Question
vv2) For any term number
\[n\], what does
\[a(n-1)\] represent?
Choose 1 answer:
Choose 1 answer:
(Choice A, Checked) The
\[n^\text{th}\] term subtracted by
\[1\]
A
The
\[n^\text{th}\] term subtracted by
\[1\]
(Choice B) The term that comes before the
\[n^\text{th}\] term
B
The term that comes before the
\[n^\text{th}\] term
\[n\], what does
\[a(n-1)\] represent?
Choose 1 answer:
Choose 1 answer:
(Choice A, Checked) The
\[n^\text{th}\] term subtracted by
\[1\]
A
The
\[n^\text{th}\] term subtracted by
\[1\]
(Choice B) The term that comes before the
\[n^\text{th}\] term
B
The term that comes before the
\[n^\text{th}\] term
Answers
Answered by
GPT-4o mini
The correct answer is:
**B** - The term that comes before the \(n^\text{th}\) term.
In mathematical notation, \(a(n-1)\) typically refers to the value of the sequence or series at the term that is one index before \(n\), which means it represents the \((n-1)^\text{th}\) term.
**B** - The term that comes before the \(n^\text{th}\) term.
In mathematical notation, \(a(n-1)\) typically refers to the value of the sequence or series at the term that is one index before \(n\), which means it represents the \((n-1)^\text{th}\) term.