How to prove the following identity
$$ \sum_{n=1}^{\infty} \frac{n^{n-1} e^{-n}}{n!} = 1$$
analytically (which can be confirmed with $Mathematica$)? The standard trick for geometrical series does not seem to work readily.
I'm learning C and I was creating a simple "Hello, World" program for learning. I was curious to see a VirusTotal analysis on the compiled program, but I was surprised when I discovered that the program was making a TCP connection to, what seems to be, a Microsoft server. Is this a false positive...
Make a mathematical expression
whose value is equal to 2 that
uses all the digits 0, 1, 2, ... 9
exactly once and uses as few other
mathematical symbols as possible.
I was generating artistic depictions of mathematical concepts by programming for fun, I made some pictures of Pythagorean Spiral, and I noticed this pattern if I only show perfect squares:
Pythagorean Spiral depicting perfect squares up to 256:
Perfect squares up to 512:
Perfect squares up to 1...
A prime $q$ such that $2q+1$ is also a prime is a Sophie Germain prime.
Cramer's conjecture tells gap between consecutive primes is bound by $O(\log^2p)$.
Is there a similar conjecture for Sophie Germain primes?
Make a mathematical expression
whose value is equal to 2 that
uses all the digits 0, 1, 2, ... 9
exactly once and uses as few other
mathematical symbols as possible.
I was generating artistic depictions of mathematical concepts by programming for fun, I made some pictures of Pythagorean Spiral, and I noticed this pattern if I only show perfect squares:
Pythagorean Spiral depicting perfect squares up to 256:
Perfect squares up to 512:
Perfect squares up to 1...
A prime $q$ such that $2q+1$ is also a prime is a Sophie Germain prime.
Cramer's conjecture tells gap between consecutive primes is bound by $O(\log^2p)$.
Is there a similar conjecture for Sophie Germain primes?
