Recognize that recursively and explicitly defined sequences are functions whose domain is a subset of the integers, the terms of an arithmetic sequence are a subset of the range of a linear function, and the terms of a geometric sequence are a subset of the range of an exponential function.
Build linear and exponential functions, including arithmetic and geometric sequences, given a graph, a description of a relationship, or two ordered pairs (include reading these from a table).
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Q 1/4
Score 0
In a certain sequence of numbers, each term after the first term is 3 less than the preceding term. If the seventh term of the sequence is 12, what is the third term?
300
24
18
9
30
Q 2/4
Score 0
What is the eighth term in the following geometric sequence?
3, 6, 12, 24
300
192
48
384
796
4 questions
Q.
In a certain sequence of numbers, each term after the first term is 3 less than the preceding term. If the seventh term of the sequence is 12, what is the third term?
1
300 sec
NC.M1.F-IF.3
Q.
What is the eighth term in the following geometric sequence?
3, 6, 12, 24
2
300 sec
NC.M1.F-IF.3
Q.
Look at the pattern shown below. Is the following sequence arithmetic or geometric and what is the common difference/common ratio?
2, 4, 16, 256 ...
3
300 sec
NC.M1.F-IF.3
Q.
Which choice is a correct equation for the graph shown below?
