See, now that you've said it, it really is quite interesting.
But would that insight be plainly obvious to most? I highly doubt it. I have an MS in an engineering discipline, and this was not obvious to me until you said it. Maybe I'm just dumb (I kid - I would have picked up on this while in undergraduate or grad school, when I could really throw my weight around in mathematics, but like anything else, linear algebra is a muscle that wastes if you don't flex it) but really there should be some commentary associated rather than a raw article - the parent comment is totally right.
I could link HN to pentation or the Ackermann function; they're interesting, but useless without context.
Cross products are taught in high school. And I'm sure by college, a good amount of people are aware that four dimensional cross products are not possible. And like me, most of them probably thought four and higher dimensional cross products don't exist. So when I saw 7-dimensional cross product, I got pretty interested.
Convex optimization is also taught in high school. Organic chemistry, biochemistry, discrete math, probability, and statistics too. I fail to see your point.
My point is that cross products are really really really simple and for some reason you have this notion that cross products are something complicated.
But would that insight be plainly obvious to most? I highly doubt it. I have an MS in an engineering discipline, and this was not obvious to me until you said it. Maybe I'm just dumb (I kid - I would have picked up on this while in undergraduate or grad school, when I could really throw my weight around in mathematics, but like anything else, linear algebra is a muscle that wastes if you don't flex it) but really there should be some commentary associated rather than a raw article - the parent comment is totally right.
I could link HN to pentation or the Ackermann function; they're interesting, but useless without context.