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Database
BASIC ALGEBRAIC STRUCTURES
Rings
Unital rings
ringgrp
Next ⟩
ringmgp
Metamath Proof Explorer
Ascii
Unicode
Theorem
ringgrp
Description:
A ring is a group.
(Contributed by
NM
, 15-Sep-2011)
Ref
Expression
Assertion
ringgrp
⊢
R
∈
Ring
→
R
∈
Grp
Proof
Step
Hyp
Ref
Expression
1
eqid
⊢
Base
R
=
Base
R
2
eqid
⊢
mulGrp
R
=
mulGrp
R
3
eqid
⊢
+
R
=
+
R
4
eqid
⊢
⋅
R
=
⋅
R
5
1
2
3
4
isring
⊢
R
∈
Ring
↔
R
∈
Grp
∧
mulGrp
R
∈
Mnd
∧
∀
x
∈
Base
R
∀
y
∈
Base
R
∀
z
∈
Base
R
x
⋅
R
y
+
R
z
=
x
⋅
R
y
+
R
x
⋅
R
z
∧
x
+
R
y
⋅
R
z
=
x
⋅
R
z
+
R
y
⋅
R
z
6
5
simp1bi
⊢
R
∈
Ring
→
R
∈
Grp