7.03 Exponential functions as geometric sequences
Adaptive
Worksheet
Interactive practice questions
How can the common ratio of a geometric sequence be obtained?
By choosing any term after the first and multiplying it by the previous term.
A
By choosing any term after the first and subtracting the previous term from it.
B
By choosing any term after the first and dividing it by the previous term.
C
By choosing any term after the first and multiplying it by the next term.
D
Easy
< 1min
Find the common ratio of the geometric sequence.
$2$2, $-16$−16, $128$128, $-1024$−1024, ...
Easy
< 1min
Find the common ratio of the geometric sequence.
$-\frac{352}{5}$−3525$,$, $-\frac{88}{5}$−885$,$, $-\frac{22}{5}$−225$,$, $-\frac{11}{10}$−1110$,$, ...
Easy
< 1min
Consider the first four terms in this geometric sequence: $-8$−8, $-16$−16, $-32$−32, $-64$−64
Easy
1min
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