In a set 
equipped with a binary operation 
called a product, the multiplicative identity is an element
such that
 |
for all 
.
It can be, for example, the identity element of a multiplicative
group or the unit of a unit ring. In both cases
it is usually denoted 1. The number 1 is, in fact, the multiplicative identity of
the ring of integers 
and of its extension rings
such as the ring of Gaussian
integers ![Z[i]](/images/equations/MultiplicativeIdentity/Inline6.svg)
,
the field of rational numbers 
,
the field of real numbers 
,
and the field of complex
numbers 
.
The residue class 
of number 1 is the multiplicative identity of the quotient
ring 
of 
for all integers 
.
If 
is a commutative unit ring, the constant polynomial
1 is the multiplicative identity of every polynomial
ring ![R[x_1,...,x_n]](/images/equations/MultiplicativeIdentity/Inline15.svg)
.
In a Boolean algebra, if the operation 
is considered as a product, the multiplicative identity
is the universal bound 
. In the power set 
of a set 
, this is the total set 
.
The unique element of a trivial ring 
is simultaneously the additive
identity and multiplicative identity.
In a group of maps over a set 
(as, e.g., a transformation
group or a symmetric group), where the product
is the map composition, the multiplicative identity is the identity
map on 
.
In the set of 
matrices with entries in a unit
ring, the multiplicative identity (with respect to matrix
multiplication) is the identity matrix. This
is also the multiplicative identity of the general
linear group 
on a field 
, and of all its subgroups.
Not all multiplicative structures have a multiplicative identity. For example, the set of all 
matrices having determinant equal to zero is closed
under multiplication, but this set does not include the identity
matrix.
