What is the row of Pascal’s triangle containing the binomial coefficients (nk),0≤k≤9?

Reeves

Reeves

Answered question

2020-11-14

What is the row of Pascal’s triangle containing the binomial coefficients (nk),0k9?

Answer & Explanation

FieniChoonin

FieniChoonin

Skilled2020-11-15Added 102 answers

I've been considering entry i in row n of Pascal's Triangle's Triangle, so for Uin, we have
(ni)=n!i!(ni)!
The row of (n k) are the binomial coefficients (n k) evaluated at
k=0,1,2,3,4,5,6,7,8,9
(n0)=n!0!(n0)!
(n1)=n!1!(n1)!
(n2)=n!2!(n2)!
(n3)=n!3!(n3)!
(n4)=n!4!(n4)!
(n5)=n!5!(n5)!
(n6)=n!6!(n6)!
(n7)=n!7!(n7)!
(n8)=n!8!(n8)!
(n9)=n!9!(n9)!
I've been considering entry i in row n of Pascal's Triangle, so for 0in, we have
(ni)=n!i!(ni)!

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