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The pattern starts at 3 and adds 5 to each term. Write the first five terms ofthe sequence.

User Jeremy Skinner
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1 Answer

10 votes
10 votes

Solution:

Given that;

The pattern starts at 3 and adds 5 to each term, i.e.


\begin{gathered} a=3 \\ d=5 \end{gathered}

Applying the arithmetic progression formula below


\begin{gathered} t_n=a+(n-1)d \\ a\text{ is the first term} \\ d\text{ is the common difference} \\ n\text{ is number of terms} \\ t_n\text{ is the nth term} \end{gathered}

Substitute for a and b into the arithmetic progression formula to find the next term

For the second term, n = 2


\begin{gathered} t_2=3+(2-1)5 \\ t_2=3+5(1)=3+5=8 \\ t_2=8 \end{gathered}

For the third term, n = 3


\begin{gathered} t_3=3+(3-1)5=3+5(2)=3+10=13 \\ t_3=13 \end{gathered}

For the fourth term, n = 4


\begin{gathered} t_4=3+(4-1)5=3+5(3)=3+15=18 \\ t_4=18 \end{gathered}

For the fifth term, n = 5


\begin{gathered} t_5=3+(5-1)5=3+5(4)=3+20=23 \\ t_5=23 \end{gathered}

Hence, the first five terms of the sequence are


3,8,13,18,23

User Cwharris
by
3.0k points
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