HomeHome Hilbert Space Explorer < Previous   Next >
Related theorems
Unicode version
Axiom ax-hvdistr1 8833
Description: Scalar multiplication distributive law
Assertion
Ref Expression
ax-hvdistr1 |- ((A e. CC /\ B e. H~ /\ C e. H~) -> (A .h (B +h C)) = ((A .h B) +h (A .h C)))
Detailed syntax breakdown of Axiom ax-hvdistr1
StepHypRef Expression
1 cA . . . 4 class A
2 cc 5220 . . . 4 class CC
31, 2wcel 958 . . 3 wff A e. CC
4 cB . . . 4 class B
5 chil 8743 . . . 4 class H~
64, 5wcel 958 . . 3 wff B e. H~
7 cC . . . 4 class C
87, 5wcel 958 . . 3 wff C e. H~
93, 6, 8w3a 775 . 2 wff (A e. CC /\ B e. H~ /\ C e. H~)
10 cva 8744 . . . . 5 class +h
114, 7, 10co 3961 . . . 4 class (B +h C)
12 csm 8745 . . . 4 class .h
131, 11, 12co 3961 . . 3 class (A .h (B +h C))
141, 4, 12co 3961 . . . 4 class (A .h B)
151, 7, 12co 3961 . . . 4 class (A .h C)
1614, 15, 10co 3961 . . 3 class ((A .h B) +h (A .h C))
1713, 16wceq 956 . 2 wff (A .h (B +h C)) = ((A .h B) +h (A .h C))
189, 17wi 3 1 wff ((A e. CC /\ B e. H~ /\ C e. H~) -> (A .h (B +h C)) = ((A .h B) +h (A .h C)))
Colors of variables: wff set class
This axiom is referenced by:  hvsub4t 8861  hvsubdistr1t 8871  hvdistr1 8873  hv2timest 8883  hilvc 8984  hhssnv 9089  shscl 9236  spanunsn 9457  hoadddit 9684  lnopm 9880  lnophs 9881
Copyright terms: Public domain