for the original (currently used by Japan) color scheme of the rubiks cube: okay, first hold the cube so that yellow is on top (if it has yellow) with blue on the front. on the right should be orange, on the left red, on the bottom green, and on the back white. this color scheme is also currently used on the 2x2x2 rubiks brand cube. the difference between the current and original color scheme is that yellow and blue are switched, making red opposite orange, blue opposite white, and green opposite yellow.
this is for the American color scheme if you want to know what is currently used now. if you are holding it as described above then on the bottom should be white(or possibly black) red is on the right, green is on the back, and orange is on the left. something to help is that red is opposite of orange, blue is opposite of green, white is opposite of yellow, and if you look at th corner that has red white and blue, then in clockwise order around the corner is Red, White, then Blue.
hope that helped!!
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match up the like colors on on side.
Writing out the solution for the rubicks cube is very difficult. Check up the videos on youtube that will show you how.
no it is better to use jiggaloo ~rubix master
No. If they maintain their original size and combine, then it would not be a cube anymore.
there are actually six, the original 3x3 cube, the 30th anniversary wood cube, the ice cube(clear 2x2 cube), the plain 2x2 cube, the 4x4 cube, and last but not least the 5x5 cube.
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I thought this is a magic cube. I've yet to see one with an attached keyboard though.
The Rubik's Cube was invented in 1974 and was first patented in January 1975. The original name for the cube was the Magic Cube but was later renamed the Rubik's Cube in 1980.
The Big Cube - 1969 is rated/received certificates of: USA:PG USA:M (original rating)
If the height of a cube doubles and becomes a square prism instead of a cube, four of the six original equal area surfaces double in area, but the other two are unchanged. Therefore the area of the square prism is (2/3) X 2 = 4/3 as great as the original cube. If the original object is to remain a cube when its height doubles, all the other dimensions must also double; in that instance, the area increases by a factor of four.