Difference between revisions of "Ribbon Method"
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(Created page with "{{Method Infobox |name=Ribbon |image=File:Ribbon Cover Image.PNG |proposers=Justin Taylor |year=2017 |anames=Alpha, RFTT |steps=4 |moves=40 With Blockbuilding, 48 With CFO...") |
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{{Method Infobox | {{Method Infobox | ||
|name=Ribbon | |name=Ribbon | ||
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|proposers=Justin Taylor | |proposers=Justin Taylor | ||
|year=2017 | |year=2017 | ||
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− | The '''Ribbon Method''' is a speedsolving method created by Justin Taylor in 2017. The method was created as a Two-Look solution for the Last Slot and Last Layer without preorienting edges and maintaining a manageable algorithm count. | + | The '''Ribbon Method''' is a speedsolving method created by Justin Taylor in 2017. The method was created as a Two-Look solution for the Last Slot and Last Layer without preorienting edges and maintaining a manageable algorithm count. This allows great versatility in approach for the [[F2L]], along with a smooth transition into LSLL. The method retains every ergonomic advantage of CFOP, while containing one fewer "look" in the solve and saving an average of 6 moves with a CFOP-like approach to F2L. Ribbon can either be used as a standalone method, or in conjunction with other CFOP subsets whenever an edge solves itself during F2L. |
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+ | ==The Steps== | ||
+ | * '''Ribbon:''' This is the most distinctive part of the Ribbon Method. |
Revision as of 18:46, 22 July 2017
The Ribbon Method is a speedsolving method created by Justin Taylor in 2017. The method was created as a Two-Look solution for the Last Slot and Last Layer without preorienting edges and maintaining a manageable algorithm count. This allows great versatility in approach for the F2L, along with a smooth transition into LSLL. The method retains every ergonomic advantage of CFOP, while containing one fewer "look" in the solve and saving an average of 6 moves with a CFOP-like approach to F2L. Ribbon can either be used as a standalone method, or in conjunction with other CFOP subsets whenever an edge solves itself during F2L.
The Steps
- Ribbon: This is the most distinctive part of the Ribbon Method.