Questions LLC
Login
or
Sign Up
Ask a New Question
Questions
Math
Find the number to which this geometric series converges: 200-170+144.5...
1 answer
r = -8.5
a = 200/(1+.85) = 108.108
or, exactly, 4000/37
You can
ask a new question
or
answer this question
.
Related Questions
Describe an infinite geometric series with a beginning value of 2 that converges to 10. What are the first four terms of the
Find the minimum number of terms in the geometric series 10 + 8 + 32/5 + ... such that the sum is greater than 49.
Consider the infinite geometric series
∑^(∞)_(n=1) −4(1/3)^n−1 . In this image, the lower limit of the summation notation
Does the following infinite geometric series diverge or converge? Explain.
3 + 9 + 27 + 81 + . . . A) It diverges; it does not
Calculate S(17) for the geometric series 256 - 128 + 64 - 32 + ... using the finite geometric sum formula. Round your answer to
Determine whether the geometric series converges or diverges.
27 + 18 + 12 + 8 + . . .
Consider the series 1/4+1/6+1/9+2/27+4/81+....
Does the series converge or diverge? Is the series arithmetic, geometric, neither,
Which of the following correctly uses the formula for the finite geometric series to derive the sum of the first seven terms of
Consider the following series: 1,2,3,4,5,10,20,40....which starts as an arithmetic series?
...but after the first five terms
The divergence test applied to the series ∑n=1 to ∞ 3n/(8n+9) tells us that the series converges or diverges?
I got that it
