New posts in transcendental-numbers

Proving that $\pi=\sum\limits_{k=0}^{\infty}(-1)^{k}\left(\frac{2^{2k+1}+(-1)^{k}}{(4k+1)2^{4k}}+ \frac{2^{2k+2}+(-1)^{k+1}}{(4k+3)2^{4k+2}}\right)$

How was the difference of the Fransén–Robinson constant and Euler's number found?

Does $\sin(x)=y$ have a solution in $\mathbb{Q}$ beside $x=y=0$

Prove that $\pi$ is a transcendental number

Proof that $e^x$ is a transcendental function of $x$?

Simplest proof that some number is transcendental?

Why is it so hard to prove a number is transcendental?

Between any two real numbers, there is an algebraic number and also a transcendental number

How to convert $\pi$ to base 16?

Why is an irrational number's algebraic complexity the opposite of its Diophantine complexity?

Is $0.248163264128…$ a transcendental number?

On the behavior of transcendental functions

Are there more transcendental numbers or irrational numbers that are not transcendental?

Is the positive root of the equation $x^{x^x}=2$, $x=1.47668433...$ a transcendental number?

Do all integer-sided right-angle triangles, such as the 3-4-5, have two angles which are not fractions of a circle? [duplicate]

Uncountable set of irrational numbers closed under addition and multiplication?

Is $\sin(e)$ rational or irrational?

Are all transcendental numbers a zero of a power series?

Proving that $\frac{\pi}{4}$$=1-\frac{\eta(1)}{2}+\frac{\eta(2)}{4}-\frac{\eta(3)}{8}+\cdots$

e is irrational