Questions LLC
Login
or
Sign Up
Ask a New Question
Mathematics
Algebra
Geometric Series
determine the sum of the following geometric series
a. -1/32+1/16-...+256
b. 50 over sigma 8(.5)^n-2
1 answer
During the next event Gail threw the javelin 6 1 8ths meters. Gage threw 3 3 5ths times farther than gail. how far did Gage throw the javelin?
You can
ask a new question
or
answer this question
.
Similar Questions
determine the sum of the following geometric series
a. -1/32+1/16-...+256 b. 50 over sigma 8(.5)^n-2
Top answer:
To determine the sum of a geometric series, you can use the formula: Sn = a * (1 - r^n) / (1 - r)
Read more.
determine the sum of the following geometric series. round your answer to 4 decimal places if necessary.
a. -1/32+1/16-...+256 b.
Top answer:
To determine the sum of a geometric series, we can use the formula: Sum = a * (1 - r^n) / (1 - r)
Read more.
Consider the infinite geometric series infinity sigma n=1 -4(1/3)^n-1. In this, the lower limit of the summation notion is
Top answer:
a. To find the first four terms of the series, we substitute n = 1, 2, 3, and 4 into the series
Read more.
Consider the infinite geometric series below.
a. Write the first 4 terms of the series b. Does the series diverge or converge? c.
Top answer:
Data unclear.
Read more.
I'm having trouble with a geometric series problem.
Determine if the infinite summation of (-3)^(n-1)/4^n converges or diverges.
Top answer:
the first part: 4^n can be written as 4(4)^(n-1) = (1/4) (4)^(n-1) then (-3)^(n-1)/4^n = (1/4)
Read more.
DETERMINE THE SUM OF THE FOLLOWING GEOMETRIC SERIES
A. -1/32+1/16-...+256 B. 50 over Σ 8(.5)^n-2 where n=1 HELP PLEASE!!!!!!
Top answer:
see your above latest post
Read more.
DETERMINE THE SUM OF THE FOLLOWING GEOMETRIC SERIES
A. -1/32+1/16-...+256 B. 50 over Σ 8(.5)^n-2 where n=1
Top answer:
Reposting a problem in all caps is rude. it's like you are shouting.
Read more.
Determine the sum of the following geometric series. Round your answers to 4 decimals if necessary.
a) 50 over sigma k=1
Top answer:
I assume you mean 50 ∑ 8(.5<sup>k-2</sup>) k=1 In that case S<sub>50</sub> = a(1-r)^50/(1-r) r =
Read more.
Determine whether the infinite geometric series converges. If so, find the sum
1/4+1/16+1/64+1/256....
Top answer:
The geometric sequence is 1/4 , 1/16 , 1/64 , 1/256 , ... And the ratio is r = 1/16 / (1/4) = 1/4
Read more.
1)Find a1 in a geometric series for which Sn=300,r=-3,and n=4
A)15 B)15/2 C)-15 D)1/15 I chose A 2)Find the sum of the infinite
Top answer:
Please note Damon's last post. math - Jon, Wednesday, December 12, 2007 at 5:43pm thanks for the
Read more.
Related Questions
what is the sum of geometric infinite series 3/2+ 9/16+ 27/128+ 81/1024=....
i know the formula is S=a/(1-r) my teacher, he
What is the sum of the arithmetic series 5 (sigma sign) n-1 (3n-2)?
Describe an infinite geometric series with a beginning value of 2 that converges to 10. What are the first four terms of the
consider the infinite geometric series n=1 -4(1/3)^n-1 .
i need help with writing the first four terms of the series and finding
the sum of the first two terms in a geometric series is 12. the sum of the first three terms of the same series is 62. determine
Consider the infinite geometric series
∑^(∞)_(n=1) −4(1/3)^n−1 . In this image, the lower limit of the summation notation
The sum of the first five terms of a geometric series is 186 and the sum of the first six terms is 378. if the fourth term is
Calculate S(17) for the geometric series 256 - 128 + 64 - 32 + ... using the finite geometric sum formula. Round your answer to
Determine the sum of the first seven terms of the geometric series in which ...
F) t5 = 5 and t8 = -40 I'm stuck on this one!
Consider the following series: 1,2,3,4,5,10,20,40....which starts as an arithmetic series?
...but after the first five terms