{"id":62839,"date":"2012-01-26T00:00:00","date_gmt":"2012-01-26T00:00:00","guid":{"rendered":"https:\/\/rockcontent.com\/blog\/euler-and-venn-diagrams\/"},"modified":"2025-09-15T17:08:03","modified_gmt":"2025-09-15T20:08:03","slug":"euler-and-venn-diagrams","status":"publish","type":"post","link":"https:\/\/pingback.com\/en\/resources\/euler-and-venn-diagrams\/","title":{"rendered":"Euler and Venn Diagrams: They Aren’t Just for Fun"},"content":{"rendered":"

\"Difference<\/a> (source)<\/a> <\/p>\n

By the time you finish reading this blog post, you should be in group three. Venn and Euler (pronounced ‘oiler’) diagrams are incredibly popular on the internet as funny charts. They offer a simple way of depicting concepts of set theory. <\/p>\n

So, what’s the difference between the two? Why are they funny? Are they useful for real data? <\/p>\n

Both chart types are used to display concepts from set theory:  <\/p>\n

\"\"  Union<\/strong> – The combination of two sets. In Venn and Euler diagrams.
   \"\"   Intersection<\/strong> – Included in both of two sets. In Venn and Euler diagrams.
 \"\"  Difference<\/strong> – Everything but the intersection of two sets. In Venn and Euler diagrams.
   \"\"  Relative Complement<\/strong> – In one set and not in the other set. In Venn and Euler diagrams.
\"\" Absolute Complement<\/strong> – Everything that is not in the other set. Only in Euler diagrams.
  \"\"  Subset<\/strong> – A set contained wholly in another set. Only in Euler diagrams.
\"\" Disjoint<\/strong> – Two sets with no elements in common. Only in Euler diagrams.   <\/p>\n

All Venn diagrams are Euler diagrams, but not all Euler diagrams are Venn diagrams. Euler diagrams only have the intersection combinations that actually exist in the real world. Venn diagrams represent every hypothetically possible logical relation between categories. <\/p>\n

\"\"<\/a>   <\/p>\n

Venn diagrams, by definition, have to display every possible intersection combination, which creates some interesting layout issues. <\/p>\n

When there are three circles, every intersection is shown, but as soon as you get to four categories, circles don’t work. <\/p>\n

Ellipses can work for up to five categories, but beyond five, strange shapes need to be used to weave in and out of all the intersection combinations. <\/p>\n

Five is already pretty complex to read, but as soon as these strange shapes come into play, reading the diagrams becomes nearly impossible, and text descriptions of the relationships are often easier to understand. <\/p>\n

\"\"<\/a>   <\/p>\n

This brings us to why so many of these diagrams are funny. <\/p>\n

The vertebrate and invertebrate Venn diagram we showed you earlier suggests that some animals can simultaneously have a spine and not have a spine. <\/p>\n

If you\u2019ve ever watched people try to make these diagrams for complex topics, you probably already know how quickly things can spiral out of control. There\u2019s this fine line between clever and just plain confusing, and it\u2019s surprisingly easy to cross it. Sometimes you end up with a sprawl of overlapping blobs and labels that seem to mock you for even trying to follow\u2014like a visual joke that was never meant to have a punchline. Not that anyone\u2019s really complaining. The chaos is kind of the point when you\u2019re using these charts for humor.<\/p>\n

On the flip side, educators and analysts still attempt to wrangle messy subject matter into Venn or Euler diagrams every year, sometimes just to prove it can be done at all. Take math textbooks, for example: by 2025, it\u2019s rare to find a chapter on set theory without a bold, multicolored diagram splayed across the page\u2014clear or not. I\u2019m sure some students have wondered if this is all an elaborate prank. But then again, wrestling with the diagrams does help students remember how gnarly the relationships can get (even if they wish for a cheat sheet).<\/p>\n

While this may not be hilarious, anyone who took sixth grade science class can tell you that it is rather silly. With a better subject matter, pointing out relationships that don’t exist can be pretty funny. <\/p>\n

Some diagrams achieve humor by putting something into a category where it doesn’t belong, or one where you wouldn’t normally expect it to be. Some creative labeling (like in the Euler diagram below) always helps, too. \"\"<\/a>   <\/p>\n

We know Euler diagrams can be funny, but can they be useful? <\/p>\n

Some diagrams embed quantity information using the area of each portion of the diagram. <\/p>\n

One good example of this is the Global Map of Social Networking 2011<\/a><\/strong> by Global Web Index<\/a>. On their own, Euler diagrams like this give you a fairly good general idea of the involved values. <\/p>\n

Reading exact quantities out of them would be a bit tough, but for gaining an overview, they are good. This particular graphic uses these Euler diagrams as small multiples, letting you compare regions.<\/p>\n

\"\"<\/a>Why aren’t there more serious Euler\/Venn diagrams in infographics? <\/p>\n

They do a good job of showing overlap in categories. They look “cool” – something many designers feel is important. They do a reasonable job of showing quantity. They show complex and interesting relationships in a way that’s simple to understand.<\/p>\n

If you’re a designer and you want interesting charts, look carefully at your data. You might be able to use an Euler or Venn diagram.   <\/p>\n

Drew Skau<\/a> is a PhD Computer Science Visualization student at UNCC<\/a>, with an undergraduate degree in Architecture.<\/em><\/p>\n

}}<\/p>\n","protected":false},"excerpt":{"rendered":"

Venn and Euler (pronounced ‘oiler’) diagrams are incredibly popular on the internet as funny charts. They offer a simple way of depicting concepts of set theory. So, what’s the difference between the two? Why are they funny? 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