How do you find the sum of #Sigma(-2/7)^n# from n #[0,oo)#? Calculus Tests of Convergence / Divergence Partial Sums of Infinite Series 1 Answer Max G. Apr 7, 2017 Use the Geometric Series Theorem. Explanation: #-2/7# is the common ratio of the Geometric Series in this problem. Since #|-2/7| < 1#, the geometric series converges, and the sum of such a series -- where r is its common ratio -- is given by #sum_0^(oo)(r)^n = 1/(1-r)# Answer link Related questions How do you find the n-th partial sum of an infinite series? How do you find the n-th partial sum of a geometric series? How do you find the 5-th partial sum of the infinite series #sum_(n=1)^oo1/(n(n+2)# ? How do you find the 10-th partial sum of the infinite series #sum_(n=1)^oo(0.6)^(n-1)# ? How do you find the 6-th partial sum of the infinite series #sum_(n=1)^oo1/n# ? How do you find the 4-th partial sum of the infinite series #sum_(n=1)^oo(1/sqrt(n)-1/sqrt(n+1))# ? How do you find the 4-th partial sum of the infinite series #sum_(n=1)^oo(3/2)^n# ? How do you find the 5-th partial sum of the infinite series #sum_(n=1)^ooln((n+1)/n)# ? How do you find the sum of the series #1+ln2+(((ln2)^2)/(2!))+...+(((ln2)^2)/(n!))+...#? How do you find partial sums of infinite series? See all questions in Partial Sums of Infinite Series Impact of this question 4078 views around the world You can reuse this answer Creative Commons License