You got me and I love it.
It’s 🍟, obviously.
Leaving a comment to remember to check this post again, in case someone drops the answer to this.
🍪 = 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
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)
It’s obvious. A sealion in a hat!
(I hope at least one person gets the reference)
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.
H•(🍇, 🍔) ~= H•(🍔,🥪)[🍇]