# Difference between revisions of "L5E"

 L5E [[Image:]] Information Proposer(s): Proposed: Alt Names: Last five edges Variants: Sexy*+S(8355)n SexyM Beginner, Commutators (pseudo EF) Subgroup: No. Algs: Unknown for 1 look, 5 for L5EO and 16 for L5EP Avg Moves: about 14 Purpose(s):

L5E, Last five edges, is an experimental method that solves five edges, the four in U and one in the D layer, preserving all other pieces.

ELL is a sub group of L5E, all ELL's may be solved in two steps using this method.

## Description

There are two main sub-parts. First the edges are oriented using M'UM like in Roux; there are 5 cases for this, and the worst case in Roux (6 edges) is impossible. Then the edges must be permuted; you can place FD during orientation or right after using [U] M' U2 M (named 'P') and end with EPLL, or just permute all five edges in one step.

L5E can be useful for Corners First if the E-slice, centres and three FL edges are solved after the corners. It is also useful in any method that starts with columns, such as one which does the F2L pairs first and then finishes with CMLL, it is an alternative to the last step of Roux if the centres are placed together with the BD edge at first, also for any LBL style, cross minus one edge at first and then the LL corners have been finished with CLL or CMLL or the same for Fridrich with 2-look OLL, corners first, then L5E orientation, place FD using P if it was not solved and end it all in PLL as usally.

## Intermediate system

### Intuitive

This style is not completely intuitive, because it is still necessary to know EPLL. First orient all unoriented edges, then place the FD edge to its correct position and finally end the solve in EPLL. The necessary intuitive steps are:

• P = M' U2 M
• O = M' U M
• O' = M' U' M

Using that plus some U turns you can solve any case, even all ELL case. For example, O U P = (M' U M) U (M' U2 M) is a sample algorithm which solves orientation, then places FD. There is a 1 in 12 chance that EPLL is skipped; otherwise there is one algorithm left.

There is another notation which can make it shorter to write algorithms:

• F(moves) = F2 (moves) F2

It is important here that the moves inside the parentheses keep the corners solved, so that they will still be correct after this algorithm. An example is the U-perm, F(U P U) = F2 (U M' U2 M U) F2. F(O U') is a nice way to solve orientation and place FD all at once if the FD edge is in the middle of three unoriented edges in LL.

### Using algorithms

The intuitive style lets you find and understand the orientation algorithms yourself. Another approach is to learn the algorithms instead of finding them; the cases are:

Basic orientations Intuitive solution (Possibly optimised) alg Comment O U2 O (M' U M) U2 (M' U M) Orients UL and UB. O U' O (M' U M) U' (M' U M) Orients UF and UB. P U2 O' (M' U2 M) U2 (M' U' M) Orients UR, UF, UL and UB O U O' (M' U M) U (M' U' M) Orients FD and UB O' (M' U' M) Orients FD, UR, UF and UL
All images show white on top (U) and green in front (F).

More algs are at the L5EOP page

Sometimes this will also solve the FD edge; the images show where the FD edge must be for the algorithm to solve it, but otherwise you should simply treat the yellow sticker as white. If you learn these positions, it can also be useful to learn the mirror algorithm for the case where FD is on the opposite side from the image. The easiest example is to use O' instead of O for the case with three flipped edges on U. Just like the intuitive step, if FD is not solved use P, and either way finish with EPLL.

L5EOP is an alternative to L5E, that always solves the FD edge while orienting ('P'lace). Then the last step will always be EPLL.

### FD placement + EPLL (L5EP)

Another possibility for improving the intermediate style is to permutate the last five edges in one step. This only requires 16 algorithms in total, so counting the 5 orientations creates a system that solves L5E in two short steps. Even if you know this, it is still useful to place FD without extra moves if possible, since EPLL recognition is very fast.

We will introduce the following function:

• f(moves) = f2 (moves) [U] f2 ... This is the same as the F() function above, but with double layer f turns. Note that sometimes the adjusting U turns are not mentioned.

Here are the algorithms for permutation of all 5 edges; make sure to use AUF to place the FD edge at the position it has in the image.

Double two cycle permutations Intuitive solution (Possibly optimised) alg Comment F(H-PLL) (y') R U2 R2 U2 R2 U2 R Swaps UF<->DF and UR<->UL F(Z-PLL) (y') r2 U' 2x(M E2) U r2 Swaps UR<->DF and UL<->UB F(Z-PLL') (y') r2 U 2x(M E2) U' r2 Swaps UL<->DF and UR<->UB H-PLL Ra U2 Ra' (y) Ra' U2 Ra Swaps UR<->UL and UF<->UB Z-PLL M2 U' 2x(M E2) U M2 Swaps UR<->UB and UL<->UF
3-cycle permutations P (M' U2 M) Cycles UF->DF->UB f(d' P) (y') r2 U' (M' U2 M) U' r2 Cycles UL->UB->DF f(d P) (y') r2 U (M U2 M') U r2 Cycles UR->UB->DF U-PLL F2 U (M' U2 M) U F2 Cycles UF->UL->UR U-PLL' F2 U' (M' U2 M) U' F2 Cycles UF->UR->UL
5-cycle permutations P U P (M' U2 M) U (M' U2 M) Cycles UF->UL->UR->DF->UB P U' P (M' U2 M) U' (M' U2 M) Cycles UF->UR->UL->DF->UB P Z-PLL 2x(M2 U) (M U2 M') Cycles UF->UR->UB->UL->FD P Z-PLL' 2x(M2 U') (M U2 M') Cycles UF->UL->UB->UR->DF P U-PLL (M' U2 M') U' (M' U2 M) U' M2 Cycles UF->DF->UB->UL->UR P U-PLL' (M' U2 M') U (M' U2 M) U M2 Cycles UF->DF->UB->UR->UL
These images have white on top (U) and green in front (F). Darker pieces change positions.