If you see any blocks already formed for the first center or two, that will be very helpful, so try to preserve them. Again I pretty much solve the centers with my normal method (1x3 blocks, with the first block containing the fixed center) although it takes a bit longer to find the exact pieces I am looking for. In a 5x5, on the other hand, you have many different types of centers, and now the fixed center, although it cannot move, must be oriented along with the rest of them. So your centers should be solved and you can now start on the edges step. If you want to do a diagonal swap, on the other hand, the algorithm I currently use comes from the Square-1 and is as follows: If you want to swap Ufr and Ufl, you can use this A-perm-like algorithm: That should happen 5/6 of the time, but fortunately there are algorithms to fix this quickly. If you go to solve centers, you might notice that the last center doesn't automatically solve itself anymore. This can make recognition and setup easier. This probably doesn't require any explanation at all, although you might find it helpful to know that if you pair up the two yellow centers across a red-yellow 'edge', the other stickers will be paired across an orange-yellow 'edge' (since orange is the opposite of yellow). I always put 4x4 centers together by making two 1x2 blocks. In a 4x4, you only have x-centers, which have three colors in the standard Pochmann sticker design (which I really recommend, because just drawing arrows or cutting corners off the stickers makes it very hard to see what goes where). Thus, instead of just solving blocks of centers, you have to actually pay attention to what goes where. In a supercube, every center has to be solved into the correct spot - they're not interchangeable anymore. So if you're not a reduction user, then sorry, the only advice I can give you is to go practice :)Ĭenters are the only part that's really different about supercubes, although they are not the only part that you have to solve differently. Note that I'm going to describe the reduction method below, for a couple reasons: I think it's the fastest known way to do supercubes (and normal cubes for that matter), I'm most familiar with it, and you're probably most familiar with it. The following tips and tricks were all gotten through experience and practice. Although the 4x4 and 5x5 supercubes look much more difficult and impressive than the standard ones (even experienced bigcubers will wonder how you can find pieces so quickly!), they aren't much harder than the normal cubes: all they take is a slightly different method. To rotate one corner 120 degrees, use the following algorithm.This will keep all other pieces oriented. To rotate one center 180 degrees, use the following algorithm: 圆.Remember! There are 2 sets of 2 identically colored edges! Use this to your advantage (U-perms).Turn the top layer 45 degrees so you have it facing you just like a side on the Rubik's Cube. Think of the top layer as if it were the regular Rubik's Cube.Make sure that the edges are correctly oriented, and detemine if you have the bar case or the crooked bar case.Build this on 2 of the colors from your 2x2x2 block (red/blue/yellow in this case).Just reverse one of the edges with the following algorithm: R U2 R' U2 L U' L'. You may end up with it inversed, but it is not a parity. Place together one corner and edge, and then place the second edge and insert them into place.#2 - Build the corner and 2 outer edges of 2 colors Repeat the step above for the same corner 3 times (once for each edge).Now insert (using F2L,) the corner with one of the edges (yellow, red, or blue).To do this, first orient 3 centers in the proper direction (so you have yellow to blue, blue to red, red to yellow) on the 3 edges going clockwise.Here is a small step by step guide, based off of the Petrus Method, that may help you: 1.2 #2 - Build the corner and 2 outer edges of 2 colors.1.1 #1 - Make the cross on the first layer.
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