Group (Mathematics)

From Conservapedia

\text{[math]}

This article/section deals with mathematical concepts appropriate for late high school or early college.

A group is a mathematical structure consisting of a set of elements combined with a binary operator which satisfies four conditions:

Closure: applying the binary operator to any two elements of the group produces a result which itself belongs to the group
Associativity: $\text{[math]}$ where $\text{[math]}$ , $\text{[math]}$ and $\text{[math]}$ are any element of the group
Existence of Identity: there must exist an identity element $\text{[math]}$ such that $\text{[math]}$ ; that is, applying the binary operator to some element $\text{[math]}$ and the identity element $\text{[math]}$ leaves $\text{[math]}$ unchanged
Existence of Inverse: for each element $\text{[math]}$ , there must exist an inverse $\text{[math]}$ such that $\text{[math]}$

A group with commutative binary operator is known as Abelian.

Examples[edit]

the set of integers $\text{[math]}$ under addition, $\text{[math]}$ : here, zero is the identity, and the inverse of an element $\text{[math]}$ is $\text{[math]}$ .
the set of the positive rational numbers $\text{[math]}$ under multiplication, $\text{[math]}$ : $\text{[math]}$ is the identity, while the inverse of an element $\text{[math]}$ is $\text{[math]}$ .
for every $\text{[math]}$ there exists at least one group with n elements,e.g., $\text{[math]}$
the set of complex numbers {1, -1, i,-i} under multiplication, where i is the principal square root of -1, the basis of the imaginary numbers. This group is isomorphic to $\text{[math]}$ under mod addition.
the Klein four group consists of the set of formal symbols $\text{[math]}$ with the relations $\text{[math]}$ All elements of the Klein four group (except the identity 1) have order 2. The Klein four group is isomorphic to $\text{[math]}$ under mod addition.
the set of "moves" on a Rubik's cube, where a move is understood to be a finite sequence of twists: here, the identity move is to do nothing, while the inverse of a move is to do the move in reverse, thereby undoing it.
The Symmetric group
The general and special Linear groups.