Find the sum of the sequence: 108, 105, 102,...,15

Question

asked Jan 4, 2021 15.1k views

1 Answer

Coreen · Answer 1 · 2021-01-08T16:24:59+0000

Answer:

1968

Explanation:

The given sequence is a finite arithmetic sequence.

Step 1: Determine the number of terms in the sequence

For an arithmetic sequence, the nth term:

A(n)=a+(n-1)d

In the sequence:

Therefore, to find which term the number 15 is, we have:

15=108+(n-1)(-3)

15=108-3n+3

15=111-3n

3n=111-15

3n=96

Number of terms in the sequence, n=32

Step 2: Find the sum of the sequence

For an arithmetic sequence with a given first and last term:

$Sum, S(n)=(n)/(2)(a+l)\\ =(32)/(2)(108+15)\\=16*123\\$Sum of the sequence, S(n)=1968$