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17 votes
17 votes
Write a recursive formula to represent the sequence:-36,-51,-66,-81....

User Newtrino
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1 Answer

28 votes
28 votes

Given: Given a sequence -36,-51,-66,-81....

Required: Recursive formula to represent the sequence.

Explanation:

For the given sequence,

Let us check the difference between consecutive terms.


\begin{gathered} a_2-a_1=-51-(-36)=-15 \\ a_3-a_1=-66-(-36)=-15 \end{gathered}

Thus, it is clearly an arithematic progression(A.P.) with first term a = -36 and common difference d = -15.

So let us find the nth term of the AP


a_n=a+(n-1)d

a = -36 and d = -15, so


\begin{gathered} a_n=-36+(n-1)(-15) \\ a_n=-36-15n+15 \end{gathered}

So


a_n=-21-15n

This is the formula for nth term.

Also,


a_n-a_(n-1)=-15

This is recursive formula.

Final Answer:


\begin{gathered} a_n-a_(n-1)=-15 \\ a_n=-21-15n \end{gathered}

User Joelty
by
2.3k points
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