Well, I was doing a bit of light reading and my True Friend MBS (@mbransons, on Twitter) made a picture of trailblazers going back and forth and learning by going to all the explorer places when you are going in information. The GIF above is based on an image from his post called This Way! Wait no that way. But I added me in to show my thinking.
Then, I started thinking because of this, and it made me have a question.
First, I was looking at all those curvy lines where they were walking around (but not in circles) and I was thinking that it was not-linear, but had more dimensions. Plus, time. Even if you got back to the same thinking spot later, it was not the same because you had gone to different places in between and even if you were at the same place you were at before maybe now you were different at the same place, so you were a different dimension, too. Plus, that time dimension was different.
Then, I was also thinking about all the places that you went to on the curvy paths, and how you saw other people and if they saw you (if you didn’t always use ninja skills) then they might have different paths from there (but not running away from you because they were scared!) and so they would take different stairs and get to different places, too. Plus, their time dimension thing.
Plus, you could also draw the picture that MBS made not on flat paper but in jello or something. Yummy.
Then I watched some videos on YouTube about people trying to catch arrows but I didn’t find a good one to GIF. Adam from Mythbusters had a neat trick. But that’s when I made the jello GIF instead.
Then I looked up vectors on Wikipedia. Boy, they have a lot of kinds of vectors. But they didn’t say #thoughtvectors yet. So somebody should update that. Maybe Giulia.
Then, I was also thinking about a long time ago when they said that vectors had arrows on them. And then I started to think about how if the vectors (even thinking ones) have arrows on them, do you only get to go in the direction of the arrow (because someone put the arrow on it for you) or can you reverse it by multiply by minus one and go your own way and what kind of thinking is that? Maybe that is like when you think outside of a box. Plus, I don’t like to be in a box.
Plus, then I remembered that they also used to say a long time ago that vectors were made out of straight lines. But the #thoughtvector ones that MBS made are curved. So does that mean that all the curved #thoughtvectors are even made up of tiny little straight vector arrows? Or are they made out of curved #thoughtvector arrows inside of them?
Then, I was thinking about how MBS was saying about trailblazers and it made me think of something that I read on the Internet once when someone said this:
So I made demotivational poster of it for explorers.
So when you are a trailblazer, you get the fun of exploring and you understand arrows. If you are a ninja, then catch the arrows, otherwise duck or used curved ones. Or find ones that don’t have arrowheads on them. But if you are just a settler, then what’s the point?
So that was some of my thinking.
Well, bye!