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Falsoon · Answer 1 · 2023-11-17T03:25:06+0000

To solve for the 25th term of the arithmetic sequence:

$\begin{gathered} a_1=8 \\ a_9=48 \end{gathered}$

For an arithmetic sequence

$\begin{gathered} T_n=a+(n-1_{})d \\ a=a_1=8 \\ a_9=a+(9-1)d \\ a_9=a+8d \\ 48=8+8d \\ 48-8=8d \\ 40=8d \\ \text{divide both side by 8} \\ (40)/(8)=(8d)/(8) \\ d=4 \end{gathered}$

25th term = T_25

$\begin{gathered} T_(25)=a+(25-1)d \\ T_(25)=a+24d \\ T_(25)=8+24(5) \\ T_(25)=8+120 \\ T_(25)=128 \end{gathered}$

Therefore the 25th term of the arithmetic sequence = 128

Hence the correct answer is Option D

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