-
units −1 and 1 and
prime numbers have no non-trivial divisors.
There are
divisibility rules that
allow one to
recognize certain divisors of a
number from the...
-
preserving divisibility by the
divisor of interest. Therefore,
unless otherwise noted, the
resulting number should be
evaluated for
divisibility by the same...
-
Infinite divisibility arises in
different ways in philosophy, physics, economics,
order theory (a
branch of mathematics), and
probability theory (also...
-
sequences with
values in any ring
where the
concept of
divisibility is defined. A
strong divisibility sequence is an
integer sequence ( a n ) {\displaystyle...
- Xn1 + ... + Xnn has the same
distribution F. The
concept of
infinite divisibility of
probability distributions was
introduced in 1929 by
Bruno de Finetti...
- In mathematics,
specifically in the
field of
group theory, a
divisible group is an
abelian group in
which every element can, in some sense, be divided...
- In
algebraic geometry, Barsotti–Tate
groups or p-
divisible groups are
similar to the
points of
order a
power of p on an
abelian variety in characteristic...
-
politic (which
never dies). The
Crown and the
sovereign are "conceptually
divisible but
legally indivisible [...] The
office cannot exist without the office-holder"...
- the
digits of a
number n
sometimes produces another number m that is
divisible by n. This
happens trivially when n is a
palindromic number; the nontrivial...
-
divisible by
three (and so are 1386, 3168, 3186, 3618, etc.). See also
Divisibility rule. This
works in base 10 and in any
positional numeral system whose...
