The 4th term of an exponential sequence is 192 and 9th term is 6. Find the commonratio
Question
The 4th term of an exponential sequence is 192 and 9th term is 6. Find the common ratio.
Solution
To find the common ratio of an exponential sequence, we can use the formula for the nth term of an exponential sequence, which is:
a_n = a_1 * r^(n-1)
where:
- a_n is the nth term
- a_1 is the first term
- r is the common ratio
- n is the term number
We know that the 4th term (a_4) is 192 and the 9th term (a_9) is 6. We can set up two equations:
192 = a_1 * r^(4-1) => 192 = a_1 * r^3 ----(1)
6 = a_1 * r^(9-1) => 6 = a_1 * r^8 ----(2)
We can solve these two equations simultaneously to find the values of a_1 and r.
Divide equation (2) by equation (1):
(6/192) = (a_1 * r^8) / (a_1 * r^3)
0.03125 = r^5
Take the 5th root of both sides to solve for r:
r = (0.03125)^(1/5)
r = 0.5
So, the common ratio of the exponential sequence is 0.5.
Similar Questions
Find the nth term of the geometric sequence with given first term a and common ratio r.a = −6, r = −3an = What is the fourth term?a4 =
Write an equation for the $n$n th term of the geometric sequence. Then find $a_9$a9 .$1,\ 4,\ 16,\ 64,\ \ldots$1, 4, 16, 64, …$a_n=$an= $a_9=$a9=
In a geometric progression, the sum of the first n terms is 3069 and the first term is 3. If the nth term in the progression is 1536, find the common ratio
In a geometric progression consisting of real numbers, the 2nd term is 9 and the 6th term is 729. What is the 4th term?a.- 81b.- 27c.81d.27
Determine the common difference, the fifth term, the nth term, and the 100th term of the arithmetic sequence.87, 2314, 157, 3714
Upgrade your grade with Knowee
Get personalized homework help. Review tough concepts in more detail, or go deeper into your topic by exploring other relevant questions.