 'https://ourworldindata.org/grapher/average-monthly-surface-temperature?v=1&csvType=full&useColumnShortNames=true',
 'selection': ['World'],
 'subtitle': 'The temperature of the air measured 2 meters above the ground, '
             'encompassing land, sea, and in-land water surfaces.',
 'title': 'Average monthly surface temperature'}

And here’s the documentation of the column we’ll use.

pprint(metadata['columns']['temperature_2m'])

{'citationLong': 'Contains modified Copernicus Climate Change Service '
                 'information (2019) – with major processing by Our World in '
                 'Data. “Annual average” [dataset]. Contains modified '
                 'Copernicus Climate Change Service information, “ERA5 monthly '
                 'averaged data on single levels from 1940 to present 2” '
                 '[original data].',
 'citationShort': 'Contains modified Copernicus Climate Change Service '
                  'information (2019) – with major processing by Our World in '
                  'Data',
 'descriptionKey': [],
 'descriptionProcessing': '- Temperature measured in kelvin was converted to '
                          'degrees Celsius (°C) by subtracting 273.15.\n'
                          '\n'
                          '- Initially, the temperature dataset is provided '
                          'with specific coordinates in terms of longitude and '
                          'latitude. To tailor this data to each country, we '
                          'utilize geographical boundaries as defined by the '
                          'World Bank. The method involves trimming the global '
                          'temperature dataset to match the exact geographical '
                          'shape of each country. To correct for potential '
                          "distortions caused by the Earth's curvature on a "
                          'flat map, we apply a latitude-based weighting. This '
                          'step is essential for maintaining accuracy, '
                          'especially in high-latitude regions where '
                          'distortion is more pronounced. The result of this '
                          'process is a latitude-weighted average temperature '
                          'for each nation.\n'
                          '\n'
                          "- It's important to note, however, that due to the "
                          'resolution constraints of the Copernicus dataset, '
                          'this methodology might not be as effective for '
                          'countries with very small landmasses. In these '
                          'cases, the process may not yield reliable data.\n'
                          '\n'
                          '- The derived 2-meter temperature readings for each '
                          'country are calculated based on administrative '
                          'borders, encompassing all land surface types within '
                          'these defined areas. As a result, temperatures over '
                          'oceans and seas are not included in these averages, '
                          'focusing the data primarily on terrestrial '
                          'environments.\n'
                          '\n'
                          '- Global temperature averages and anomalies are '
                          'calculated over all land and ocean surfaces.',
 'descriptionShort': 'The temperature of the air measured 2 meters above the '
                     'ground, encompassing land, sea, and in-land water '
                     'surfaces. The 2024 data is incomplete and was last '
                     'updated 13 October 2024.',
 'fullMetadata': 'https://api.ourworldindata.org/v1/indicators/819532.metadata.json',
 'lastUpdated': '2023-12-20',
 'owidVariableId': 819532,
 'shortName': 'temperature_2m',
 'shortUnit': '°C',
 'timespan': '1940-2024',
 'titleLong': 'Annual average',
 'titleShort': 'Annual average',
 'type': 'Numeric',
 'unit': '°C'}

The following cells download the data for the United States – to see data from another country, change country_code to almost any three-letter ISO 3166 country codes.

country_code = 'USA'    # replace this with other three-letter country codes
base_url = (
    "https://ourworldindata.org/grapher/" 
    "average-monthly-surface-temperature.csv"
)

query_params = {
    "v": "1",
    "csvType": "filtered",
    "useColumnShortNames": "true",
    "tab": "chart",
    "country": country_code  
}

from urllib.parse import urlencode

url = f"{base_url}?{urlencode(query_params)}"
temp_df = pd.read_csv(url, storage_options=headers)

In general, you can find out which query parameters are supported by exploring the dataset online and pressing the download icon, which displays a URL with query parameters corresponding to the filters you selected by interacting with the chart.

temp_df.head()

	Entity	Code	year	Day	temperature_2m	temperature_2m.1
0	United States	USA	1941	1941-12-15	-1.878019	8.016244
1	United States	USA	1942	1942-01-15	-4.776551	7.848984
2	United States	USA	1942	1942-02-15	-3.870868	7.848984
3	United States	USA	1942	1942-03-15	0.097811	7.848984
4	United States	USA	1942	1942-04-15	7.537291	7.848984

The resulting DataFrame includes the column that’s documented in the metadata, temperature_2m, and an additional undocumented column, which might be an annual average.

For this example, we’ll use the monthly data.

temp_series = temp_df['temperature_2m']
temp_series.index = pd.to_datetime(temp_df['Day'])

Here’s what it looks like.

temp_series.plot(label=country_code)
plt.ylabel("Surface temperature (℃)");

Not surprisingly, there is a strong seasonal pattern. We can use seasonal_decompose from StatsModels to identify a long-term trend, a seasonal component, and a residual.

from statsmodels.tsa.seasonal import seasonal_decompose

decomposition = seasonal_decompose(temp_series, model="additive", period=12)

We’ll use the following function to plot the results.

def plot_decomposition(original, decomposition):
    plt.figure(figsize=(6, 5))

    plt.subplot(4, 1, 1)
    plt.plot(original, label="Original", color="C0")
    plt.ylabel("Original")

    plt.subplot(4, 1, 2)
    plt.plot(decomposition.trend, label="Trend", color="C1")
    plt.ylabel("Trend")

    plt.subplot(4, 1, 3)
    plt.plot(decomposition.seasonal, label="Seasonal", color="C2")
    plt.ylabel("Seasonal")

    plt.subplot(4, 1, 4)
    plt.plot(decomposition.resid, label="Residual", color="C3")
    plt.ylabel("Residual")

    plt.tight_layout()

plot_decomposition(temp_series, decomposition)

As always, I’m grateful to Our World in Data for making datasets like this available, and now easier to use programmatically.

Recently I heard the word “chartist” for the first time in my life (that I recall). And then later the same day, I heard it again. So that raises two questions:

• What are the chances of going 57 years without hearing a word, and then hearing it twice in one day?
• Also, what’s a chartist?

To answer the second question first, it’s someone who supported chartism, which was “a working-class movement for political reform in the United Kingdom that erupted from 1838 to 1857”, quoth Wikipedia. The name comes from the People’s Charter of 1838, which called for voting rights for unpropertied men, among other reforms.

To answer the first question, we’ll do some Bayesian statistics. My solution is based on a model that’s not very realistic, so we should not take the result too seriously, but it demonstrates some interesting methods, I think. And as you’ll see, there is a connection to Zipf’s law, which I wrote about last week.

Since last week’s post was at the beginner level, I should warn you that this one is more advanced – in rapid succession, it involves the beta distribution, the t distribution, the negative binomial, and the binomial.

This post is based on Think Bayes 2e, which is available from Bookshop.org and Amazon.

Click here to run this notebook on Colab.

Word Frequencies

If you don’t hear a word for more than 50 years, that suggests it is not a common word. We can use Bayes’s theorem to quantify this intuition. First we’ll compute the posterior distribution of the word’s frequency, then the posterior predictive distribution of hearing it again within a day.

Because we have only one piece of data – the time until first appearance – we’ll need a good prior distribution. Which means we’ll need a large, good quality sample of English text. For that, I’ll use a free sample of the COCA dataset from CorpusData.org. The following cells download and read the data.

download("https://www.corpusdata.org/coca/samples/coca-samples-text.zip")

import zipfile


def generate_lines(zip_path="coca-samples-text.zip"):
    with zipfile.ZipFile(zip_path, "r") as zip_file:
        file_list = zip_file.namelist()
        for file_name in file_list:
            with zip_file.open(file_name) as file:
                lines = file.readlines()
                for line in lines:
                    yield (line.decode("utf-8"))

We’ll use a Counter to count the number of times each word appears.

import re
from collections import Counter

pattern = r"[ /\n]+|--"

counter = Counter()
for line in generate_lines():
    words = re.split(pattern, line)[1:]
    counter.update(word.lower() for word in words if word)

The dataset includes about 188,000 unique strings, but not all of them are what we would consider words.

len(counter), counter.total()

(188086, 11503819)

To narrow it down, I’ll remove anything that starts or ends with a non-alphabetical character – so hyphens and apostrophes are allowed in the middle of a word.

for s in list(counter.keys()):
    if not s[0].isalpha() or not s[-1].isalpha():
        del counter[s]

This filter reduces the number of unique words to about 151,000.

num_words = counter.total()
len(counter), num_words

(151414, 8889694)

Of the 50 most common words, all of them have one syllable except number 38. Before you look at the list, can you guess the most common two-syllable word? Here’s a theory about why common words are short.

for i, (word, freq) in enumerate(counter.most_common(50)):
    print(f'{i+1}\t{word}\t{freq}')

1	the	461991
2	to	237929
3	and	231459
4	of	217363
5	a	203302
6	in	153323
7	i	137931
8	that	123818
9	you	109635
10	it	103712
11	is	93996
12	for	78755
13	on	64869
14	was	64388
15	with	59724
16	he	57684
17	this	51879
18	as	51202
19	n't	49291
20	we	47694
21	are	47192
22	have	46963
23	be	46563
24	not	43872
25	but	42434
26	they	42411
27	at	42017
28	do	41568
29	what	35637
30	from	34557
31	his	33578
32	by	32583
33	or	32146
34	she	29945
35	all	29391
36	my	29390
37	an	28580
38	about	27804
39	there	27291
40	so	27081
41	her	26363
42	one	26022
43	had	25656
44	if	25373
45	your	24641
46	me	24551
47	who	23500
48	can	23311
49	their	23221
50	out	22902

There are about 72,000 words that only appear once in the corpus, technically known as hapax legomena.

singletons = [word for (word, freq) in counter.items() if freq == 1]
len(singletons), len(singletons) / counter.total() * 100

(72159, 0.811715228893143)

Here’s a random selection of them. Many are proper names, typos, or other non-words, but some are legitimate but rare words.

np.random.choice(singletons, 100)

array(['laneer', 'emc', 'literature-like', 'tomyworld', 'roald',
       'unreleased', 'basemen', 'kielhau', 'clobber', 'feydeau',
       'symptomless', 'channelmaster', 'v-i', 'tipsha', 'mjlkdroppen',
       'harlots', 'phaetons', 'grlinger', 'naniwa', 'dadian',
       'banafionen', 'ceramaseal', 'vine-covered', 'terrafirmahome.com',
       'hesten', 'undertheorized', 'fantastycznie', 'kaido', 'noughts',
       'hannelie', 'cacoa', 'subelement', 'mestothelioma', 'gut-level',
       'abis', 'potterville', 'quarter-to-quarter', 'lokkii', 'telemed',
       'whitewood', 'dualmode', 'plebiscites', 'loubrutton',
       'off-loading', 'abbot-t-t', 'whackaloons', 'tuinal', 'guyi',
       'samanthalaughs', 'editor-sponsored', 'neurosciences', 'lunched',
       'chicken-and-brisket', 'korekane', 'ruby-colored',
       'double-elimination', 'cornhusker', 'wjounds', 'mendy', 'red.ooh',
       'delighters', 'tuviera', 'spot-lit', 'tuskarr', 'easy-many',
       'timepoint', 'mouthfuls', 'catchy-titled', 'b.l', 'four-ply',
       "sa'ud", 'millenarianism', 'gelder', 'cinnam',
       'documentary-filmmaking', 'huviesen', 'by-gone', 'boy-friend',
       'heartlight', 'farecompare.com', 'nurya', 'overstaying',
       'johnny-turn', 'rashness', 'mestier', 'trivedi', 'koshanska',
       'tremulousness', 'movies-another', 'womenfolks', 'bawdy',
       'all-her-life', 'lakhani', 'screeeeaming', 'marketings', 'girthy',
       'non-discriminatory', 'chumpy', 'resque', 'lysing'], dtype='<U24')

Now let’s see what the distribution of word frequencies looks like.

Zipf’s Law

One way to visualize the distribution is a Zipf plot, which shows the ranks on the x-axis and the frequencies on the y-axis.

freqs = np.array(sorted(counter.values(), reverse=True))

n = len(freqs)
ranks = range(1, n + 1)

Here’s what it looks like on a log-log scale.

plt.plot(ranks, freqs)

decorate(
    title="Zipf plot", xlabel="Rank", ylabel="Frequency", xscale="log", yscale="log"
)

Zipf’s law suggest that the result should be a straight line with slope close to -1. It’s not exactly a straight line, but it’s close, and the slope is about -1.1.

rise = np.log10(freqs[-1]) - np.log10(freqs[0])
rise

-5.664633515191604

run = np.log10(ranks[-1]) - np.log10(ranks[0])
run

5.180166032638616

rise / run

-1.0935235433575892

The Zipf plot is a well-known visual representation of the distribution of frequencies, but for the current problem, we’ll switch to a different representation.

Tail Distribution

Given the number of times each word appear in the corpus, we can compute the rates, which is the number of times we expect each word to appear in a sample of a given size, and the inverse rates, which are the number of words we need to see before we expect a given word to appear.

We will find it most convenient to work with the distribution of inverse rates on a log scale. The first step is to use the observed frequencies to estimate word rates – we’ll estimate the rate at which each word would appear in a random sample.

We’ll do that by creating a beta distribution that represents the posterior distribution of word rates, given the observed frequencies (see this section of Think Bayes) – and then drawing a random sample from the posterior. So words that have the same frequency will not generally have the same inferred rate.

from scipy.stats import beta

np.random.seed(17)
alphas = freqs + 1
betas = num_words - freqs + 1
inferred_rates = beta(alphas, betas).rvs()

Now we can compute the inverse rates, which are the number of words we have to sample before we expect to see each word once.

inverse_rates = 1 / inferred_rates

And here are their magnitudes, expressed as logarithms base 10.

mags = np.log10(inverse_rates)

To represent the distribution of these magnitudes, we’ll use a Surv object, which represents survival functions, but we’ll use a variation of the survival function which is the probability that a randomly-chosen value is greater than or equal to a given quantity. The following function computes this version of a survival function, which is called a tail probability.

from empiricaldist import Surv


def make_surv(seq):
    """Make a non-standard survival function, P(X>=x)"""
    pmf = Pmf.from_seq(seq)
    surv = pmf.make_surv() + pmf

    # correct for numerical error
    surv.iloc[0] = 1
    return Surv(surv)

Here’s how we make the survival function.

surv = make_surv(mags)

And here’s what it looks like.

options = dict(marker=".", ms=2, lw=0.5, label="data")
surv.plot(**options)
decorate(xlabel="Inverse rate (log10 words per appearance)", ylabel="Tail probability")

The tail distribution has the sigmoid shape that is characteristic of normal distributions and t distributions, although it is notably asymmetric.

And here’s what the tail probabilities look like on a log-y scale.

surv.plot(**options)
decorate(xlabel="Inverse rate (words per appearance)", yscale="log")

If this distribution were normal, we would expect this curve to drop off with increasing slope. But for the words with the lowest frequencies – that is, the highest inverse rates – it is almost a straight line. And that suggests that a

distribution might be a good model for this data.

Fitting a Model

To estimate the frequency of rare words, we will need to model the tail behavior of this distribution and extrapolate it beyond the data. So let’s fit a t distribution and see how it looks. I’ll use code from Chapter 8 of Probably Overthinking It, which is all about these long-tailed distributions.

The following function makes a Surv object that represents a t distribution with the given parameters.

from scipy.stats import t as t_dist


def truncated_t_sf(qs, df, mu, sigma):
    """Makes Surv object for a t distribution.
    
    Truncated on the left, assuming all values are greater than min(qs)
    """
    ps = t_dist.sf(qs, df, mu, sigma)
    surv_model = Surv(ps / ps[0], qs)
    return surv_model

If we are given the df parameter, we can use the following function to find the values of mu and sigma that best fit the data, focusing on the central part of the distribution.

from scipy.optimize import least_squares


def fit_truncated_t(df, surv):
    """Given df, find the best values of mu and sigma."""
    low, high = surv.qs.min(), surv.qs.max()
    qs_model = np.linspace(low, high, 2000)
    ps = np.linspace(0.1, 0.8, 20)
    qs = surv.inverse(ps)

    def error_func_t(params, df, surv):
        mu, sigma = params
        surv_model = truncated_t_sf(qs_model, df, mu, sigma)

        error = surv(qs) - surv_model(qs)
        return error

    pmf = surv.make_pmf()
    pmf.normalize()
    params = pmf.mean(), pmf.std()
    res = least_squares(error_func_t, x0=params, args=(df, surv), xtol=1e-3)
    assert res.success
    return res.x

But since we are not given df, we can use the following function to search for the value that best fits the tail of the distribution.

from scipy.optimize import minimize


def minimize_df(df0, surv, bounds=[(1, 1e3)], ps=None):
    low, high = surv.qs.min(), surv.qs.max()
    qs_model = np.linspace(low, high * 1.2, 2000)

    if ps is None:
        t = surv.ps[0], surv.ps[-5]
        low, high = np.log10(t)
        ps = np.logspace(low, high, 30, endpoint=False)

    qs = surv.inverse(ps)

    def error_func_tail(params):
        (df,) = params
        # print(df)
        mu, sigma = fit_truncated_t(df, surv)
        surv_model = truncated_t_sf(qs_model, df, mu, sigma)

        errors = np.log10(surv(qs)) - np.log10(surv_model(qs))
        return np.sum(errors**2)

    params = (df0,)
    res = minimize(error_func_tail, x0=params, bounds=bounds, method="Powell")
    assert res.success
    return res.x

df = minimize_df(25, surv)
df

array([22.52401171])

mu, sigma = fit_truncated_t(df, surv)
df, mu, sigma

(array([22.52401171]), 6.433323515095857, 0.49070837962997577)

Here’s the t distribution that best fits the data.

low, high = surv.qs.min(), surv.qs.max()
qs = np.linspace(low, 10, 2000)
surv_model = truncated_t_sf(qs, df, mu, sigma)

surv_model.plot(color="gray", alpha=0.4, label="model")
surv.plot(**options)
decorate(xlabel="Inverse rate (log10 words per appearance)", ylabel="Tail probability")

With the y-axis on a linear scale, we can see that the model fits the data reasonably well, except for a range between 5 and 6 – that is for words that appear about 1 time in a million.

Here’s what the model looks like on a log-y scale.

surv_model.plot(color="gray", alpha=0.4, label="model")
surv.plot(**options)
decorate(
    xlabel="Inverse rate (log10 words per appearance)",
    ylabel="Tail probability",
    yscale="log",
)

The model fits the data well in the extreme tail, which is exactly where we need it. And we can use the model to extrapolate a little beyond the data, to make sure we cover the range that will turn out to be likely in the scenario where we hear a word for this first time after 50 years.

The Update

The model we’ve developed is the distribution of inverse rates for the words that appear in the corpus and, by extrapolation, for additional rare words that didn’t appear in the corpus. This distribution will be the prior for the Bayesian update. We just have to convert it from a survival function to a PMF (remembering that these are equivalent representations of the same distribution).

prior = surv_model.make_pmf()
prior.plot(label="prior")
decorate(
    xlabel="Inverse rate (log10 words per appearance)",
    ylabel="Density",
)

To compute the likelihood of the observation, we have to transform the inverse rates to probabilities.

ps = 1 / np.power(10, prior.qs)

Now suppose that in a given day, you read or hear 10,000 words in a context where you would notice if you heard a word for the first time. Here’s the number of words you would hear in 50 years.

words_per_day = 10_000
days = 50 * 365
k = days * words_per_day
k

182500000

Now, what’s the probability that you fail to encounter a word in k attempts and then encounter it on the next attempt? We can answer that with the negative binomial distribution, which computes the probability of getting the nth success after k failures, for a given probability – or in this case, for a sequence of possible probabilities.

from scipy.stats import nbinom

n = 1
likelihood = nbinom.pmf(k, n, ps)

With this likelihood and the prior, we can compute the posterior distribution in the usual way.

posterior = prior * likelihood
posterior.normalize()

1.368245917258196e-11

And here’s what it looks like.

prior.plot(alpha=0.5, label="prior")
posterior.plot(label="posterior")
decorate(
    xlabel="Inverse rate (log10 words per appearance)",
    ylabel="Density",
)

If you go 50 years without hearing a word, that suggests that it is a rare word, and the posterior distribution reflects that logic.

The posterior distribution represents a range of possible values for the inverse rate of the word you heard. Now we can use it to answer the question we started with: what is the probability of hearing the same word again on the same day – that is, within the next 10,000 words you hear?

To answer that, we can use the survival function of the binomial distribution to compute the probability of more than 0 successes in the next n_pred attempts. We’ll compute this probability for each of the ps that correspond to the inverse rates in the posterior.

from scipy.stats import binom

n_pred = words_per_day
ps_pred = binom.sf(0, n_pred, ps)

And we can use the probabilities in the posterior to compute the expected value – by the law of total probability, the result is the probability of hearing the same word again within a day.

p = np.sum(posterior * ps_pred)
p, 1 / p

(0.00016019406802217392, 6242.42840166579)

The result is about 1 in 6000.

With all of the assumptions we made in this calculation, there’s no reason to be more precise than that. And as I mentioned at the beginning, we should probably not take this conclusion too seriously. For one thing, it’s likely that my experience is an example of the frequency illusion, which is “a cognitive bias in which a person notices a specific concept, word, or product more frequently after recently becoming aware of it.” Also, if you hear a word for the first time after 50 years, there’s a good chance the word is having a moment, which greatly increases the chance you’ll hear it again. I can’t think of why chartism might be in the news at the moment, but maybe this post will go viral and make it happen.

This is the second is a series of excerpts from Elements of Data Science which available from Lulu.com and online booksellers. It’s from Chapter 8, which is about representing distribution using PMFs and CDFs. This section explains why I think CDFs are often better for plotting and comparing distributions.You can read the complete chapter here, or run the Jupyter notebook on Colab.

So far we’ve seen two ways to represent distributions, PMFs and CDFs. Now we’ll use PMFs and CDFs to compare distributions, and we’ll see the pros and cons of each. One way to compare distributions is to plot multiple PMFs on the same axes. For example, suppose we want to compare the distribution of age for male and female respondents. First we’ll create a Boolean Series that’s true for male respondents and another that’s true for female respondents.

male = (gss['sex'] == 1)
female = (gss['sex'] == 2)

We can use these Series to select ages for male and female respondents.

male_age = age[male]
female_age = age[female]

And plot a PMF for each.

pmf_male_age = Pmf.from_seq(male_age)
pmf_male_age.plot(label='Male')

pmf_female_age = Pmf.from_seq(female_age)
pmf_female_age.plot(label='Female')

plt.xlabel('Age (years)') 
plt.ylabel('PMF')
plt.title('Distribution of age by sex')
plt.legend();

A plot as variable as this is often described as noisy. If we ignore the noise, it looks like the PMF is higher for men between ages 40 and 50, and higher for women between ages 70 and 80. But both of those differences might be due to randomness.

Now let’s do the same thing with CDFs – everything is the same except we replace Pmf with Cdf.

cdf_male_age = Cdf.from_seq(male_age)
cdf_male_age.plot(label='Male')

cdf_female_age = Cdf.from_seq(female_age)
cdf_female_age.plot(label='Female')

plt.xlabel('Age (years)') 
plt.ylabel('CDF')
plt.title('Distribution of age by sex')
plt.legend();

Because CDFs smooth out randomness, they provide a better view of real differences between distributions. In this case, the lines are close together until age 40 – after that, the CDF is higher for men than women.

So what does that mean? One way to interpret the difference is that the fraction of men below a given age is generally more than the fraction of women below the same age. For example, about 77% of men are 60 or less, compared to 75% of women.

cdf_male_age(60), cdf_female_age(60)

(array(0.7721998), array(0.7474241))

Going the other way, we could also compare percentiles. For example, the median age woman is older than the median age man, by about one year.

cdf_male_age.inverse(0.5), cdf_female_age.inverse(0.5)

(array(44.), array(45.))

Comparing Incomes

As another example, let’s look at household income and compare the distribution before and after 1995 (I chose 1995 because it’s roughly the midpoint of the survey). We’ll make two Boolean Series objects to select respondents interviewed before and after 1995.

pre95 = (gss['year'] < 1995)
post95 = (gss['year'] >= 1995)

Now we can plot the PMFs of realinc, which records household income converted to 1986 dollars.

realinc = gss['realinc']

Pmf.from_seq(realinc[pre95]).plot(label='Before 1995')
Pmf.from_seq(realinc[post95]).plot(label='After 1995')

plt.xlabel('Income (1986 USD)')
plt.ylabel('PMF')
plt.title('Distribution of income')
plt.legend();

There are a lot of unique values in this distribution, and none of them appear very often. As a result, the PMF is so noisy and we can’t really see the shape of the distribution. It’s also hard to compare the distributions. It looks like there are more people with high incomes after 1995, but it’s hard to tell. We can get a clearer picture with a CDF.

Cdf.from_seq(realinc[pre95]).plot(label='Before 1995')
Cdf.from_seq(realinc[post95]).plot(label='After 1995')

plt.xlabel('Income (1986 USD)')
plt.ylabel('CDF')
plt.title('Distribution of income')
plt.legend();

Below $30,000 the CDFs are almost identical; above that, we can see that the post-1995 distribution is shifted to the right. In other words, the fraction of people with high incomes is about the same, but the income of high earners has increased.

In general, I recommend CDFs for exploratory analysis. They give you a clear view of the distribution, without too much noise, and they are good for comparing distributions.

Elements of Data Science is in print now, available from Lulu.com and online booksellers. To celebrate, I’ll post some excerpts here, starting with one of my favorite examples, Zipf’s Law. It’s from Chapter 6, which is about plotting data, and it uses Python dictionaries, which are covered in the previous chapter. You can read the complete chapter here, or run the Jupyter notebook on Colab.

In almost any book, in almost any language, if you count the number of unique words and the number of times each word appears, you will find a remarkable pattern: the most common word appears twice as often as the second most common – at least approximately – three times as often as the third most common, and so on.

In general, if we sort the words in descending order of frequency, there is an inverse relationship between the rank of the words – first, second, third, etc. – and the number of times they appear. This observation was most famously made by George Kingsley Zipf, so it is called Zipf’s law.

To see if this law holds for the words in War and Peace, we’ll make a Zipf plot, which shows:

• The frequency of each word on the y-axis, and
• The rank of each word on the x-axis, starting from 1.

In the previous chapter, we looped through the book and made a string that contains all punctuation characters. Here are the results, which we will need again.

all_punctuation = ',.-:[#]*/“’—‘!?”;()%@'

The following program reads through the book and makes a dictionary that maps from each word to the number of times it appears.

fp = open('2600-0.txt')
for line in fp:
    if line.startswith('***'):
        break

unique_words = {}
for line in fp:
    if line.startswith('***'):
        break
        
    for word in line.split():
        word = word.lower()
        word = word.strip(all_punctuation)
        if word in unique_words:
            unique_words[word] += 1
        else:
            unique_words[word] = 1

In unique_words, the keys are words and the values are their frequencies. We can use the values function to get the values from the dictionary. The result has the type dict_values:

freqs = unique_words.values()
type(freqs)

dict_values

Before we plot them, we have to sort them, but the sort function doesn’t work with dict_values.

%%expect AttributeError

freqs.sort()

AttributeError: 'dict_values' object has no attribute 'sort'

We can use list to make a list of frequencies:

freq_list = list(unique_words.values())
type(freq_list)

list

And now we can use sort. By default it sorts in ascending order, but we can pass a keyword argument to reverse the order.

freq_list.sort(reverse=True)

Now, for the ranks, we need a sequence that counts from 1 to n, where n is the number of elements in freq_list. We can use the range function, which returns a value with type range. As a small example, here’s the range from 1 to 5.

range(1, 5)

range(1, 5)

However, there’s a catch. If we use the range to make a list, we see that “the range from 1 to 5” includes 1, but it doesn’t include 5.

list(range(1, 5))

[1, 2, 3, 4]

That might seem strange, but it is often more convenient to use range when it is defined this way, rather than what might seem like the more natural way. Anyway, we can get what we want by increasing the second argument by one:

list(range(1, 6))

[1, 2, 3, 4, 5]

So, finally, we can make a range that represents the ranks from 1 to n:

n = len(freq_list)
ranks = range(1, n+1)
ranks

range(1, 20484)

And now we can plot the frequencies versus the ranks:

plt.plot(ranks, freq_list)

plt.xlabel('Rank')
plt.ylabel('Frequency')
plt.title("War and Peace and Zipf's law");

According to Zipf’s law, these frequencies should be inversely proportional to the ranks. If that’s true, we can write:

f = k / r

where r is the rank of a word, f is its frequency, and k is an unknown constant of proportionality. If we take the logarithm of both sides, we get

log f = log k – log r

This equation implies that if we plot f versus r on a log-log scale, we expect to see a straight line with intercept at log k and slope -1.

6.6. Logarithmic Scales

We can use plt.xscale to plot the x-axis on a log scale.

plt.plot(ranks, freq_list)

plt.xlabel('Rank')
plt.ylabel('Frequency')
plt.title("War and Peace and Zipf's law")
plt.xscale('log')

And plt.yscale to plot the y-axis on a log scale.

plt.plot(ranks, freq_list)

plt.xlabel('Rank')
plt.ylabel('Frequency')
plt.title("War and Peace and Zipf's law")
plt.xscale('log')
plt.yscale('log')

The result is not quite a straight line, but it is close. We can get a sense of the slope by connecting the end points with a line. First, we’ll select the first and last elements from xs.

xs = ranks[0], ranks[-1]
xs

(1, 20483)

And the first and last elements from ys.

ys = freq_list[0], freq_list[-1]
ys

(34389, 1)

And plot a line between them.

plt.plot(xs, ys, color='gray')
plt.plot(ranks, freq_list)

plt.xlabel('Rank')
plt.ylabel('Frequency')
plt.title("War and Peace and Zipf's law")
plt.xscale('log')
plt.yscale('log')

The slope of this line is the “rise over run”, that is, the difference on the y-axis divided by the difference on the x-axis. We can compute the rise using np.log10 to compute the log base 10 of the first and last values:

np.log10(ys)

array([4.53641955, 0.        ])

Then we can use np.diff to compute the difference between the elements:

rise = np.diff(np.log10(ys))
rise

array([-4.53641955])

Exercise: Use log10 and diff to compute the run, that is, the difference on the x-axis. Then divide the rise by the run to get the slope of the grey line. Is it close to -1, as Zipf’s law predicts? Hint: yes.

I am excited to announce that I have started work on a third edition of Think Stats, to be published by O’Reilly Media in 2025. At this point the content is mostly settled, and I am revising chapters to get them ready for technical review.

If you want to start reading now, the current draft is here.

What’s new?

For the third edition, I started by moving the book into Jupyter notebooks. This change has one immediate benefit – you can read the text, run the code, and work on the exercises all in one place. And the notebooks are designed to work on Google Colab, so you can get started without installing anything.

The move to notebooks has another benefit – the code is more visible. In the first two editions, some of the code was in the book and some was in supporting files available online. In retrospect, it’s clear that splitting the material in this way was not ideal, and it made the code more complicated than it needed to be. In the third edition, I was able to simplify the code and make it more readable.

Since the last edition was published, I’ve developed a library called empiricaldist that provides objects that represent statistical distributions. This library is more mature now, so the updated code makes better use of it.

When I started this project, NumPy and SciPy were not as widely used, and Pandas even less, so the original code used Python data structures like lists and dictionaries. This edition uses arrays and Pandas structures extensively, and makes more use of functions these libraries provide. I assume readers have some familiarity with these tools, but I explain each feature when it first appears.

The third edition covers the same topics as the original, in almost the same order, but the text is substantially revised. Some of the examples are new; others are updated with new data. I’ve developed new exercises, revised some of the old ones, and removed a few. I think the updated exercises are better connected to the examples, and more interesting.

Since the first edition, this book has been based on the thesis that many ideas that are hard to explain with math are easier to explain with code. In this edition, I have doubled down on this idea, to the point where there is almost no mathematical notation, only code.

Overall, I think these changes make Think Stats a better book. To give you a taste, here’s an excerpt from Chapter 12: Time Series Analysis.

Multiplicative Model

The additive model we used in the previous section is based on the assumption that the time series is well modeled as the sum of a long-term trend, a seasonal component, and a residual component – which implies that the magnitude of the seasonal component and the residuals does not vary over time.

As an example that violates this assumption, let’s look at small-scale solar electricity production since 2014.

solar = elec["United States : small-scale solar photovoltaic"].dropna()
solar.plot(label="solar")
decorate(ylabel="GWh")

Over this interval, total production has increased several times over. And it’s clear that the magnitude of seasonal variation has increased as well.

If suppose that the magnitudes of seasonal and random variation are proportional to the magnitude of the trend, that suggests an alternative to the additive model in which the time series is the product of a trend, a seasonal component, and a residual component.

To try out this multiplicative model, we’ll split this series into training and test sets.

training, test = split_series(solar)

And call seasonal_decompose with the model=multiplicative argument.

decomposition = seasonal_decompose(training, model="multiplicative", period=12)

Here’s what the results look like.

plot_decomposition(training, decomposition)

Now the seasonal and residual components are multiplicative factors. So, it looks like the seasonal component varies from about 25% below the trend to 25% above. And the residual component is usually less than 5% either way, with the exception of some larger factors in the first period.

trend = decomposition.trend
seasonal = decomposition.seasonal
resid = decomposition.resid

The R² value of this model is very high.

rsquared = 1 - resid.var() / training.var()
rsquared

0.9999999992978134

The production of a solar panel is almost entirely a function of the sunlight it’s exposed to, so it makes sense that it follows an annual cycle so closely.

To predict the long term trend, we’ll use a quadratic model.

months = range(len(training))
data = pd.DataFrame({"trend": trend, "months": months}).dropna()
results = smf.ols("trend ~ months + I(months**2)", data=data).fit()

In the Patsy formula, the term "I(months**2)" adds a quadratic term to the model, so we don’t have to compute it explicitly. Here are the results.

display_summary(results)

	coef	std err	t	P>|t|	[0.025	0.975]
Intercept	766.1962	13.494	56.782	0.000	739.106	793.286
months	22.2153	0.938	23.673	0.000	20.331	24.099
I(months ** 2)	0.1762	0.014	12.480	0.000	0.148	0.205

R-squared:

0.9983

The p-values of the linear and quadratic terms are very low, which suggests that the quadratic model captures more information about the trend than a linear model would – and the R² value is very high.

Now we can use the model to compute the expected value of the trend for the past and future.

months = range(len(solar))
df = pd.DataFrame({"months": months})
pred_trend = results.predict(df)
pred_trend.index = solar.index

Here’s what it looks like.

pred_trend.plot(color="0.8", label="quadratic model")
trend.plot(color="C1")
decorate(ylabel="GWh")

The quadratic model fits the past trend well. Now we can use the seasonal component from the decomposition to predict the seasonal component.

monthly_averages = seasonal.groupby(seasonal.index.month).mean()
pred_seasonal = monthly_averages[pred_trend.index.month]
pred_seasonal.index = pred_trend.index

Finally, to compute “retrodictions” for past values and predictions for the future, we multiply the trend and the seasonal component.

pred = pred_trend * pred_seasonal

Here is the result along with the training data.

training.plot(label="training")
pred.plot(alpha=0.6, color="0.6", label="prediction")
decorate(ylabel="GWh")

The retrodictions fit the training data well and the predictions seem plausible – now let’s see if they turned out to be accurate. Here are the predictions along with the test data.

future = pred[test.index]
future.plot(ls="--", color="0.6", label="prediction")

test.plot(label="actual")
decorate(ylabel="GWh")

For the first three years, the predictions are very good. After that, it looks like actual growth exceeded expectations.

In this example, seasonal decomposition worked well for modeling and predicting solar production, but in the previous example, it was not very effective for nuclear production. In the next section, we’ll try a different approach, autoregression.