How do I find the #n#th term of a binomial expansion? Precalculus The Binomial Theorem Pascal's Triangle and Binomial Expansion 1 Answer George C. Jul 13, 2015 The #n#th term (counting from #1#) of a binomial expansion of #(a+b)^m# is: #((m),(n-1))a^(m+1-n)b^(n-1)# #((m),(n-1))# is the #n#th term in the #(m+1)#th row of Pascal's triangle. Explanation: To calculate #((p), (q))# you can use the formula: #((p), (q)) = (p!)/(q!(p-q)!)# or you can look at the #(p+1)#th row of Pascal's triangle and pick the #(q+1)#th term. The #(p+1)#th row consists of the values of: #((p), (0))#, #((p), (1))#, #((p), (2))#,...,#((p),(p))# Answer link Related questions What is Pascal's triangle? How do I find the #n#th row of Pascal's triangle? How does Pascal's triangle relate to binomial expansion? How do I find a coefficient using Pascal's triangle? How do I use Pascal's triangle to expand #(2x + y)^4#? How do I use Pascal's triangle to expand #(3a + b)^4#? How do I use Pascal's triangle to expand #(x + 2)^5#? How do I use Pascal's triangle to expand #(x - 1)^5#? How do I use Pascal's triangle to expand a binomial? How do I use Pascal's triangle to expand the binomial #(a-b)^6#? See all questions in Pascal's Triangle and Binomial Expansion Impact of this question 26995 views around the world You can reuse this answer Creative Commons License