Metamath Proof Explorer


Theorem omwordi

Description: Weak ordering property of ordinal multiplication. (Contributed by NM, 21-Dec-2004)

Ref Expression
Assertion omwordi A On B On C On A B C 𝑜 A C 𝑜 B

Proof

Step Hyp Ref Expression
1 omword A On B On C On C A B C 𝑜 A C 𝑜 B
2 1 biimpd A On B On C On C A B C 𝑜 A C 𝑜 B
3 2 ex A On B On C On C A B C 𝑜 A C 𝑜 B
4 eloni C On Ord C
5 ord0eln0 Ord C C C
6 5 necon2bbid Ord C C = ¬ C
7 4 6 syl C On C = ¬ C
8 7 3ad2ant3 A On B On C On C = ¬ C
9 ssid
10 om0r A On 𝑜 A =
11 10 adantr A On B On 𝑜 A =
12 om0r B On 𝑜 B =
13 12 adantl A On B On 𝑜 B =
14 11 13 sseq12d A On B On 𝑜 A 𝑜 B
15 9 14 mpbiri A On B On 𝑜 A 𝑜 B
16 oveq1 C = C 𝑜 A = 𝑜 A
17 oveq1 C = C 𝑜 B = 𝑜 B
18 16 17 sseq12d C = C 𝑜 A C 𝑜 B 𝑜 A 𝑜 B
19 15 18 syl5ibrcom A On B On C = C 𝑜 A C 𝑜 B
20 19 3adant3 A On B On C On C = C 𝑜 A C 𝑜 B
21 8 20 sylbird A On B On C On ¬ C C 𝑜 A C 𝑜 B
22 21 a1dd A On B On C On ¬ C A B C 𝑜 A C 𝑜 B
23 3 22 pm2.61d A On B On C On A B C 𝑜 A C 𝑜 B