1 Answer

Pynchia · Answer 1 · 2023-08-17T04:32:07+0000

It is given that the first term is 23 and the differnce is 114 so it follows:

The nth term of the series is given by:

$\begin{gathered} a_n=a+(n-1)d \\ a_n=23+(n-1)(114) \\ a_n=23+114n-114 \\ a_n=114n-91\ldots(i) \end{gathered}$

The (n-1)th term is given by:

$\begin{gathered} a_(n-1)=114(n-1)-91 \\ a_(n-1)=114n-114-91 \\ a_(n-1)=114n-205\ldots(ii) \end{gathered}$

Subtract (ii) from (i) to get:

$\begin{gathered} a_n-a_(n-1)=-91-(-205) \\ a_n=a_(n-1)+114\ldots(iii) \end{gathered}$

Hence the recursive formula is shown by equation (iii) above.

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