Today, I return to the life expectancy graphic that Antonio submitted. In a previous post, I looked at the bumps chart. The centerpiece of that graphic is the following complicated bar chart.

Let's start with the dual axes. On the left, age, and on the right, year of birth. I actually like this type of dual axes. The two axes present two versions of the same scale so the dual axes exist without distortion. It just allows the reader to pick which scale they want to use.

It baffles me that the range of each bar runs from 2.5 years to 7.5 years or 7.5 years to 2.5 years, with 5 or 10 years situated in the middle of each bar.

Reading the rest of the chart is like unentangling some balled up wires. The author has created a statistical model that attributes cause of death to male life expectancy in such a way that you can take the difference in life expectancy between two time points, and do a kind of waterfall analysis in which each cause of death either adds to or subtracts from the prior life expectancy, with the sum of these additions and substractions leading to the end-of-period life expectancy.

The model is complicated enough, and the chart doesn't make it any easier.

The bars are rooted at the zero value. The horizontal axis plots addition or substraction to life expectancy, thus zero represents no change during the period. Zero does not mean the cause of death (e.g. cancer) does not contribute to life expectancy; it just means the contribution remains the same.

The changes to life expectancy are shown in units of months. I'd prefer to see units of years because life expectancy is almost always given in years. Using years turn 2.5 months into 0.2 years which is a fraction, but it allows me to see the impact on the reported life expectancy without having to do a month-to-year conversion.

The chart highlights seven causes of death with seven different colors, plus gray for others.

What really does a number on readers is the shading, which adds another layer on top of the hues. Each color comes in one of two shading, referencing two periods of time. The unshaded bar segments concern changes between 2010 and "2019" while the shaded segments concern changes between "2019" and 2020. The two periods are chosen to highlight the impact of COVID-19 (the red-orange color), which did not exist before "2019".

Let's zoom in on one of the rows of data - the 72.5 to 77.5 age group.

COVID-19 (red-orange) has a negative impact on life expectancy and that's the easy one to see. That's because COVID-19's contribution as a cause of death is exactly zero prior to "2019". Thus, the change in life expectancy is a change from zero. This is not how we can interpret any of the other colors.

Next, we look at cancer (blue). Since this bar segment sits on the right side of zero, cancer has contributed positively to change in life expectancy between 2010 and 2020. Practically, that means proportionally fewer people have died from cancer. Since the lengths of these bar segments correspond to the relative value, not absolute value, of life expectancy, longer bars do not necessarily indicate more numerous deaths.

Now the blue segment is actually divided into two parts, the shaded and not shaded. The not-shaded part is for the period "2019" to 2020 in the first year of the COVID-19 pandemic. The shaded part is for the period 2010 to "2019". It is a much wider span but it also contains 9 years of changes versus "1 year" so it's hard to tell if the single-year change is significantly different from the average single-year change of the past 9 years. (I'm using these quotes because I don't know whether they split the year 2019 in the middle since COVID-19 didn't show up till the end of that year.)

Next, we look at the yellow-brown color correponding to CVD. The key feature is that this block is split into two parts, one positive, one negative. Prior to "2019", CVD has been contributing positively to life expectancy changes while after "2019", it has contributed negatively. This observation raises some questions: why would CVD behave differently with the arrival of the pandemic? Are there data problems?

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A small multiples design - splitting the period into two charts - may help here. To make those two charts comparable, I'd suggest annualizing the data so that the 9-year numbers represent the average annual values instead of the cumulative values.

In an article about gas prices around the world, the Washington Post uses the following bar chart (link):

There are a few wrinkles in this one compared to the most generic bar chart one can produce:

(The numbers on my chart are not the same as Washington Post's. That's because the data vendor charges for data, except for the most recent week. So, my data is from a different week.)

The gas prices are not expressed in dollars but a transformation turns prices into a cost-effectiveness metric: miles per dollar, or more precisely, miles per $40 dollars of gas. The metric has a reverse direction - the higher the price, the lower the miles. The data transformation belongs to the D corner of the Trifecta Checkup framework (link). Depending on how one poses the Q(uestion) of the chart, the shift from dollars to miles can bring the Q and the D in sync.

In the V(isual) corner, the designer embellishes the bars. A car icon is placed at the tip of each bar while the bar itself is turned into a wavy path, symbolizing a dirt path. The driving metaphor is in full play. In fact, the video makes the most out of it. There is no doubt that the embellishment has turned a mere scientific presentation into a form of entertainment.

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Did the embellishment harm visual clarity? For the most part, no.

The worst it can get is when they compared U.S. and India/South Africa:

The left column shows the original charts from the article. In  both charts, the two cars are so close together that it is impossible to learn the scale of the difference. The amount of difference is a fraction of the width of a car icon.

The right column shows the "self-sufficiency test". Imagine the data labels are not on the chart. What we learn is that if we wanted to know how big of a gap is between the two countries, when reading the charts on the left, we are relying on the data labels, not the visual elements. On the right side, if we really want to learn the gaps, we have to look through the car icons to find the tips of the bars!

This discussion does not necessarily doom the appealing chart. If the message one wants to send with the India/South Afrcia charts is that there is negligible difference between them, then it is not crucial to present the precise differences in prices.

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The real problem with this dataviz is in the D corner. Comparing countries is hard.

As shown above, by the miles per $40 spend metric, U.S. and India are rated essentially the same. So is the average American and the average Indian suffering equally?

Far from it. The clue comes from the aggregate chart, in which countries are divided into three tiers: high income, upper middle income and lower middle income. The U.S. belongs to the high-income tier while India falls into the lower-middle-income tier.

The cost of living in India is much lower than in the US. Forty dollars is a much bigger chunk of an Indian paycheck than an American one.

To adjust for cost of living, economists use a PPP (purchasing power parity) value. The following chart shows the difference:

The right graph contains cost-of-living adjustments. It shows a completely different picture. Nominally (left chart), the price of gas in about the same in dollar terms between U.S. and India. In terms of cost of living, gas is actually 5 times more expensive in India. Thus, the adjusted miles per $40 gas number is much smaller for India than the unadjusted. (Because PPP is relative to U.S. prices, the U.S. numbers are not affected.)

PPP is not the end-all here. According to the Economic Times (India), only 22 out of 1,000 Indians own cars, compared to 980 out of 1,000 Americans. Think about the implication of using any statistic that averages the entire population!

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Why is gas more expensive in California than the U.S. average? The talking point I keep hearing is environmental regulations. Gas prices may be higher in Europe for a similar reason. Residents in those places may be willing to pay higher prices because they get satisfaction from playing their part in preserving the planet for future generations.

The footnote discloses this not-trivial issue.

When converting from dollars per gallon/liter into miles per $40, we need data on miles per gallon/liter. Americans notoriously drive cars (trucks, SUVs, etc.) that have much lower mileage than those driven by other countries. However, this factor is artificially removed by assuming the same car with 32 mpg on all countries. A quick hop to the BTS website tells us that the average mpg of American cars is a third of that assumption. [See note below.]

Ignoring cross-country comparisons for the time being, the true number for U.S. is not 247 miles per $40 spent on gas as claimed. It is a third of that value: 82 miles per $40 spent.

It's tough to find data on fuel economy of all passenger cars, not just new passenger cars. I found Australia's number, which is 21 mpg. So this brings the miles per $40 number down from about 230 to 115. These are not small adjustments.

Washington Post's analysis paints a simplistic picture that presupposes that price is the only thing people care about. I call this issue xyopia. It's when the analyst frames the problem as factor x explaining outcome y, and when factor x is not the only, and frequently not even the most important, factor affecting y.

More on xyopia.

More discussion of Washington Post graphics.

[P.S. 7-25-2022. Reader Cody Curtis pointed out in the comments that the Bureau of Transportation Statistics report was using km/liter as units, not miles per gallon. The 10 km/liter number for average cars is roughly 23 mpg. I'll leave the text as is in the post as the larger point is valid: that there is variation in average fuel economy between nations - partly due to environemental regulation and consumer behavior - and thus, a proper comparison requires adjusting for this factor.]

Note [July 6, 2022]: Typepad's image loader is broken yet again. There is no way for me to fix the images right now. They are not showing despite being loaded properly yesterday. I also cannot load new images. Apologies!

Note 2: Manually worked around the automated image loader.

Note 3: Thanks Glenn for letting me about the image loading problem. It turns out the comment approval function is also broken, so I am not able to approve the comment.

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A twitter user sent me this chart:

It's, hmm, mystifying. It performs magic, as I explain below.

What's the purpose of the gridlines and axis labels? Even if there is a rationale for printing those numbers, they make it harder, not easier, for readers to understand the chart!

I think the following chart shows the main message of this poll result. Democrats are much more likely to think of immigration as a positive compared to Republicans, with Independents situated in between.

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The axis title gives a hint as to what the chart designer was aiming for with the unconventional axis. It reads "Overall Percentage for All Participants". It appears that the total length of the stacked bar is the weighted aggregate response rate. Roughly 17% of Americans thought this development to be "very positive" which include 8% of Republicans, 27% of Democrats and 12% of Independents. Since the three segments are not equal in size, 17% is a weighted average of the three proportions.

Within each of the three political affiliations, the data labels add to 100%. These numbers therefore are unweighted response rates for each segment. (If weighted, they should add up to the proportion of each segment.)

This sets up an impossible math problem. The three segments within each bar then represent the sum of three proportions, each unweighted within its segment. Adding these unweighted proportions does not yield the desired weighted average response rate. To get the weighted average response rate, we need to sum the weighted segment response rates instead.

This impossible math problem somehow got resolved visually. We can see that each bar segment faithfully represent the unweighted response rates shown in the respective data labels. Summing them would not yield the aggregate response rates as shown on the axis title. The difference is not a simple multiplicative constant because each segment must be weighted by a different multiplier. So, your guess is as good as mine: what is the magic that makes the impossible possible?

[P.S. Another way to see this inconsistency. The sum of all the data labels is 300% because the proportions of each segment add up to 100%. At the same time, the axis title implies that the sum of the lengths of all five bars should be 100%. So, the chart asserts that 300% = 100%.]

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This poll question is a perfect classroom fodder to discuss how wording of poll questions affects responses (something called "response bias"). Look at the following variants of the same questions. Are we likely to get answers consistent with the above question?

As you know, the demographic makeup of America is changing and becoming more diverse, while the U.S. Census estimates that white people will still be the largest race in approximately 25 years. Generally speaking, do you find these changes to be very positive, somewhat positive, somewhat negative or very negative?

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As you know, the demographic makeup of America is changing and becoming more diverse, with the U.S. Census estimating that black people will still be a minority in approximately 25 years. Generally speaking, do you find these changes to be very positive, somewhat positive, somewhat negative or very negative?

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As you know, the demographic makeup of America is changing and becoming more diverse, with the U.S. Census estimating that Hispanic, black, Asian and other non-white people together will be a majority in approximately 25 years. Generally speaking, do you find these changes to be very positive, somewhat positive, somewhat negative or very negative?

What is also amusing is that in the world described by the pollster in 25 years, every race will qualify as a "minority". There will be no longer majority since no race will constitute at least 50% of the U.S. population. So at that time, the word "minority" will  have lost meaning.

It's great that the UN is publishing dataviz but it can do better than this effort:

Certain problems are obvious. The country names turned sideways. The meaningless use of color. The inexplicable sequencing of the country/region.

Some problems are subtler. "Area, nes" - upon research - is a custom term used by UN Trade Statistics, meaning "not elsewhere specified".

The gridlines are debatable. Their function is to help readers figure out the data values if they care. The design omitted the top and bottom gridlines, which makes it hard to judge the values for USA (dark blue), Netherlands (orange), and Germany (gray).

See here, where I added the top gridline.

Now, we can see this value is around 3.6, just over the halfway point between gridlines.

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A central feature of trading statistics is "balance". The following chart makes it clear that the positive numbers outweigh the negative numbers in the above chart.

At the time I made the chart, I wasn't sure how to interpret the gap of 1.3%. Looking at the chart again, I think it's saying Sweden has a trade surplus equal to that amount.

A twitter user sent me this chart from Germany.

It came with a translation:

"Explanation: The chart says how many car drivers plan to purchase a new state-sponsored ticket for public transport. And of those who do, how many plan to use their car less often."

Because visual language should be universal, we shouldn't be deterred by not knowing German.

The structure of the data can be readily understood: we expect three values that add up to 100% from the pie chart. The largest category accounts for 58% of the data, followed by the blue category (40%). The last and smallest category therefore has 2% of the data.

The blue category is of the most interest, and the designer breaks that up into four sub-groups, three of which are roughly similarly popular.

The puzzle is the identities of these categories.

The sub-categories are directly labeled so these are easy for German speakers. From a handy online translator, these labels mean "definitely", "probably", "rather not", "definitely not". Well, that's not too helpful when we don't know what the survey question is.

According to our correspondent, the question should be "of those who plan to buy the new ticket, how many plan to use their car less often?"

I suppose the question is found above the column chart under the car icon. The translator dutifully outputs "Thus rarer (i.e. less) car use". There is no visual cue to let readers know we are supposed to read the right hand side as a single column. In fact, for this reader, I was reading horizontally from top to bottom.

Now, the two icons on the left and the middle of the top row should map to not buying and buying the ticket. The check mark and cross convey that message. But... what do these icons map to on the chart below? We get no clue.

In fact, the will-buy ticket group is the 40% blue category while the will-not group is the 58% light gray category.

What about the dark gray thin sector? Well, one needs to read the fine print. The footnote says "I don't know/ no response".

Since this group is small and uninformative, it's fine to push it into the footnote. However, the choice of a dark color, and placing it at the 12-o'clock angle of the pie chart run counter to de-emphasizing this category!

Another twitter user visually depicts the journey we take to understand this chart:

The structure of the data is revealed better with something like this:

The chart doesn't need this many colors but why not? It's summer.

Pictures speak louder than words

A twitter user alerted me to this chart put out by the Biden adminstration trumpeting a reduction in the budget deficit from 2020 to 2021:

This column chart embodies a form that is popular in many presentations, including in scientific journals. It's deficient in so many ways it's a marvel how it continues to live.

There are just two numbers: -3132 and -2772. Their difference is $360 billion, which is less than just over 10 percent of the earlier number. It's not clear what any data graphic can add.

Indeed, the chart does not do much. It obscures the actual data. What is the budget deficit in 2020? Readers must look at the axis labels, and judge that it's about a quarter of the way between 3000 and 3500. Five hundred quartered is 125. So it's roughly $3.125 trillion. Similarly, the 2021 number is slightly above the halfway point between 2,500 and 3,000.

These numbers are upside down. Taller columns are bad! Shortening the columns is good. It's all counter intuitive.

Column charts encode data in the heights of the columns. The designer apparently wants readers to believe the deficit has been cut by about a third.

As usual, this deception is achieved by cutting the column chart off at its knees. Removing equal sections of each column destroys the propotionality of the heights.

Why hold back? Here's a version of the chart showing the deficit was cut by half:

The relative percent reduction depends on where the baseline is placed. The only defensible baseline is the zero baseline. That's the only setting under which the relative percent reduction is accurately represented visually.

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This same problem presents itself subtly in Covid-19 vaccine studies. I explain in this post, which I rate as one of my best Covid-19 posts. Check it out!

A long-time reader sent me the following chart from a Nature article, pointing out that it is rather worthless.

The simple bar chart plots the number of downloads, organized by country, from the website called Sci-Hub, which I've just learned is where one can download scientific articles for free - working around the exorbitant paywalls of scientific journals.

The bar chart is a good example of a Type D chart (Trifecta Checkup). There is nothing wrong with the purpose or visual design of the chart. Nevertheless, the chart paints a misleading picture. The Nature article addresses several shortcomings of the data.

The first - and perhaps most significant - problem is that many Sci-Hub users are expected to access the site via VPN servers that hide their true countries of origin. If the proportion of VPN users is high, the entire dataset is called into doubt. The data would contain both false positives (in countries with VPN servers) and false negatives (in countries with high numbers of VPN users). 

The second problem is seasonality. The dataset covered only one month. Many users are expected to be academics, and in the southern hemisphere, schools are on summer vacation in January and February. Thus, the data from those regions may convey the wrong picture.

Another problem, according to the Nature article, is that Sci-Hub has many competitors. "The figures include only downloads from original Sci-Hub websites, not any replica or ‘mirror’ site, which can have high traffic in places where the original domain is banned."

This mirror-site problem may be worse than it appears. Yes, downloads from Sci-Hub underestimate the entire market for "free" scientific articles. But these mirror sites also inflate Sci-Hub statistics. Presumably, these mirror sites obtain their inventory from Sci-Hub by setting up accounts, thus contributing lots of downloads.

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Even if VPN and seasonality problems are resolved, the total number of downloads should be adjusted for population. The most appropriate adjustment factor is the population of scientists, but that statistic may be difficult to obtain. A useful proxy might be the number of STEM degrees by country - obtained from a UNESCO survey (link).

A metric of the type "number of Sci-Hub downloads per STEM degree" sounds odd and useless. I'd argue it's better than the unadjusted total number of Sci-Hub downloads. Just don't focus on the absolute values but the relative comparisons between countries. Even better, we can convert the absolute values into an index to focus attention on comparisons.

Here's another bar chart I came across recently. The chart - apparently published by Kaggle - appeared to present challenges data scientists face in industry:

This chart is pretty standard, and inoffensive. But we can still make it better.

Version 1

I removed the decimals from the data labels.

Version 2

Since every bar is labelled, is anyone looking at the axis labels?

Version 3

You love axis labels. Then, let's drop the data labels.

Version 4

Ahh, so data scientists struggle with data problems, and people issues. They don't need better tools.

I came across the following bar chart (link), which presents the results of a survey of CMOs (Chief Marketing Officers) on their attitudes toward data analytics.

Responses are tabulated to the question about the most significant hurdle(s) against the increasing use of data and analytics for marketing.

Eleven answers were presented, in addition to the catchall "Other" response. I'm unable to divine the rule used by the designer to sequence the responses.

It's not in order of significance, the most obvious choice. It's not alphabetical, either.

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I think this indiscretion is partially redeemed by the use of color shades. The darkest blue shade points our eyes to the most significant hurdle - lack of investment in technology (44% of respondents). The second most significant hurdle is "availability of credible tools for measuring effectiveness" (31%), and that too is in dark blue.

Now what? The third most popular answer has 30% of the respondents, but it's shown by the second palest blue! I then realize the colors don't actually convey any information. Five shades of blue were selected, and they are laid out from top to bottom, from palest to darkest, in a sequential, recursive manner.

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This chart is wild. Notice how the heights of the bars are variable. It seems that some bars have been widened to accommodate wrapped lines of text. These small edits introduce visual distortion so that the areas of these bars no longer are proportional to the data.

I like a pair of design decisions. Not showing decimal places and appending the % sign on each bar label is good. They also extend the horizontal axis to 100%. This shows what proportion of the respondents selected any particular answer - we note that a respondent is allowed to select more than one response.

The following is a more standard way of making a bar chart. (The color shading is not necessary.)

This example proves that the V corner of the Trifecta Checkup is still relevant. After one develops a good question, collects useful data and selects a standard chart form, figuring out how to visually display the information is not as easy breezy as one might think.