The Birthday Paradox

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How many people need to be in a room before there’s a 50% chance that two of them share the same birthday? Is it about 180, since that’s around half of 365? Is it only 100? The real answer is surprisingly much, much smaller. • If you have just 23 people in a room, the odds of whether two get presents on the same day is a coin flip. Get 50 people together and that shared-birthday probability skyrockets to 97%. A handful more and it’s a virtual statistical certainty. • Really? Yes, really! With the aid of tiny plastic babies and some mathematics, Kevin proves and visualizes this surprising veridical paradox. • *** LINKS *** • Birthday Attack Example In Hacking •    • 359 Example of a Birthday Attack   • Birthday Attack Hash Collision •    • Video   • Hashing Algorithms And Security - Computerphile •    • Hashing Algorithms and Security - Com...   • Discussion On The Birthday Attack •    • Discussion on The Birthday Attack   • The Birthday Attack • https://danielmiessler.com/study/birt... • *********** • Vsauce2 Links • Twitter:   / vsaucetwo   • Facebook:   / vsaucetwo   • Hosted, Produced, And Edited by Kevin Lieber • Instagram:   / kevlieber   • Twitter:   / kevinlieber   • Website: http://kevinlieber.com • Research And Writing by Matthew Tabor •   / matthewktabor   • Huge Thanks To Paula Lieber • https://www.etsy.com/shop/Craftality • Get Vsauce's favorite science and math toys delivered to your door! • https://www.curiositybox.com/ • Select Music By Jake Chudnow:    / jakechudnow   • MY PODCAST -- THE CREATE UNKNOWN •    / thecreateunknown  

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