• starman2112@sh.itjust.works
      link
      fedilink
      arrow-up
      0
      ·
      2 months ago

      Because the angles aren’t represented accurately. It could be that the two angles that look like they’re 90° add up to 180°, but they could also not

      • sugar_in_your_tea@sh.itjust.works
        link
        fedilink
        arrow-up
        0
        ·
        1 month ago

        That’s technically possible, but that’s also an irrational take. The rational take is to assume the problem is solvable given the available information, which means assuming that the lines are straight.

        Yes, two angles appear to be 90⁰, but they’re obviously not with the given information. Math conventions nearly always label right angles, so not having the right angle there implies that the angle should not be assumed to be 90⁰. Math conventions in trigonometry also generally assume straight lines unless there’s a visual indicator that they’re not, and those tend to be exaggerated so it’s obvious.

        So the rational answer here is that the bottom line is straight and therefore the problem is solvable. Saying otherwise is irrational, because that’s so far away from math conventions.

    • ochi_chernye@startrek.website
      link
      fedilink
      arrow-up
      0
      ·
      2 months ago

      Because the apparently straight lines contradict the labels. As drawn, the unlabeled bottom vertices are clearly 90°, not 80° and 100°. We must either conclude that the labels are incorrect, or that the figure is not drawn to scale. Either way, it’s insoluble.