More likeable as a series representation.pic.twitter.com/XJH8g9uGSc
You can add location information to your Tweets, such as your city or precise location, from the web and via third-party applications. You always have the option to delete your Tweet location history. Learn more
not sure this is more likeable
Too many ways to describe Golden Ratio (𝜙) in integrals. Here is one relation as an identity derived from the Rogers-Ramanujan continued fractionpic.twitter.com/vtghSur4Vr
I don't know if this is a joke but I'm pretty sure that it's wrong xD
The number five seems to be the common thread
@elonmusk
When my daughter (at age 10 yrs old), was visiting orthodontist, needing crowns on her isosceles shaped canines, she was asked what shape she would like them to be.
"Dodecahedrons!" was her immediate reply.
Golden ratio smile
pic.twitter.com/Ek5WydWcac
The trick is the change of variable y = 2π log x after which the integral of exp(y/10)/(1+exp(y)) from -∞ to +∞ is a classic application of the theorem of residues… Eventually it boils down to the relation between the Golden Ratio and sin(π/10)!
Twitter may be over capacity or experiencing a momentary hiccup. Try again or visit Twitter Status for more information.