 Jmovi includes one really kind of unusual kind of funny looking graph. It's called a violin plot and what it is, and it's sort of the box plot version of the density plot. And it just kind of spreads out and you'll see why it's called a violin. I'm starting with the iris data set from the example data. And I'm using the box plots that I created in the last video. I'm simply going to click here where I have the four variables and I'm not splitting them by anything. And I'm going to come here over to plots. And again, the reason violins right here is because Jmovi is able to stack all three of these on top of each other. You don't want to do that because it gets really busy looking. But I'm going to show you the relationship between the box plot and the violin plot by simply adding it right here. And I do that you get a shape that looks a little bit like a Rorschach ink plot that actually corresponds to what's happening in the box plot here. For instance, you can see that we've got a lot of data here in the middle. And that's where the violin plot goes out the most. We get a funny little manner a shaped one here because of our strongly elliptocratic distribution. And down here, you can see why it's called a violin plot because we get it comes out it goes back in comes out because of the bimodal distributions that we have on these two variables. Now I'm actually going to remove the box plot. So you can see just the violin plot on its own. And what we're left with is really just a little bit of squiggles it feels like again, a projective test. It's a little hard for me to read, but it's an interesting version. Again, it's like a density plot but oriented in the same direction as the box plot. You can of course do the same thing with the subgroup analysis that we have down here, where we broke down the measurements by species. I'm going to click on that to open up this menu. And there you can see we have species there. I'm going to click violin. And then I'm actually going to also unclick box plot right now. And what we have feels like a little set of drawing of ghosts or something. But you can see the distributions for the three different species. And it really feels like we're looking at a chart of animal shapes. There's nice little bat down here. But you can see this shows that it's a strongly compressed range because again, the outcome variable petal length goes vertically here. And then pedal with you can see again, we have a very unusual distribution for the satosis. Well, things are almost kind of sort of normal for the varice of color and the virginica. And so the violin plot not a very common choice, but potentially an interesting one. And it might be able to give you some extra insight into your data.