3.14159265358979323846264338327950288

 3.14159265 3+5= (8++-- 9 7)  9=3^  (2)  ^3 = 8  
 4-6= (-2)  + 6 = ((4--)  3)==3 8= 3mirror^2    7950 288


the numbers in parenthesis indicate that they are transitionals
used in two expressions

i assume that anyone can work their way to just knowing
3.14159265 by heart, so it is like the foundation to the whole thing.

from here on out, we just consider simple operations based on
the inherent 'relationships' lurking within pi and just waiting
to be found. this is how i see them:

3 + 5  begins the sequence, the 5 is cued from the tail 5 of 3.14159265
so if you can remember the 3, the 5 is almost given to you. 
ok, 3 + 5 = 8, either use the 3 and 5 to help you remember the 8
or just remember the equality itself. so the idea of the parenthesis
is that we are going to let 8 be the basis of the next relationship,
which admittedly looks weird. 

(8++-- 9 7)  is just saying 'ok, we have this 8, from 3+5=8,
and let's just increment it and then decrement it, to get
9 and 7.  thats all that mess is sposed to mean... 

9=3^  (2)  ^3 = 8  is just saying '9=3^2' and '2^3=8'  the idea
here being to just let the 2 ride along in both, kind of like
a mirror as i envision it.


 4-6= (-2)  + 6 = ((4--)  3)==3 
 this is just saying '4-6= -2' and '-2 +6 = 4' and 'decrementing 4 is 3'
 and '3 = 3' the idea of just letting it ride coming into play.
 and really, my parenthesis are rather sparse, and maybe misleading.



 8= 3mirror^2     all this is saying is '8 = 2^3' but um
 the way i envision it is that its written backwards, or rather,
 what is being seen is a mirror image and so i just reverse it

 7950 288   well this is so easy to remember i dont even have
 a method for it. it looks like a phone number too vaguely.
 one reason its easy to remember this is the story about 
 hmm that guy who spent all those years computing pi and when
 he died they put '288' on his tombstone because of this.
 i guess i never went beyond here cause i felt like if thats
 as far as he got, thats good enough for me too. 

some people say my method is much worse than simply remembering
the digits cause you have to remember all my crazy operators and
stuff. i think if a person can just envision the 'mathematical
relationships' going on, its easy...