- Given one primitive root, how do you find all the others?
After you've found the first primitive root $= 5$ , the powers of $5$ will be the elements in $\phi (\phi (23)) = \phi (22) = \ {1,3,5,7,9,13,15,17,19,21\}$ This will give the required 10 primitive roots
- What are primitive roots modulo n? - Mathematics Stack Exchange
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 $m\ge0$
- calculus - Why is antiderivative also known as primitive . . .
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 have pointed out here How common is the use of the term "primitive" to mean "antiderivative"?, some languages such as Dutch only use the term, primitive
- What is a primitive polynomial? - Mathematics Stack Exchange
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 it in more detail I'm unsure of what a primitive polynomial is, and why it is useful for these random number generators
- Finding a primitive root of a prime number
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
- Primitive binary necklaces - Mathematics Stack Exchange
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? For ex
- calculus - What is the primitive of $\frac {\ln (1+x)} {x . . .
What is the primitive of $\frac {\ln (1+x)} {x}$ Ask Question Asked 11 years, 9 months ago Modified 9 years, 1 month ago
- Primitive polynomials - Mathematics Stack Exchange
A polynomial with integer coefficients is primitive if its content (the GCD of its coefficients) is 1 You can simply enumerate the primitive monic quadratic polynomials (depicted as ordered triples of coefficients in descending order of order):
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