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

Compute the sums below. (Assume that the terms in the first sum are consecutive terms-example-1
User Gmeka
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SOLUTION

The given sequence is

From the sequence it follows


a=8,d=-3

The formula for sum of an arithmetic sequence


S=(n)/(2)(a+l)

Since the number of terms is not given then

Using the nth term formula


a_n=a+(n-1)d

Substitute


a_n=-403,a=8,d=-3

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:


S=-27255

Compute the sums below. (Assume that the terms in the first sum are consecutive terms-example-1
User Qwertyuu
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