You would say Es sind null Grad. which is Plural. Why can't you say "Es ist null Grad." ?

I've recently started learning Python through an intro online class. The instructor just introduced bisection algorithms, and I'm trying to apply it to a game of hangman. However, my code gets caught in a never ending loop for certain 'secret words', but not for others. For example, it can guess ...

I want to count the number $N(n,A)$ of closed walks of length $2n$ on the square $2d$ lattice enclosing a signed area of $A$. These numbers refine $\sum_A N(n,A) = \left(\begin{array}{c}2n\\n\end{array}\right)^2.$ For example $N(2,-1) = 4, N(2,0) = 28, N(2,1) = 4.$ Any help?

Suppose $\mathcal{F} \subseteq \mathcal{P} (\omega) $ is an almost disjoint family and $\aleph_0 < \vert \mathcal{F} \vert = \kappa < 2^{\aleph_0} $. Is it consistent that for some such cardinal $\kappa$, we can uniformize every two-valued function on the family; that is, if $\mathcal{F} = \langl...

Junit giving error: org.mockito.exceptions.misusing.WrongTypeOfReturnValue Here is the original code: package com.ms.ets.hive; import java.io.IOException; import java.text.SimpleDateFormat; import java.util.ArrayList; import java.util.Date; import java.util.HashMap; import java.util.List; import...

I have found the connection of : $$ a_n = a_{n-1} + a_{n-2} $$ $$ A = \lim_{n \to \infty} \biggl( \frac{a_n}{a_{n-1}} \biggr) $$ $$a_0 = 1$$ $$a_1 = 1$$ $$ b_n = b_{n-1} + b_{n-2} + b_{n-3} $$ $$ B = \lim_{n \to \infty} \biggl( \frac{b_n}{b_{n-1}} \biggr) $$ $$b_0 = 1$$ $$b_1 = 1$$ $$b_2 = 1$$ ...