Difference between revisions of "LSE"
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The following two approaches are commonly used in [[Corners first]] methods.  The following two approaches are commonly used in [[Corners first]] methods.  
+  
'''Corners First Approach 1'''  '''Corners First Approach 1'''  
* 1. Solve UL or UR  * 1. Solve UL or UR  
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'''L5E'''  '''L5E'''  
−  1. Centers and BD  +  * 1. Centers and BD 
−  2. [[L5E]]  +  * 2. [[L5E]] 
[[Category:Methods]]  [[Category:Methods]] 
Revision as of 22:37, 22 April 2011

Last Six Edges (abbreviated LSE or L6E) is a possible last step in 3x3 speedsolving that solves the Mslice centers and edges (UF, UB, DF, DB) together with UL and UR edges. It is the last step of the Roux Method and the Ortega Method.
Possible Approaches
LSE can be solved in various ways. It should be noted, however, that Gilles Roux himself, the inventer of the Roux Method, advocates a flexible/semiintuitive approach to LSE without a division into substeps. The optimal approach is likely a combination of the approaches below.
LayersBased Approach
 1. centers, BD, and FD
 2. ELL
This layerbased approach seems out of place in any method ending with LSE.
Original Roux
 1. Orient centers and edges
 2. Permute UR and UL edges
 3. Permute the M slice
The following two approaches are commonly used in Corners first methods.
Corners First Approach 1
 1. Solve UL or UR
 2. Insert UL/UR while orienting the M slice
 3. Permute the M slice
Corners First Approach 2
 1. Solve both UL and UR
 2. Orient and permute the M slice
L5E
 1. Centers and BD
 2. L5E