FLFL Method
From Speedsolving.com Wiki
The FLFL method is a 3x3x3 method where 3 corners in the first layer and all edges are oriented and permuted (F2L-1CE and LFE) without the use of algorithms. Once the final first-layer corner is solved (while preserving the edges) through the use of FLLC, then the puzzle is in a state where it can put into a solved state using an L4C algorithm.
Inspired by Ryan Heise's Method and Bernd Bruegmann's Y-Move Method.
Steps
- F2L-1CE: First Two Layers minus One Corner-Edge Pair (No algorithms required). The approach used to complete this step does not matter.
- L5E: Last Five Edges. The objective is to solve all of the remaining edges (No algorithms required)
- FLLC: First Layer; Last Corner. The objective is to solve the last corner in the first/down layer while preserving the edges solved during LFE.
- L4C: Last Four Corners.
See also
External Links
FLFL 3rd Edition (PDF File)
FLFL 2nd Edition (PDF file)
Heise Variant FLFL (PDF file)