OnlyPolls on Sidechat | Math Edition 1. Every function f defined such that f: ℕ → ℝ is continuous. 2. For all x, y ∈ ℝ⁺, if x² < y², x < y. 3. For every prime p, every group of prime order is isomorphic to the group of integers mod p under addition.

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Math Edition 1. Every function f defined such that f: ℕ → ℝ is continuous. 2. For all x, y ∈ ℝ⁺, if x² < y², x < y. 3. For every prime p, every group of prime order is isomorphic to the group of integers mod p under addition.

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108 votes

OnlyPolls 2d

Two truths and a lie (quote with ur own)

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I’ve touched the sphinx

Ive been to the top of Burj Khalifa

I’ve climbed the Mayan pyramids

348 votes

Anonymous 13h

Guys number 2 is true 😭😭😭

Anonymous 11h

It's #3. Groups of different orders cannot be isomorphic to each other.

Anonymous

OP 11h

ChatGPT says this it’s true

Anonymous

#1 9h

It's very close to a true statement. It's false because i didn't specify that it had to be the same prime.