| Can you find a pattern in this sequence? Or is it two | | | | original sequence starting at the tip of the pyramid |
| patterns running together as one? Or is it a multiple | | | | from right to left until I ran out of numbers. Then I |
| set of patterns, which is simple in nature and moves | | | | re-adjusted the number of lines to fit my given |
| to the more complex as the equation moves | | | | numbers due to the number of intersections. Then I |
| forward? Hard to say, but let us explore this number | | | | simple used each distance between each number as |
| shall we?Lets create a pattern rather than trying to | | | | the forward calculations for the next number. No big |
| find one and here is the sequence I came up with | | | | deal. Then I noticed that if you put the numbers in |
| which carries this set of numbers out a ways. Here it | | | | sequence on a line and run sines and cosines over |
| is;4 8 15 16 23 42, 32, 39, 65, 139, 64, 71, 104, 204, | | | | them you get the same answers as long as you use |
| 443, 128, 135, 175This was accomplished by drawing | | | | the same forward calculation numbers.Anyway, that |
| a pyramid [linear] on a piece of paper, then drawing | | | | is the pattern I created and it works for me. 4 of |
| five lines parallel to the base. Where each line | | | | the numbers in this sequence I created are [+,-] |
| touched a side I drew a downward perpendicular line | | | | because you cannot know the answers, but my |
| to them. This created a grid inside the pyramid with | | | | guess is close and perhaps the real question it the |
| additional intersections and thus each of the new | | | | relationship of the unknown to the known. Consider |
| intersections received one of the numbers of the | | | | such patterns in 2006. |