Asked by Anonymous
14. The last term of an arithmetic sequence is 207, the common difference is 3, and the number of terms is 14. What is the first term of the sequence?:
A. 165
B. 171
C. 249
D. 168
Please explain. thanks
A. 165
B. 171
C. 249
D. 168
Please explain. thanks
Answers
Answered by
PsyDAG
Subtract the difference from the last term <B>13</B> times, since the last term is the 14th number. Can you think of a faster way to do this?
I hope this helps. Thanks for asking.
I hope this helps. Thanks for asking.
Answered by
tchrwill
The last term of an arithmetic sequence is 207, the common difference is 3, and the number of terms is 14. What is the first term of the sequence?:
A. 165
B. 171
C. 249
D. 168
Please explain. thanks
The last, or nth, term of an arithmetic progression is defined by L = a + (n - 1)d where L = the last term, a = the first term, n = the number of terms and d = the common difference.
Therefore, 207 = a + (14 - 1)3
...............= a + 39
Therefore, a = 207 - 3396 = 168.
A. 165
B. 171
C. 249
D. 168
Please explain. thanks
The last, or nth, term of an arithmetic progression is defined by L = a + (n - 1)d where L = the last term, a = the first term, n = the number of terms and d = the common difference.
Therefore, 207 = a + (14 - 1)3
...............= a + 39
Therefore, a = 207 - 3396 = 168.
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