Compute the sums below. (Assume that the terms in the first sum are consecutive terms of an arithmetic sequence.)

Question

asked Jan 6, 2023 61.2k views

1 Answer

Qwertyuu · Answer 1 · 2023-01-13T05:21:40+0000

SOLUTION

The given sequence is

From the sequence it follows

The formula for sum of an arithmetic sequence

Since the number of terms is not given then

Using the nth term formula

Substitute

Into the nth term formula

$\begin{gathered} -403=8+(n-1)-3 \\ -403=8-3n+3 \\ -403-11=-3n \\ -3n=-414 \\ n=138 \end{gathered}$

Therefore the sum is

$\begin{gathered} S=(138)/(2)(8+(-403)) \\ S=69(-395) \\ S=-27255 \end{gathered}$

Therefore the solution is: