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What is the answer if you insert 3 terms between 2 and 32 by geometric sequence?
Wiki User
∙ 7y ago
The terms are: 4, 8 and 16
Wiki User
∙ 7y ago
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Is geometric sequence a sequence in which each successive terms of the sequence are in equal ratio?
Yes, that's what a geometric sequence is about.
Do the terms of a geometric sequence increase as it proceeds?
yes
What is the common ratio between the terms in this geometric sequence 5 20 80 320 1280?
1 to 4
What is the geometric sequence formula?
un = u0*rn for n = 1,2,3, ... where r is the constant multiple.
Is the Fibonacci sequence a geometric sequence?
No. Although the ratios of the terms in the Fibonacci sequence do approach a constant, phi, in order for the Fibonacci sequence to be a geometric sequence the ratio of ALL of the terms has to be a constant, not just approaching one. A simple counterexample to show that this is not true is to notice that 1/1 is not equal to 2/1, nor is 3/2, 5/3, 8/5...
Descending geometric sequence?
A descending geometric sequence is a sequence in which the ratio between successive terms is a positive constant which is less than 1.
In a geometric sequence the between consecutive terms is constant.?
Ratio
Is geometric sequence a sequence in which each successive terms of the sequence are in equal ratio?
Yes, that's what a geometric sequence is about.
In a geometric sequence the ratio between consecutive terms is .?
It is a constant, other than 0 or 1.
Do the terms of a geometric sequence increase as it proceeds?
yes
What is the common ratio between the terms in this geometric sequence 5 20 80 320 1280?
1 to 4
In what sequence are all of the terms the same?
A static sequence: for example a geometric sequence with common ratio = 1.
DO the terms in a geometric sequence always increase?
FALSE (Apex)
find the next two terms in geometric sequence 2,6,18,54,162,486,1458?
It is 4374
What is the geometric sequence formula?
un = u0*rn for n = 1,2,3, ... where r is the constant multiple.
Is the Fibonacci sequence a geometric sequence?
No. Although the ratios of the terms in the Fibonacci sequence do approach a constant, phi, in order for the Fibonacci sequence to be a geometric sequence the ratio of ALL of the terms has to be a constant, not just approaching one. A simple counterexample to show that this is not true is to notice that 1/1 is not equal to 2/1, nor is 3/2, 5/3, 8/5...
What is the first 5 terms of the geometric sequence a14r3?
They are 14, 42, 126, 378 and 1134.
