387,001 views
30 votes
30 votes
The first term of a geometric sequence is 1/2 and the sum of the first two terms is 3/5.Work out the sum of the first 10 terms of the sequence.Give your answer as a decimal correct to 3 significant figures.

User Sletheren
by
2.7k points

1 Answer

11 votes
11 votes

The formula for calculating the sum of the terme in a geometric sequence is expressed as

Sn = a1(1 - r^n)/(1 - r)

where

Sn is the sum of the first n terms

a1 is the first term

r is the commin ration

n is the number of terms

From the information given,

a1 = 1/2

when n = 2, S2 = 3/5

Thus,

3/5 = 1/2(1 - r^2)/(1 - r)

Cross multiply. It becomes

3/5 x 2 = (1 - r^2)/(1 - r)

(1 - r^2) can be expressed as (1 - r)(1 + r)

Thus, the expression becomes

6/5 = (1 - r)(1 + r)/(1 - r)

6/5 = 1 + r

r = 6/5 - 1

r = 1/5

Next, we would calculate the sum of the first 10 terms, S10

In this case,

n = 10

S10 = 1/2(1 - (1/5)^10)/(1 - 1/5)

S10 = 1/2(1 - 1/25)/(4/5)

S10 = 0.625

the sum of the first 10 terms of the sequence is 0.625

User Dckuehn
by
3.1k points