Jan 6, 2019 · The so-called primitive function f f, which was the starting point and so came first, the root meaning of primitive (Lat. primus, first), is what we might call an antiderivative or integral of p p. …

Jul 31, 2010 · 9 What is a primitive polynomial? I was looking into some random number generation algorithms and 'primitive polynomial' came up a sufficient number of times that I decided to look into …

Sep 4, 2021 · When first encountering a set of primitive inference rules, how do we approach the derivation of the very first derivable inference rules? Ask Question Asked 4 years, 4 months ago …

Jan 3, 2015 · 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

Sep 29, 2023 · There is only one primitive quadratic Dirichlet character modulo N N, namely the one induced by (Δ(⋅) (Δ ( ⋅ ), where Δ Δ is the discrimininant with absolute value N N.

Jul 6, 2019 · To get a Primitive Pythagorean triple, m m and n n have to co-prime and not both odd. I wanted to understand the proof of this formula. I don't understand this part of the proof which is also …

Jan 28, 2017 · Artin-Wedderburn matrix decomposition holds for every semisimple ring. The first chapter of T.Y. Lam's book "A first course in noncommutative rings" should have everything you need.

Sep 25, 2025 · This definition seems different from what I have seen elsewhere. For example, one has the definition Def 2: A primitive n n -th root of unity is an n n -th root of 1 that is not a m m -th root of 1 …

Nov 1, 2017 · The ring M2(Z) M 2 (Z) won't work: being right primitive is a Morita invariant property, so Z Z would also have to have that property. But a commutative primitive ring is a field, so Z Z is not …

Jul 31, 2021 · However, it is the set, rather than the tuple, that is chosen as the primitive object. Why is it useful for the foundations of mathematics that sets have very little "structure", and would their be any …