Prove the identity between vectors A, B, C

Juan Lowe

Juan Lowe

Answered question

2022-11-14

Prove the identity between vectors A, B, C
2 ( A . B ) ( A . C ) = ( A . A ) ( B . C ) + A 2 . B C
A 2 is neither a dot or cross product

Answer & Explanation

mentest91k99

mentest91k99

Beginner2022-11-15Added 17 answers

It appears to me from the context like perhaps these A,B,C are two dimensional vector representations of complex numbers and that the dot product is the usual dot product while the other product occurring is the usual product of complex or real numbers... That is to say, if we have two vectors [ u , v ] and [ x , y ] we have [ u , v ] [ x , y ] = u x + v y and we have [ u , v ] [ x , y ] = [ u x v y , u y + v x ]
Indeed, if we have A = [ a r , a i ] , B = [ b r , b i ] , C = [ c r , c i ] on the LHS we would have:
2 ( A B ) ( A C ) = 2 ( a r b r + a i b i ) ( a r c r + a i c i ) = 2 a r 2 b r c r + 2 a r a i b r c i + 2 a r a i b i c r + 2 a i 2 b i c i
On the RHS we have:
( A A ) ( B C ) + A 2 B C = = ( a r 2 + a i 2 ) ( b r c r + b i c i ) + [ a r 2 a i 2 , 2 a r a i ] [ b r c r b i c i , b r c i + b i c r ]
= ( a r 2 + a i 2 ) ( b r c r + b i c i ) + ( a r 2 a i 2 ) ( b r c r b i c i ) + ( 2 a r a i ) ( b r c i + b i c r )
Noting some nice cancellations, this simplifies as:
2 a r 2 b r c r + 2 a i 2 b i c i + 2 a r a i b r c i + 2 a r a i b i c r same as before.

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