Evaluate geometric series

Question

asked Mar 17, 2023 179k views

1 Answer

Vanguard · Answer 1 · 2023-03-24T09:01:41+0000

Answer:

7.50 (nearest hundredth)

Explanation:

General form of geometric progression:
a_n=ar^(n-1)

(where
is the initial term and
is the common ratio)

Given progression:

$5\left(\frac13\right)^(n-1)$

Therefore:

Sum of a geometric series:

S_n=(a(1-r^n))/((1-r))

Substituting a = 5, r = 1/3 and n = 10 to find the sum to n = 10:

$\implies S_(10)=(5(1-\frac13^(10)))/((1-\frac13))$

$\implies S_(10)=7.499873987...$

$\implies S_(10)=7.50 \textsf{ (nearest hundredth)}$