filmov
tv
Ring theory, prove that a non zero commutative ring with unity is a field if it has no proper ideal
Показать описание
#ring
#field
#ringsandfield
A non-zero commutative ring with unity is a field if it has no proper ideals. Thus, every non-zero element of R has a multiplicative inverse. Accordingly R is a field. The intersection of two ideals of a ring R is an ideal of R.
#field
#ringsandfield
A non-zero commutative ring with unity is a field if it has no proper ideals. Thus, every non-zero element of R has a multiplicative inverse. Accordingly R is a field. The intersection of two ideals of a ring R is an ideal of R.
0:08:50
0:13:11
0:10:00
0:14:30
0:11:18
0:10:22
0:38:33
0:03:28
0:20:47
0:14:19
0:16:00
0:20:33
0:00:36
0:12:21
0:13:50
0:00:23
0:00:44
0:18:02
0:16:15
0:18:46
0:07:18
0:11:04
0:09:30
0:00:42