Binnet's 2nd integral formula

Flammable math was first with this integral. He had so much passion then. Now he almost gone 😢.

Bro you literally breath integration. For me you're the person that has mastered it the most.

Hi,
"terribly sorry about that" : 2:06 , 2:40 , 4:06 , 5:51 , 6:36 , 8:07 , 8:57 , 12:45 , 15:24 ,
"ok, cool" : 2:16 , 2:53 , 3:23 , 5:14 , 6:10 .

Yo bro
U setted and built uped the previous integral im such a way that this integral solution development feels like a climax plot of a movie 😂

Thank you for reminding me of math I once knew. Still just as beautiful as the day I learned it.

I really enjoyed the wild ride and I'm happy for learning new things.

Fruitful result. Thank you

Beautiful result , i hope for more videos .

The result reminds me of the Stirling formula, an asymptotic series expansion for the Gamma function

Beautiful explanation ❤❤❤ can you pls take up more ramanujan like integrals and explain ❤❤❤❤

Nice!! This looks like the binet's formula for log gamma,cool way to derive it😊💯💯💯

Waiting for/looking forward to Binnet's 1st integral formula 🙂

The power of the laplace transform😵‍💫

Wow! This integral is pretty hard.

Why is 15:50 true?

I=(1/2π)Σ((-1)^n/(2πz)^2n)Γ(2n+1)ξ(2n+1)...mah

I don't understand what you say in the intro of the videos can you write it here 'my _______ folks'?

pretty!

Hai