A group is an algebra \(\langle G; *, \widehat{\ \ }, e \rangle\) satisfying three axioms: G1 (associativity), G2 (neutral element), and G3 (inverse elements).
Note 1: ETH::DiskMat
Deck: ETH::DiskMat
Note Type: Horvath Cloze
GUID:
modified
Note Type: Horvath Cloze
GUID:
Ma#P3o/Xx{
Before
Front
Back
A group is an algebra \(\langle G; *, \widehat{\ \ }, e \rangle\) satisfying three axioms: G1 (associativity), G2 (neutral element), and G3 (inverse elements).
After
Front
A group is an algebra \(\langle G; *, \widehat{\ \ }, e \rangle\) satisfying three axioms: G1 (associativity), G2 (neutral element), and G3 (inverse elements).
Back
A group is an algebra \(\langle G; *, \widehat{\ \ }, e \rangle\) satisfying three axioms: G1 (associativity), G2 (neutral element), and G3 (inverse elements).
Field-by-field Comparison
| Field | Before | After |
|---|---|---|
| Text | <p>A {{c1::group}} is an algebra \(\langle G; *, \widehat{\ \ }, e \rangle\) satisfying |
<p>A {{c1::group}} is an algebra \(\langle G; *, \widehat{\ \ }, e \rangle\) satisfying three axioms: {{c3::G1 (associativity)}}, {{c4::G2 (neutral element)}}, and {{c5::G3 (inverse elements)}}.</p> |