tag:blogger.com,1999:blog-5052387.post398448429447710930..comments2024-03-17T16:13:55.262-07:00Comments on Blobs in Games: Introduction to hexagons, part 1Amithttp://www.blogger.com/profile/12159325271882018300noreply@blogger.comBlogger2125tag:blogger.com,1999:blog-5052387.post-67489703785824343862022-11-29T21:39:52.935-08:002022-11-29T21:39:52.935-08:00Thanks for the feedback! Not only are the lines to...Thanks for the feedback! Not only are the lines to each point the same length, but they also match the sides of the hexagon. I kind of want to show that too. It means we have lots of equilateral triangles, and we can use that triangle height to see how the circumradius and inradius are related. There's a lot of good stuff that I don't have in the current design and I might add that back in a separate diagram somehow.<br />Amithttps://www.blogger.com/profile/12159325271882018300noreply@blogger.comtag:blogger.com,1999:blog-5052387.post-45772719607892094982022-11-28T07:19:01.981-08:002022-11-28T07:19:01.981-08:00The original shows that each line to each center a...The original shows that each line to each center and each point is the same in a hexagon. I think I liked seeing those extra lines. But agree that for some reason having both labeled the way they are - I felt like it was difficult to see the difference between the two - the verbal description was easier to take in. (That the distance was from the center to the middle.) <br /><br />Seeing the diagram label it outside of the graph using the circle instead of one of the actual lines made it challenging to follow for me.NYCynikhttps://www.blogger.com/profile/05479145857512283188noreply@blogger.com