SATOSHI • NOSTR • AI CLAW • LINUX • ₿2B • OSINT | HODLER ∞/21M
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SATOSHI • NOSTR • AI CLAW • LINUX • ₿2B • OSINT | HODLER ∞/21M
1.07K subscribers
SATOSHI • NOSTR • AI CLAW • LINUX • ₿2B • OSINT | HODLER ∞/21M
#Math
#Number_systems
#Number_theory
source
John D. Cook | Applied Mathematics Consulting
Golden ratio base
numbers
Positional
number
systems typically have a integer base, but irrational and even complex bases are possible. The golden ratio was the first irrational base.
SATOSHI • NOSTR • AI CLAW • LINUX • ₿2B • OSINT | HODLER ∞/21M
#Math
#Number_theory
source
John D. Cook | Applied Mathematics Consulting
Golden powers revisited
Powers of the golden ratio are nearly integers. This post explains why. Also, these integers are the sum of two Fibonacci
numbers
.
SATOSHI • NOSTR • AI CLAW • LINUX • ₿2B • OSINT | HODLER ∞/21M
#Math
#Number_theory
source
John D. Cook | Applied Mathematics Consulting
Multiples and powers mod 1
For any x, the behavior of multiples of x mod 1 is easy to classify. The powers of x mod 1 are more interesting. We give examples of different behavior.
SATOSHI • NOSTR • AI CLAW • LINUX • ₿2B • OSINT | HODLER ∞/21M
#Math
#Mathematica
#Number_theory
source
John D. Cook | Applied Mathematics Consulting
Powers of 3 + √2
How to calculate large powers of 3 + √2 numerically with bc and symbolically with Mathematica. Conjecture regarding the integer and irrational parts.
SATOSHI • NOSTR • AI CLAW • LINUX • ₿2B • OSINT | HODLER ∞/21M
#Math
#Number_theory
source
John D. Cook | Applied Mathematics Consulting
Moessner’s Magic
Moessner's Magic is a generalization of an ancient theorem that wasn't discovered until 1951.
SATOSHI • NOSTR • AI CLAW • LINUX • ₿2B • OSINT | HODLER ∞/21M
#Math
#Geometry
#Number_theory
source
John D. Cook | Applied Mathematics Consulting
Primitive Pythagorean triangles with the same area
You can find three primitive Pythagorean triangles with the same area, but what about four?
SATOSHI • NOSTR • AI CLAW • LINUX • ₿2B • OSINT | HODLER ∞/21M
#Math
#Mathematica
#Number_theory
#SymPy
source
John D. Cook | Applied Mathematics Consulting
Time to factor big integers Python and Mathematica
Testing the time to factor big integers in Python with SymPy compared to Matheamtica
SATOSHI • NOSTR • AI CLAW • LINUX • ₿2B • OSINT | HODLER ∞/21M
#Math
#Memory
#Number_theory
source
John D. Cook | Applied Mathematics Consulting
Prime
numbers
that are easy to remember
Memorable prime
numbers
with various
numbers
of digits. For example, if you need a five-digit prime, you could say 18181.
SATOSHI • NOSTR • AI CLAW • LINUX • ₿2B • OSINT | HODLER ∞/21M
#Math
#Number_theory
source
John D. Cook | Applied Mathematics Consulting
American Flag Prime
A prime
number
that looks like a blackand-white image of an American flag when written in a block.
SATOSHI • NOSTR • AI CLAW • LINUX • ₿2B • OSINT | HODLER ∞/21M
#Math
#Number_theory
source
John D. Cook | Applied Mathematics Consulting
Factoring Stencils
An ingenious device for factoring integers from the days before computers. A set of around 300 stencils could factor 9-digit
numbers
.