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What is the sum of the arithmetic sequence 3, 9, 15..., if there are 24 terms? (5 points)

User Anton Okolnychyi
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1 Answer

20 votes
20 votes

There's a fixed difference of 6 between terms (9 - 3 = 6, 15 - 9 = 6, and so on). The first term of the sequence is 3, so the
n-th term is


3 + 6(n-1) = 6n - 3

If there are 24 terms in the sum, then the last term is 6×23 - 3 = 135.

Let
S be the sum,


S = 3 + 9 + 15 + \cdots + 123 + 129 + 135

Reverse the order of terms:


S = 135 + 129 + 123 + \cdots + 15 + 9 + 3

If we add up the terms in the same positions, we get twice
S on the left side, while on the right side we observe that each pair of terms will sum to 138.


S + S = (3 + 135) + (9 + 129) + (15 + 123) + \cdots + (135 + 3)


2S = 138 + 138 + 138 + \cdots + 138

and since there are 24 terms in the sum, the right side is the sum of 24 copies of 138. In other words,


2S = 24 * 138

and solving for
S gives


S = \frac{24*138}2 = \boxed{1656}

User Jon Raasch
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