JTLE

A system for orienting last layer corners while simultaneously placing the final DR edge. It is used in conjunction with methods which preorient LL edges (such as ZZ or Petrus).
JTLE solve procedure
Step 1: 2x2x2 block
The first step is exactly the same as the first step of normal Petrus.
Step 2: Expand to 2x2x3
The second step is exactly the same as the second step of normal Petrus.
Step 3: EO
The third step is exactly the same as the third step of normal Petrus.
Step 4: PseudoF2L
Solve the F2L without the DF edge piece.
Step 5: Edge and orient Last Layer Corners (ELLC, for short)
This step inserts the missing cross piece(Solving DR)and orients the LL corners. There are only 27 algorithms for this step; they are listed below.
Step 6: PLL
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Step 1: EOLine
In this step the solver will orient all edges(For more information on edge orientation please click here.) and solve the DF and DB.
Step 2: PseudoF2L
The solver will solve F2L using only R, U , and L moves. This is exactly the same as ZZ. Remember, that the DR edge is not permanent; so you can save moves by placing another OD (opposite of D) edge in the DR spot.
Step 3: Edge and orient Last Layer Corners (ELLC, for short)
This step inserts the missing cross piece(Solving DR)and orients the LL corners. There are only 27 algorithms for this step; they are listed below.
Step 4: PLL
Example Solve
scramble (F2L on D): U2 L2 D2 B' D2 R2 F U2 B2 U2 B' R F R' D' B' R' D' L U2
Pseudo xcross: B L R U2 R' U2 R2 y' (7)
2x2x3: R U' R' U' L' U' L (7)
Last 2 slots: U' R2 U' R2 U2 R U2 R2 (8)
Pseudo ELLC: U' R U2 R2 U' R' U' R2 U2 R (10)
Finish F2L and EOLL: D M U M' D' (5)
PLL: N perm
Total: 37 moves to PLL
See also
External links
 JTLE algs
 Speedsolving.com: JTLE  does it have potential?