CxLL H U
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H U
This is the double Sune case. You can solve it using Sune, Antisune, mirrors also from the B, R an L sides or do y, y', y2 and all of them does diffrent edge permutations (all possible U PLLs). You can solve 8:12 H U ZBLL cases from the use of only doblesunes (the rest are 2*Z H and solved edge permutation). Recognition is: place all corners using AUF, then if one edge is permuted it is one of the 8 Sunes. If you do COLL you can easily learn these ZB's from experiments with Sune and Antisune, no extra algorithms are needed.
As for all H cases you only look at the four stickers in the U-face. In this case there are two bars perpendicular to the corners pointing in two opposite directions. The bars has got opposite colours but even if the cube has got the same colours on the two sides it is possible to recognise the case from the fact that no other cases has got bars perpendicular to the corners. The inverse case H D looks wrey much the same but there the bars are parallel to the corners. |
COLL
- (y) R U R' U R U' R' U R U2 R' ... double Sune
CLL
- ...
CMLL
- F2 U2 F M U2 M F M2 F ... well, it's short
CF / 2x2x2 (Waterman)
- R2 U2 R U2 R2
EG
EG 2 --> 2x2x2
EG 1
- ...
EG 0
- (y x) R2 U R2 (U D) R2 U' R2 (x)
CxLL edit |
U |
D |
R |
L |
F |
B |
U |
U U |
U D |
U R |
U L |
U F |
U B |
T |
T U |
T D |
T R |
T L |
T F |
T B |
L |
L U |
L D |
L R |
L L |
L F |
L B |
S |
S U |
S D |
S R |
S L |
S F |
S B |
-S |
-S U |
-S D |
-S R |
-S L |
-S F |
-S B |
Pi |
Pi U |
Pi D |
Pi R |
Pi L |
Pi F |
Pi B |
H |
H U |
H D |
H R |
H L |
H F |
H B |
Hyper CLL edit |
U |
D |
R |
L |
F |
B |
U |
U U |
U D |
U R |
U L |
U F |
U B |
T |
T U |
T D |
T R |
T L |
T F |
T B |
L |
L U |
L D |
L R |
L L |
L F |
L B |
S |
S U |
S D |
S R |
S L |
S F |
S B |
-S |
-S U |
-S D |
-S R |
-S L |
-S F |
-S B |
Pi |
Pi U |
Pi D |
Pi R |
Pi L |
Pi F |
Pi B |
H |
H U |
H D |
H R |
H L |
H F |
H B |