Thanks Baker! Delicious bread! Appreciate the new graphics for DM's, and for the new crumb maps. Great work.
Ok, I'm looking at the u values. This is the base of 1Tu, correct? Have you noticed that the other side of the 1Tu is always u+1? If you draw the straight lines from the center square, for (x+n)=15 you always get Tu with base of 7 and side of 8. How can we connect this with n0 base estimation?
Boys Iโm high as shit right now. Loving this quest. My mind is fully engaged, and seeing gears like clocks. Triangles vs squares gives us our match in the (x+n) box.
#MEGA
Herb and ๐ท FYI.
Nice digits, and great post, lurker Anon!
>Future proves past. If this is what I think it is, and Chris was sent here by Q Team to share VQC formula with autists via the same socratic method Q is using to expose everything else to other anons, then a timely solve of VQC would be mission critical.
I agree. This is tied into Qโs objectives, and Chris mentioned that the impact of solving this has been taken into accountโฆ >>5481
Another cool advantage of this method is that we solve for the correct n and the correct x at the same time! That will save some calc time.
When there is no remainder, we know we have the correct n. Then we calc SQRT((x+n)^2) - n = x
For example (2,3,3) this is:
SQRT(121)- 3 = x = 8