1 Answer

Rolgalan · Answer 1 · 2019-08-26T17:40:26+0000

Consecutive terms in an arithmetic sequence differ by a constant

. So

$\implies\begin{cases}3k-d=1\\k-d=-3\end{cases}\implies k=2,d=5$

Denote the

-th term in the sequence by
a_n

. Now that
a_1=2

, we have

$a_n=a_(n-1)+5=a_(n-2)+2\cdot5=\cdots=a_1+(n-1)\cdot5$

which means

$a_8=2+(8-1)\cdot5=37$

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