Newbetuts

Are there any irrational/transcendental numbers for which the distribution of decimal digits is not uniform?

Multiplying by an irrational number in combinatorial problems

Irrationality of $\pi$ another proof

Sum of $\{n\sqrt{2}\}$

Irrationality of "primes coded in binary"

Process to show that $\sqrt 2+\sqrt[3] 3$ is irrational

Proving that $\sqrt{13+\sqrt{52}} - \sqrt{13}$ is irrational.

Infinite sequence of digits without consecutive repeating subsequenes

How to prove that the problem cannot be solved by the four Arithmetic Operations?

Questions about Spivak's proof that $\sqrt{2} + \sqrt[3]{2}$ is irrational

Normal Numbers as members of a larger set?

Sum of rational numbers

Prove that this number is irrational

Enough Dedekind cuts to define all irrationals?

Is there an explicit irrational number which is not known to be either algebraic or transcendental?

Is there an irrational number $a$ such that $a^a$ is rational?

New posts in irrational-numbers

Show that $\{1, \sqrt{2}, \sqrt{3}\}$ is linearly independent over $\mathbb{Q}$.

Is a non-repeating and non-terminating decimal always an irrational?

Rudin's proof on the Analytic Incompleteness of Rationals [duplicate]

Algorithms for approximating $\sqrt{2}$

Are there any irrational/transcendental numbers for which the distribution of decimal digits is not uniform?

Multiplying by an irrational number in combinatorial problems

Irrationality of $\pi$ another proof

Sum of $\{n\sqrt{2}\}$

Irrationality of "primes coded in binary"

Process to show that $\sqrt 2+\sqrt[3] 3$ is irrational

Proving that $\sqrt{13+\sqrt{52}} - \sqrt{13}$ is irrational.

Infinite sequence of digits without consecutive repeating subsequenes

How to prove that the problem cannot be solved by the four Arithmetic Operations?

Questions about Spivak's proof that $\sqrt{2} + \sqrt[3]{2}$ is irrational

Normal Numbers as members of a larger set?

Sum of rational numbers

Prove that this number is irrational

Enough Dedekind cuts to define all irrationals?

Is there an explicit irrational number which is not known to be either algebraic or transcendental?

Is there an irrational number $a$ such that $a^a$ is rational?