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Find the number to which this geometric series converges: 200 - 170 + 144.5 - ...
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Jake, Mark, Malia, Kasey, Jim -- please use the same name for your posts.
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Find the number to which this geometric series converges: 200-170+144.5...
Top answer:
r = -8.5 a = 200/(1+.85) = 108.108 or, exactly, 4000/37
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Trying to review for the exam. Can someone please help me with this series questions. Thank you
Use geometric series test to
Top answer:
π/2 > 1 so it diverges 3^n/(-2)^n = (-1)^n * (3/2)^n and 3/2 > 1 so it diverges. Recall the error
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Use the geometric series test to find whether the given series converges or diverges. If it converges, find its sum. 3)
_ Q k = 1
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To determine if the given series converges or diverges, we need to check if the common ratio, r,
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A geometric series has t1 = 100 and t2 = 90.
Find the number to which Sn converges as n gets very large.
Top answer:
t2/t1 = 0.9 sum = 100/(1-.9) = 100/.1 = 1000
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Determine whether each infinite geometric series converges or diverges. If the series converges, state the sum. 150+30+6+...
Top answer:
This is a finite geometric series with first term a=150, common ratio r=1/5, and number of terms n=4
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Which of the following statements is true for the series the summation from n=0 to infinity of (-1)^n and 5/4^n?
a) The series
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well, r = -5/4, so ...
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Use the ratio test to find whether the series diverges or converges.
1/5^n (1 to infinity) I think the limit converges to 1/5, so
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No, that is a different Anonymous. I'm still not sure about my answer.
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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)
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The geometric series with first term 3 converges to the sum of 2. Find the common ratio of the series .
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The formula for the sum of an infinite geometric series is: S = a / (1 - r) where S is the sum of
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A geometric series with first term 3 converges to the sum of 2. Find the common ratio of the series
Top answer:
We know that the sum of a geometric series with first term a and common ratio r is given by: S = a /
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