A cubic equation and circle (unit radius) has intersection at A,B,C,D. ABCD is a square. Find the angle $\theta$. I tried: $(0,0)$ is a solution so constant term is $0$ Substituting A(x,y) and C(-x,-y) and adding them gives coefficient of $x^2$ is 0. Then the cubic becomes $ax^3+bx$. 3.Subst...

Check this typescript 4.2 snippet I found somewhere (playground here): type BlackMagic<T> = { [K in keyof T]: BlackMagic<T[K]> } declare const foo: BlackMagic<{q: string}>; declare const str: BlackMagic<string>; declare const num: BlackMagic<12>; I can't wrap my head around it. How does TS hand...

For a complex number $z = a+bi$, we say that its modulus is: $$|z|=\sqrt{a^2+b^2}$$ When we draw complex numbers in the Argand diagram, intuitively, this makes sense. But if we used a different projection for the diagram (i.e. a different metric for distance) then it wouldn't necessarily. Of cour...

Motivation: It recently occurred to me that Turing's analysis of the halting problem may be formulated as a fixed-point theorem. Might this intuition from theoretical computer science have informed important developments in the theory of dynamical systems? This question is motivated by discussion...

In my book, under Legendre’s Function, the following two examples were given; When $m,n \in N$ , prove that; $\ $ $m! \cdot (n!)^m$ divides $(mn)!$ $\ $ $m! \cdot n! \cdot (m+n)! $ divides $(2m)! \cdot (2n)!$ Well, for the first one, I know it is just the number of ways to put $mn$ balls int...

Let $z \in C$ and consider the following integral equation: $$-\frac{\Gamma(a)}{\Gamma(b)}\frac{1}{ z \dfrac{\mathrm{d}}{\mathrm{d}z} {_{1}F_{1}}(b,b-a;z)}= \int_{0}^{+ \infty}x^{z-1}K(x) \mathrm{d}x$$ I would like to find the kernel $K(x)$ and I would also like to write it as an infinite product...

Let $X$ be a smooth projective surface (over complex numbers). Let $D$ be a divisor on $X$. Then we know that its volume is defined as $$\text{vol}_X(D):= \lim \sup_{m \rightarrow \infty} \frac{h^0(X, \mathcal O_X(mD))}{{m^2}/2}.$$ Suppose that, for a divisor $D$ on $X$, it is known that $\text{...

Let $R$ be a ring and $\text{Mod}\,R$ the category of $R$ modules. For two $R$-modules $X,Y$ one can define $\text{Ext}_R^n(X,Y)$ as follows. We take an injective resolution $0\rightarrow Y\rightarrow I_0 \rightarrow I_1 \rightarrow \dots,$ throw away $Y$ and apply $\text{Hom}_R(X,-)$ to obtain t...

For $n\in\mathbb{N}$, denote by $\mathcal{Q}_n$ the set of all probability measures on $\mathbb{R}$ that are supported on at most $n$ points. Question: Is it known which element in $\mathcal{Q}_n$ is closest to the standard normal distribution with respect to the $p$-Wasserstein distance (for som...