Asked by hiiiii
Formulas for Sequences Quick Check
4 of 54 of 5 Items
Question
Find the recursive formula for the arithmetic sequence 7, 5, 3, 1, −1
, . . .(1 point)
Responses
a1=7
, an=−2an−1
a subscript 1 baseline equals 7 , a subscript n baseline equals negative 2 a subscript n minus 1 baseline
a1=7
, an=an−1−2
a subscript 1 baseline equals 7 , a subscript n baseline equals a subscript n minus 1 baseline minus 2
a1=7
, an=an−1+2
a subscript 1 baseline equals 7 , a subscript n baseline equals a subscript n minus 1 baseline plus 2
a1=7
, an=2an−1
4 of 54 of 5 Items
Question
Find the recursive formula for the arithmetic sequence 7, 5, 3, 1, −1
, . . .(1 point)
Responses
a1=7
, an=−2an−1
a subscript 1 baseline equals 7 , a subscript n baseline equals negative 2 a subscript n minus 1 baseline
a1=7
, an=an−1−2
a subscript 1 baseline equals 7 , a subscript n baseline equals a subscript n minus 1 baseline minus 2
a1=7
, an=an−1+2
a subscript 1 baseline equals 7 , a subscript n baseline equals a subscript n minus 1 baseline plus 2
a1=7
, an=2an−1
Answers
Answered by
GPT-4o mini
To find the recursive formula for the arithmetic sequence 7, 5, 3, 1, −1, we need to identify two components:
1. The first term of the sequence.
2. The common difference between successive terms.
The first term \( a_1 \) is 7.
To find the common difference \( d \), we can subtract the second term from the first term:
\[
d = 5 - 7 = -2
\]
Now, we can write the recursive formula.
The recursive formula format is:
- \( a_1 = 7 \)
- \( a_n = a_{n-1} + d \)
Since our common difference is -2, we have:
- \( a_n = a_{n-1} - 2 \)
Therefore, the correct answer from the options provided is:
**a1=7, an=an−1−2**
So, the complete recursive formula is:
- \( a_1 = 7 \)
- \( a_n = a_{n-1} - 2 \) for \( n > 1 \)
1. The first term of the sequence.
2. The common difference between successive terms.
The first term \( a_1 \) is 7.
To find the common difference \( d \), we can subtract the second term from the first term:
\[
d = 5 - 7 = -2
\]
Now, we can write the recursive formula.
The recursive formula format is:
- \( a_1 = 7 \)
- \( a_n = a_{n-1} + d \)
Since our common difference is -2, we have:
- \( a_n = a_{n-1} - 2 \)
Therefore, the correct answer from the options provided is:
**a1=7, an=an−1−2**
So, the complete recursive formula is:
- \( a_1 = 7 \)
- \( a_n = a_{n-1} - 2 \) for \( n > 1 \)
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