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Find the four terms of the arithmetic sequence given the 13th term (a_{13}=-60) and the thirty third term (a_{33}=-160).Given terms: a_{13}=-60 and a_{33}= -160Find these terms:a_{14}= Answera_{15}= Answera_{16}= Answera_{17}= Answer

Find the four terms of the arithmetic sequence given the 13th term (a_{13}=-60) and-example-1
User Wrangler
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1 Answer

16 votes
16 votes

Given:

13th term = -60

33rd term = -160

Find:

14th, 15th, 16th, and 17th term

Solution:

For us to determine the 14 - 17th term, we need to identify the common difference in this arithmetic sequence. The formula is:


(a_(33)-a_(13))/(33-13)

Let's plug in the values of a₃₃ and a₁₃ in the formula above.


(-160-(-60))/(33-13)

Then, solve.


(-100)/(20)=-5

Hence, the common difference between the terms is -5.

So, the next 4 terms after a₁₃ are shown below:


\begin{gathered} a_(14)=-65 \\ a_(15)=-70 \\ a_(16)=-75 \\ a_(17)=-80 \end{gathered}

User Bdonlan
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