Competent mathematicians just use 22/7 as a simple and accurate alternative.
Daily reminder that the Pi vs Tau debate is for brainlets
Jayden Morgan
Nolan Sanders
competent mathematicians just leave pi in the answer, brainlet
Brayden Barnes
Daily reminder that [math]\pi := 3.4[/math]
Carter Barnes
kek everyone knows that pi=e anyway
Thomas Gutierrez
pi = -e + 2e actually
Adam Morales
I agree with the original assertion. The debate is most certainly for pedantic brainlets.
Ryan Thomas
Brainlets, everyone knows that e+pi=i+1+0
Anthony Barnes
>22/7
Amazing! you only have to remember 3 digits and you get 3.1428.., and since pi is 3.1415... you get an accuracy of 3 digits!
seriously, why don't you just remember 3.14 if you want to use numbers?
Jayden Foster
I use
3
7
15
and 1
I get 7 digits correct (3,141592)
Brayden Nguyen
best answer so far
OP = faggot
Angel Myers
WHAT. Are you an idoit.
Michael Murphy
>competent mathematician
>actually using numbers
Brainlet pretending to not be a brainlet detected
Hudson Young
>using decimals instead of rationals
son this isn't an accounting board
John Clark
I love when I tell people that many mathematicians don't use numbers, and they go, "Ugh, I hate using letters! They're even more confusing." What a time to be alive.
Adam Ortiz
>not just using whatever is appropriate for your circumstances
Elijah Nguyen
how do you do that?
Logan Turner
>retards everywhere
Pie = delicious and nothing else
Carson Campbell
Its obviosly the continued fractions of pi
Luis Roberts
>using rationals instead of decimals
Do you like cutting pies?
Luke Sullivan
thx you seem to be knowledgable
what is the most rapid algorithm/formula, that yields the largest number of correct digits in the less number of steps? (with the smallest information needed of course, dont tell me that 3141592 divided by 1000000 gives 7 digits in 1 step)
Hudson Ross
>what is the most rapid algorithm/formula
this is not known
Bentley James
it must be known. as of today, among the existing/known material, which one is the fastest? this question definitely has an answer, as a finite set has a lower bound.
Jonathan Rogers
I don't know.
The matrix [[0, 4],[1,0]] times the matrix product [[2n-1, n^2],[1, 0]] from n=1 to infinity will give you pi as a limit, in the sense that if you truncate this infinite product at any point, the first column of the resulting matrix will have terms which represent a rational convergent of pi.
Since matrix multiplication is associative, you can fold up this infinite product as many times as you like to obtain a better and better approximation to pi in fewer multiplications, though the terms of the matrix become more complicated as a function of the index.
Since continued fraction convergents represent the best possible rational approximation (in the size of the denominator) you can test the limits of your patience with this quite easily.
Tyler Robinson
well, continued fractions are the most efficient way to write any real number
Charles Wilson
3.14 is a rational number
Caleb Garcia
you /bros confirm that continued fraction is efficient. thanks.
efficient algorithms that work on the drawing of lines work with continued fraction. christoffel algorithm is one of them.
amazing that continued fractions are not taught in school.
John White
>QM
>I write 7h/44 for reduced planck
>professor doesn't think it's funny
>spanked and sent to bed without dinner
Carter Parker
what a beautuful formulae, all five magic numbers in one beautifil equation
Zachary Mitchell
> Pi vs Tau debate
there is no "debate" except
in your retarded imagination
Alexander Garcia
Ikr i fking love science :D
Connor Allen
Nice b8, m8