As far as inflectional morphology is concerned, English isn't exactly a rich language. Still, the present-tense paradigm of the copular verb be shows that even English distinguishes between grammatical person and grammatical number: Person  Singular  Plural 1st am  are 2nd  are are 3r...

For the below simple example, if CONDITION is not set in the script, running the script would print "True". However one would expect it to print "False". Why is this behavior? # Set CONDITION by using true or false: # CONDITION=true or false if $CONDITION; then echo "True" else echo "False"

For a positive integer $n$, let $\mathcal{P}$ be the power set of $[n]$. Consider the graph $G$ with $\mathcal{P}$ as its vertex set, and, for $S_1,S_2 \in \mathcal{P}$, the edge $(S_1,S_2)$ exists iff $S_1 \subset S_2$. (That is, $G$ is the transitive closure of the Hasse diagram of the "$\subset$"

Let $T$ be a regular tournament, and $u \in V(T)$. Let $Out(u) \subset V(T)$ denote the set of vertices such that the edges between $u$ and them go out of $u$. Similarly define $In(u)$. Let two distinct vertices $u,v$ be called $\textbf{antipodal}$ if $Out(u) \setminus v = In(v) \setminus u$ (and...

I'm working on a problem from a past exam paper, Define the group operation on the set of solutions of Pell's equation, $$G_d=\{(x,y)\in\mathbb{Z}^2:x^2-dy^2=1\}$$ and show that the group axioms are satisfied. I don't have access to course notes yet. I've surmised from this paper (adapted from ...

I am able to construct functions $\sin,\cos\colon \mathbb R \to \mathbb R$ satisfying the following properties: $\sin^2 x + \cos^2 x = 1$, $\sin(x+y)=\sin x \cos y + \sin y\cos x$, $\cos(x+y)=\cos x \cos y - \sin x \sin y$, $\sin(0)=0$, $\cos(0)=1$ there exists $\tau>0$ such that $\sin$ and $\co...