"B.distachyon&O.sativa&P.dactylifera&A.thaliana" = 5, "B.distachyon&S.bicolor&P.dactylifera&A.thaliana" = 11, "B.distachyon&M.acuminata&O.sativa&A.thaliana" = 7, "M.acuminata&O.sativa&P.dactylifera&A.thaliana" = 28, "O.sativa&M.acuminata&A.thaliana&S.bicolor" = 71, "B.distachyon&M.acuminata&O.sativa&A.thaliana" = 29, "S.bicolor&B.distachyon&O.sativa&A.thaliana" = 206, "B.distachyon&O.sativa&M.acuminata&P.dactylifera" = 18, "P.dactylifera&S.bicolor&O.sativa&M.acuminata" = 62, "M.acuminata&B.distachyon&S.bicolor&A.thaliana" = 54, "B.distachyon&S.bicolor&P.dactylifera" = 23, "B.distachyon&M.acuminata&P.dactylifera" = 12, "B.distachyon&A.thaliana&P.dactylifera" = 3, "S.bicolor&M.acuminata&P.dactylifera" = 19, "P.dactylifera&A.thaliana&S.bicolor" = 4, "M.acuminata&P.dactylifera&A.thaliana" = 206, "B.distachyon&M.acuminata&A.thaliana" = 7, "O.sativa&M.acuminata&P.dactylifera" = 35, "S.bicolor&B.distachyon&M.acuminata" = 13,
![create venn diagram in word 2013 create venn diagram in word 2013](https://i.ytimg.com/vi/xC0jHSLwOhw/maxresdefault.jpg)
"O.sativa&B.distachyon&M.acuminata" = 28, "S.bicolor&B.distachyon&A.thaliana" = 14, "S.bicolor&O.sativa&B.distachyon" = 2809, "B.distachyon&O.sativa&P.dactylifera" = 12, Every possible intersection is represented by the bottom plot, and their occurence is shown on the top barplot. The total size of each set is represented on the left barplot. Here is an example provided by the UpsetR R library that displays the banana genome information seen before. To visualize the intersection between more than 3 sets, the best option is to use a UpSet plot. Here is a famous example: a six-set venn diagram published in Nature that shows the relationship between the banana’s genome and the genome of five other species.Įven if this figure is quite attractive, it is really hard to extract any information from it.
![create venn diagram in word 2013 create venn diagram in word 2013](https://i.ytimg.com/vi/7FmBCWkQUDM/maxresdefault.jpg)
It becomes very hard to read with more groups than that and thus must be avoided. What forĪ venn diagram makes a really good work to study the intersection between 2 or 3 sets. 44 of them were also used by Brassens and Nekfeu, 126 only shared with Nekfeu only.
![create venn diagram in word 2013 create venn diagram in word 2013](https://i.ytimg.com/vi/LNnYXwRk7II/maxresdefault.jpg)
Here, it is easy to understand that Booba used 1995 unique words in the dataset.