The common ratio of the geometric sequence -2, 4, -8, 16, -32, . . . is
-2
.
What is the common ratio in the geometric sequence 4 8 16?
For example, 2, 4, 8,16 is a geometric sequence as it has a common ratio equal to
2
.
What is the common ratio of the geometric sequence below 4 8 16 32 Brainly?
-2
is the common ratio.
What is a common ratio of the geometric sequence below?
What is the common ratio of the geometric sequence below? … jpg and the common ratio is
mc018-2
.
What is the sum of the geometric sequence of 8 16 32?
The sum of the geometric sequence is
56
.
What is the sum of the geometric sequence 4/16 64 If there are 8 terms?
Answer: The sum of the geometric sequence 4, 16, 64, … if there are 8 terms is
87380
.
What is the rule for the geometric sequence?
A geometric sequence is a sequence in which the ratio of any term to the previous term is constant. The explicit formula for a geometric sequence is of the form
a
n
= a
1
r – 1
, where r is the common ratio.
How many terms are there in the GP 4 8 16 32?
54. How many terms are there in the G.P. 4, 8, 16, 32, … , 1024? | A. 6 B. 8 | C. 9 D. 7 |
---|
What is the next number in the sequence 4 8 16?
2 Answers By Expert Tutors
8 ÷ -4 = -2. Thus, in order to determine each successive term, we’ll be multiplying the last term by -2. -16 • -2 = 32, and 32 • -2 =
-64
. These are the next two terms in the sequence.
What is the geometric mean between 2 and 18?
The geometric mean of 2 and 18 is
6
.
How do you find the common ratio of a geometric mean?
- Divide each term by the previous term.
- Compare the quotients. If they are the same, a common ratio exists and the sequence is geometric.
What is common ratio in GP?
In geometric progression, the common ratio is
the ratio between any one term in the sequence and divide it by the previous term
. Usually, it is represented by the letter “r”.
What is the 10th term of the sequence 3/12 48192?
Answer: the sequence of this is
768, 3072, 12288, 49154
, 196608, 7865432.
What is the 15th term of the geometric sequence 2 6 18?
Geometric Sequence: 2,6,18,…,
118098
. Hence, 118098 is the 11thterm.
What is the sum of a 7 term geometric series?
Since the first term is -6, the next term would apparently be 24. You can either take out the next term by simply multiplying the previous term with the ratio. This is called geometric progression, and you will see that the seventh term comes out to be
-24,576
.