New posts in continued-fractions

are these two continued fractions equivalent?

number-theory closed-form continued-fractions

Continued Fraction: Please prove $\frac{1}{e \gamma (x+1,1)}=x+\frac{1}{x+1+\frac{2}{x+2+\frac{3}{x+3+\frac{4}{\dots}}}}$

complex-analysis gamma-function continued-fractions

Link between the negative pell equation $x^2-dy^2=-1$ and a certain continued fraction

number-theory diophantine-equations continued-fractions pell-type-equations

optimality of 2 as a coefficient in a continued fraction theorem

number-theory continued-fractions

Continued Fraction [1,1,1,...]

number-theory elementary-number-theory continued-fractions golden-ratio

Summation Formula for Tangent/Secant Numbers

calculus trigonometry taylor-expansion generating-functions continued-fractions

Continued fractions paradox [duplicate]

continued-fractions fake-proofs

Continued Fraction using all Perfect Squares

abstract-algebra sequences-and-series number-theory arithmetic continued-fractions

Where did the negative answer come from in the continued fraction $1+\frac{1}{1+1/(1+\dots)}$?

calculus sequences-and-series limits continued-fractions

General Continued Fractions and Irrationality

irrational-numbers continued-fractions

355/113 and small odd cubes

pi continued-fractions diophantine-approximation

$\sqrt{3}$ represented as continued fraction

radicals continued-fractions

Continued fraction expansion related to exponential generating function

algorithms power-series special-functions continued-fractions bernoulli-numbers

Eigenvalues of a tridiagonal trigonometric matrix

linear-algebra matrices trigonometry numerical-methods continued-fractions

How to prove that $\frac{\pi}{2}=\left[1, 1, \tfrac{1}{2},\tfrac{1}{3},\tfrac{1}{4},\ldots\right]$?

continued-fractions

Are the unit partial quotients of $\pi, \log(2), \zeta(3) $ and other constants $all$ governed by $H=0.415\dots$?

real-analysis analytic-number-theory computational-mathematics continued-fractions constants

Continued fraction of $e^{-2\pi n}$

calculus continued-fractions

Newton's method for square roots 'jumps' through the continued fraction convergents

numerical-methods recurrence-relations continued-fractions newton-raphson

Continued fraction for some integrals by Ramanujan

integration definite-integrals continued-fractions

How to prove that $\sum_{k=1}^{\infty}\frac{k^{n+1}}{k!}=eB_{n+1}=1+\cfrac{2^n+\cfrac{3^n+\cfrac{4^n+\cfrac{\vdots}{4}}{3}}{2}}{1}$

sequences-and-series continued-fractions