Same concept as above and again using Hi-Lo:

Generic = +3.01 (+3.0) 

A = -0.32 (-0.3) 

T = +0.13 (+0.1) 

Z = -0.13 (-0.1) 

L = +0.04 (0.0)


In 6D the difference between the correct index and the adjusted index is narrower than in 2D. I would say that it's insignificant.
Let's see: 

A,A v A = +2.38 (3.01 - 0.32 - 0.32 = +2.37) 

A,Z v A = +2.57 (3.01 - 0.32 - 0.13 = +2.56) 

A,L v A = +2.73 (3.01 - 0.32 + 0.04 = +2.73) 

T,T v A = +3.28 (3.01 + 0.13 + 0.13 = +3.27) 

T,A v A = +2.82 (3.01 + 0.13 - 0.32 = +2.82) 

T,Z v A = +3.01 (3.01 + 0.13 - 0.13 = +3.01) 

T,L v A = +3.18 (3.01 + 0.13 + 0.04 = +3.18) 

Z,Z v A = +2.76 (3.01 - 0.13 - 0.13 = +2.75) 

Z,L v A = +2.92 (3.01 - 0.13 + 0.04 = +2.92) 

L,L v A = +3.09 (3.01 + 0.04 + 0.04 = +3.09)


A,A,T,T v A = +2.62 (+2.63) 

T,5,9,6 v A = +3.09 (+3.05)


Very interesting study! Thanks Fuzzy Math.

Sincerely,
Cac