Jan 6, 2019 · While antiderivative, primitive, and indefinite integral are synonymous in the United States, other languages seem not to have any equivalent terms for antiderivative. As others …

The important fact is that the only numbers $n$ that have primitive roots modulo $n$ are of the form $2^\varepsilon p^m$, where $\varepsilon$ is either $0$ or $1$, $p$ is an odd prime, and …

May 16, 2023 · How would you find a primitive root of a prime number such as 761? How do you pick the primitive roots to test? Randomly? Thanks

Apr 29, 2019 · Primitive roots in arithmetic progression Ask Question Asked 6 years, 8 months ago Modified 6 years, 8 months ago

Jul 31, 2024 · In fact, primitive recursive functions can perform a huge variety of set-theoretic tasks, which makes primitive wellfounded recursion straightforward... Or at least, it's …

Oct 13, 2022 · In this Wikipedia article some upper bounds for the smallest primitive root $g$ modulo a prime $p$ are given, but the first is implicite (what is the constant $C ...

Sep 29, 2023 · Proving Dirichlet character is primitive Ask Question Asked 2 years, 2 months ago Modified 2 years, 2 months ago

Aug 12, 2025 · For questions about primitive roots in modular arithmetic, index calculus, and applications in cryptography. For questions about primitive roots of unity, use the (roots-of …

Jan 28, 2019 · The above is all standard, but I claimed to have AN EDUCATED GUESS. Here it is. If we present $\beta=2$ internally, then the quadratic $$ p (x)=x^2+x+\beta "=" x^2+x+2 $$ …

The problem/solution of counting the number of (primitive) necklaces (Lyndon words) is very well known. But what about results giving sufficient conditions for a given necklace be primitive? …