It’s 🍟, obviously.
H•(🍇, 🍔) ~= H•(🍔,🥪)[🍇]
You got me and I love it.
I don’t even understand the question but my answer is mealtime=t-0sec
Edit 0: Okay, so the Hamburger is the Integers Mod 2.
Edit 1: I can’t be certain, but my guess is that 🌭 is the nth power set of the reals. However, I’m unfamiliar with a topic that naturally contains both Z mod N and a power set of the reals, so I suspect my guess is wrong. Furthermore, I don’t know what n could be referring to, other than an arbitrary integer.
Edit 2: The next line has a notation that I’m unfamiliar with, but my guess is that it has to do with Cartesian algebra. I don’t know Cartesian algebra, and I’m not even confident I’m remembering the name correctly. I may look into this more later.
It’s (co)homology, not Cartesian algebra. There’s also a typo in the meme. I have a fixed version and solution somewhere.
If you could post them here, I’d appreciate it. I find the problem weird and interesting.
Leaving a comment to remember to check this post again, in case someone drops the answer to this.
Unless you know algebraic topology it’s kind of hopeless (but that’s the joke). If you’re curious, it’s the first example on the page on cohomology rings (where 🌭=ℝPn and 🍔=𝔽2)
🍪 = 2
🍔 = 1/2
No, it’s the integers Mod 2 (Notation “Z/2Z” where Z is the Integers) which is the only group of order 2 and the smallest non-trivial field.
Oh shit, you are right, i read it as 🥪 being an interger. Shit goes deeper and faster.
🍕 = –1/12
It’s obvious. A sealion in a hat!
(I hope at least one person gets the reference)
