If $G$ is a finite group of order $|G|=936$, then there is a subgroup $H$ of $G$ with $|H|=117$
Zeros of two equations
Prove that $\frac{1}{90} < \sqrt{2024} – \sqrt{2023} <\frac{1}{88}$
$\left[\dfrac 12\displaystyle\sum_{n=1}^{k^2}\frac 1{\sqrt n}\right]=k-1$
How many rolls are sufficient to ensure, with probability 99%, that the sum is greater than 100
Cutting one 2021-inch-long piece of wood into 2021 1-inch-long pieces using the fewest cuts
If G is a product of two subgroups, must one of them be normal?
Does a nonzero section induce Isomorphism of Locally Free Sheaves
Is it true that |X| vanishes at infinity, then X is integrable
Two answers coming to this limit problem, $0$ or $-1?$