From an unsolved position, it is faster to "solve" directly to the desired configuration; by following the steps below, the eager cubist may learn exactly what these configurations are. Of the words and phrases I use: I call the faces front, back, right, left, top, bottom. A face has 9 cubies, viz., 4 corner cubies, 4 edge cubies, and its center cubies. Separating 2 opposite faces, is a "center slice", being of 4 center cubies and 4 edge cubies. As I hold the cube, I call three center slices: floor-parallel, body-parallel, body-slicing. For instance, the body-parallel and body-slicing centerslices meet in the front face. I name "double-swap" the transform which is performed as follows: Double-swap (front, back) ;parameter-faces Turn body-slicing centerslice 180. Turn bottom face 180. Turn body-slicing centerslice 180. Turn bottom face 180. Observe well what it has done, viz. swapped the two cubies of the turned centerslice on the front with those of the back. You will use it as needed during the following shenanigans: ---------------------------------------------------------------------- To achieve Christman's (DPC at MIT-MC) Cross, the simpler of the two: Rotate the body-slicing centerslice 180. Rotate the floor-parallel centerslice 90 either way (your choice). Stare hard at what you have. The CORNER CUBIES and CENTER CUBIES are in their final position for the Crux Christmani; all further hacking will be simply to move the EDGE CUBIES, IN PAIRS, into place. To achieve ANY Crux Plummeri or Crux Christmani configuration, learn how to do the initial rotations (see below for the CP) so that you get the center cubies to corners you want, and hack from there. I will now describe the edge-cubie moves for the CC given that the centerslices have been aligned to orient the center cubies as needed: Among the six faces you now have, find one of the two that have a solid stripe between two sides of the same color, i.e., x y x x y x x y x and align it like so, so that the stripe is vertical, and this face is the front. Note that the edge cubies of the y y y stripe want to be exchanged with the two x-showing edge cubies, i.e., x x x y y y x x x (Remember that the goal is x y x/y y y/x y x) You can tell that they want to be inthe horiz. positions by their non-showing faces, which you will observe match the center-cubies on the right and left sides. To do this: 1. Perform doubleswap on front-back. 2. Rotate the FRONT so that when you do (3), the two cubies we just moved to the back will come to such place so that when we undo this step (see 4), they will be in the right place. This will be either 90 deg. left or right. 3. Perform doubleswap on front-back. 4. Undo step 2, i.e., turn FRONT 90 deg the "other" way. Whehter you blew (2) or not, you will now find you have (x x x/y y y/x x x) on front. If you understood 2 and DIDNT blow it, you will have the sides of the y y edge cubies matching the side centers (if you blew it, doubleswaps on the side faces can fix you up). You will see the floor-parallel centerslice begin to form a band. We will now finish that band. The two appropriate cubies (to go in the two rear positions of the floor-parallel centerslice are now on the front plane, the x x cubies of the last step. Note that a simple doubleswap on front-back would move them to the back face, but the WRONG two places on the back face. Easy. So, turn the back face 90 degrees and do the doubleswap, and unturn the back. Choose which 90 such that these two cubies wind up in the right place. You will now find you have solid bands and solid crosses galore. The front and back should have solid crosses, and the floor-parallel slice should now be a solid band. Look at the top of the cube. Make it the front. Orient it so that it is (a b a/c c c/a b a). Do a front-back doubleswap, and now look at the remaining face pair we havent been thinking about. Do the appropriate doubleswap on them to get solid crosses, and then you should have the Crux Christmani. Study well what you have: three pairs of alternated crosses. ---------------------------------------------------------------------- The Crux Plummeri (after DCP at MIT-MC who first came up with it, altho by solving-to) is exactly equal to doing the entire above transformation twice, at 90 degrees. The following, however, is a direct route from solved that is more intuitive. Take the cube, turn the body-slicing centerslice up 90 deg. Turn the floor-parallel centerslice 90 deg clockwise as seen from the top. Note well the configuration of corners versus centers; it is the final one. Note that you will have two triplets of trebly-interleaved colors: that is the characteristic of the CP. Look at the TOP or BOTTOM. Let's say the TOP. Make it the front. Orient it so that you see x y x x y x x y x Only the top or bottom look like this; this is what you have to remember to look for after aligning centers to taste. We're gonna rotate the y y y band into the horiz position. Do this exactly as for the CC above, producing (x x x/ y y y/x x x) Next goal is again to complete the solid band of the floor-parallel centerslice by doubleswapping front/back so that the x x edgecubies,w hich would complete that band, go to the back. Of course, we must temporarily rotate the back during this doubleswap, so that they go to the side positions ofthe back when swapped. Do so, completing the solid color-band of the floor-parallel slice. Now consider the top and bottom. You note that exactly one appropriate doubleswap between top and bottom would give us solid crosses on both. Do it. Take what had been the top just now, and call that the front. Note that there are solid crosses on front and back, and the body-parallel plane is correct and complete. Think about the front: it looks like a b a b b b a b a Although it looks right fromt the front, the two vertical b-edge cubies want to be the two horizontal b-edge cubies, as a cursory inspectionof the top bottom and sides of the cube will show. This is true of the back, as well. Tofix up the FRONT do this: 1. Doubleswap front/back 2. Rotate the FRONT (temporarily) 90 degrees sothat the two vertical b-edge cubies are gonna come to the right place, 3. And doubleswap front/back 4. Undo 2. 5. Doubleswap front/back. Now you see all is right save the back. It wants the same thing done to it. Do it for it; Do this same thing just doNe in the last 5 steps for the back (viewing it as the temporary front). It is done. Consider it. An exquisite variant ont he CP is obtained by taking on of the trebly-bound sides and rotating the centers via the well-known center-cubie rotating algorithm. As the centers are rotated left or right, either a sextuple checkerboard or a stunning triply-rotated canon of centers , edges, and corners appears. The checkerboard is amusing insofar as it appears to a novice cubist to be the Pons Asinorum 6tuple checkerboard made by 6 twists (described earlier today), but cannot be fixed (solved, or produced) without the consummate hair of the CP that only true cubemeisters can execute. The application of the Pons Asinorum checkerboard transform to the CP (as well as the CC) produces interesting and suprising results. ---------------------------------------------------------------------- The Higher Crosses are fascinating insofar as they appear to be very simple edge-cube hacks, but are in fact quite "far" from home; the CP being exactly twice as "hairy" (far) as the CC (discovered by ALAN) is in itself a source of wonderment.