![]() If we can do so, the corners will be in their correct positions (swap + swap back = nothing), but will be somehow twisted.These guides were made for the person that is trying to memorize new algorithms and wants a hard copy of the algs to carry around. Swap two corners using the corner sequence and swap them back from a different angle using the same corner sequence. Let us try the same idea in this step using our corner sequence: While everything solved before remains solved. The idea behind the corner sequence was to do some change and redo it in a different way, so the other parts of the cube became changed (Just reminding you that in this step, we want to twist corners and NOT move them, because they are already positioned in` the previous step.) We can twist (two) corners using the previous corner sequence, however, it also moves corners which is not good for this step. Let us try to follow this way even for twisting the corners. That is explained in the previous text, thus there is no magic here up to this point. Now we are able to position the top corners using one (quite simple) corner sequence If two (diagonally) opposite corners can be correctly positioned by turning the top face then perform a swap of any two top corners and you will obtain the previous situation.If two adjacent corners can be correctly positioned by turning the top face then only one swap of the other two corners is necessary (make sure that you turn the cube so that these two corners are in top-right positions when applying the sequence).All corners are in their positions (althought probably twisted) - this step is finished.You can always get one of the following cases when turning the top layer to place the corners: You just need to turn the top-layer and/or the whole cube (keeping top layer facing up) to a position where swapping these two top-right corners will place at least one corner to a correct position. (use the colors of side stickers of bottom corners to find the right ones).Īs you can notice the corner sequence swaps the top-right-front and top-right-back corners. Thus our task is quite simple: apply the corner sequence (possibly more times) to place the corners to their correct positions In this step, we will only position the corners to their correct positions while ignoring the way how they are twisted. We can solve the top corners just by this one sequence! If we select carefully how to turn the whole cube before applying this corner sequence to affect the right corners, Two corners are twisted (orange-blue-yellow and red-blue-yellow) and two are swapped (top-right ones). If you look at the result you may notice that the top corners changed. Remove corner, position the top layer, and restore corner ) in the pictures instead, just the white sticker should be really white. The orange and green colors are just example, there can be other color combinations (like blue-red, green-red. Pay attention to align colors of the corners on sides, since if they do not match as well, the corners are not in correct places. When searching for the next corner to solve, you may freely turn the top layer to put the corners into the position in which you can apply the sequence. Now look for other corners with white sticker and put them to the bottom layer using the right one of the following sequences. You have solved one of 4 corners this way. Select one corner with white sticker and turn the whole cube so the white sticker of this corner is facing down. This step can be solved intuitively if you invest some of your time. You may try to complete this step on your own and look at the provided sequences only if stuck and frustrated for some time. We will start by solving four corners of the cube that share one color (in this case we will select white color). Solving Corners Solve Four Bottom Corners Of course, every single brain works in a bit different way, so what may be an advantage for one may be a disadvantage for others.įor an introduction to the notation used in this page, go to the cube concepts page. You can scale up the method incrementally to gain speed and efficiency.You can achieve very good times just by practice using the very basic method.It is quite efficient with respect to its simplicity. ![]() ![]() You do not break what you solved in previous steps as much (easier recovery from mistakes).Higher "symmetry" of solution (you solve cube evenly).Smaller amount of unintuitive sequences (nowadays often computer-generated).This method is an alternative with many advantages. You might have met other solution method, particularly the most common vanilla "layer by layer" method. Solve all twelve edges (and centers) while keeping the corners solved.
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