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write the equation to represent the sequence and determine the nth term of the following arithmetic sequence

write the equation to represent the sequence and determine the nth term of the following-example-1
User Bersaelor
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1 Answer

19 votes
19 votes

Let us solve the part d.

The given sequence is


3,3(1)/(2),4\ldots

Please note that 3 and a half is basically 3.5

The standard explicit formula for an arithmetic sequence is given by


a_n=a_1+d\mleft(n-1\mright)

Where aₙ is the nth term, a₁ is the first term and d is the common difference

The common difference is basically the difference between any two consecutive terms

d = 4 - 3.5 = 0.5

d = 3.5 - 3 = 0.5

So the common difference is 0.5

The first term in the sequence is 3

So the explicit formula for an arithmetic sequence becomes


a_n=3_{}+0.5(n-1)

Now to find the 16th term we will simply substitute n = 16 in the above formula.


\begin{gathered} a_(16)=3_{}+0.5(16-1) \\ a_(16)=3_{}+0.5(15) \\ a_(16)=3_{}+7.5 \\ a_(16)=10.5 \end{gathered}

Therefore, the 16th term of the sequence is 10.5.

User Bcngr
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