Metamath Proof Explorer

Theorem cphdir

Description: Distributive law for inner product (right-distributivity). Equation I3 of Ponnusamy p. 362. Complex version of ipdir . (Contributed by Mario Carneiro, 16-Oct-2015)

Ref Expression
Hypotheses cphipcj.h ,˙=𝑖W
cphipcj.v V=BaseW
cphdir.P +˙=+W
Assertion cphdir WCPreHilAVBVCVA+˙B,˙C=A,˙C+B,˙C

Proof

Step Hyp Ref Expression
1 cphipcj.h ,˙=𝑖W
2 cphipcj.v V=BaseW
3 cphdir.P +˙=+W
4 cphphl WCPreHilWPreHil
5 eqid ScalarW=ScalarW
6 eqid +ScalarW=+ScalarW
7 5 1 2 3 6 ipdir WPreHilAVBVCVA+˙B,˙C=A,˙C+ScalarWB,˙C
8 4 7 sylan WCPreHilAVBVCVA+˙B,˙C=A,˙C+ScalarWB,˙C
9 cphclm WCPreHilWCMod
10 5 clmadd WCMod+=+ScalarW
11 9 10 syl WCPreHil+=+ScalarW
12 11 adantr WCPreHilAVBVCV+=+ScalarW
13 12 oveqd WCPreHilAVBVCVA,˙C+B,˙C=A,˙C+ScalarWB,˙C
14 8 13 eqtr4d WCPreHilAVBVCVA+˙B,˙C=A,˙C+B,˙C