# When do we have 1 + 1 = 11 and 2 + 2 =5?

**Authors:** R. Padmanabhan, Alok Shukla

arXiv: 1906.02324 · 2022-12-22

## TL;DR

This paper explores the mathematical conditions under which a polynomially defined group law over rationals can satisfy specific sum conditions, connecting historical and modern mathematical theories.

## Contribution

It investigates the existence of polynomial group laws over rationals that satisfy given sum conditions, bridging historical mathematical ideas with modern research.

## Key findings

- Identifies conditions for polynomial group laws to satisfy specific sum equations.
- Connects historical mathematical concepts with modern algebraic research.
- Provides insights into the structure of polynomial group laws over rationals.

## Abstract

The phrase "$ 2+2=5 $" is a clich\'e or a slogan used in political speeches, propaganda, or literature, most notably in the novel "$ 1984 $" by George Orwell. More recently, we came across a You-Tube short film comedy, Alternative Math, produced by IdeaMan Studios (see \cite{Danny}). It is a hilarious exaggeration of a teacher who is dragged through the mud for teaching that $ 2+2=4 $ and not $ 22 $, as Danny, a young student, kept on insisting. In the movie, Danny and the whole community sincerely believe $ 1+1=11 $ and $ 2+2=22 $. Jokes aside, we ask the question whether a polynomially defined group law "$\oplus$" defined over the field of rationals such that $ 1\oplus1=u $ and $ 2 \oplus2=v $ can simultaneously be satisfied for arbitrary integers $u$ and $ v $. Answer to this question takes us through a fascinating journey from Brahmagupta all the way to the modern works of Louis Joel Mordell and Ramanujan!

## Full text

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## References

6 references — full list in the complete paper: https://tomesphere.com/paper/1906.02324/full.md

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Source: https://tomesphere.com/paper/1906.02324