On accident

I kind of can’t take people seriously when they say On accident, I don’t know or care if its more or less grammatical, it sounds like a child sputtering in my mind. It should be By accident or accidentally

Tummy

Any adult has zero business saying this lol

  • @minyakcurry@monyet.cc
    link
    fedilink
    15 months ago

    I say openly that I’m bad at math because I cannot, even with intense effort, intuit concepts that are laid out as pure mathematical expressions. Why do graphs have eigenvectors? What does that even look like?!

    • @Coconut1233@lemmy.world
      link
      fedilink
      2
      edit-2
      5 months ago

      Graphs don’t have vectors, spaces do. A space is just an n-dimensional “graph”. Vectors written in columns next to each other are matrices. Matrices can describe transformation of space, and if the transformation is linear (straight lines stay straight) there will be some vectors that stay the same (unaffected by the transformation). These are called eigenvectors.

      • @minyakcurry@monyet.cc
        link
        fedilink
        15 months ago

        Thanks for the response! Honestly wasn’t expecting any. I understand what you’re saying as a pure student would, but could you explain what you mean by “a space is a just an n-dimensional graph”?

        Would the vertices map to some coordinate in space? Or am I completely misunderstanding.

        • @Coconut1233@lemmy.world
          link
          fedilink
          15 months ago

          I misunderstood a little, I assumed a function graph, which could be R^n space. But for the graph-theory-graphs (sets of vertices and edges) it’s similar, you can model the graph using adjacency matrix (NxN matrix for a graph of N vertices, where the vertices ‘mapped’ to a row and column by index. Usually consisting of real numbers representing distance between the “row” and “column” node) and look at it from the linear algebra point of view. That allows to model some characteristics of the graph. But honestly I haven’t mixed these two fields of maths much, so I hope what I wrote is somewhat understandable.