Test the series below for convergence using the Ratio Test. 3n Ỹ 370 n! n=1 The limit of the ratio test simplifies to lim |ƒ(n)| where n→∞ f(n) = The limit is: (enter oo for infinity if needed) Based on this, the series [Select an answer
Test the series below for convergence using the Ratio Test. 3n Ỹ 370 n! n=1 The limit of the ratio test simplifies to lim |ƒ(n)| where n→∞ f(n) = The limit is: (enter oo for infinity if needed) Based on this, the series [Select an answer
Chapter9: Sequences, Probability And Counting Theory
Section9.4: Series And Their Notations
Problem 10TI: Determine whether the sum of the infinite series is defined. 24+(12)+6+(3)+
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![Test the series below for convergence using the Ratio Test.
∞ 3n
n!
n=1
The limit of the ratio test simplifies to lim |f(n)| where
n→∞
f(n) =
=
The limit is:
(enter oo for infinity if needed)
Based on this, the series [Select an answer](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F54cb8c7a-f5c8-4f70-beb9-4c302d85da57%2F5aab635a-ed92-4a45-8be5-3153a1971c20%2Fnqrz34o_processed.jpeg&w=3840&q=75)
Transcribed Image Text:Test the series below for convergence using the Ratio Test.
∞ 3n
n!
n=1
The limit of the ratio test simplifies to lim |f(n)| where
n→∞
f(n) =
=
The limit is:
(enter oo for infinity if needed)
Based on this, the series [Select an answer
![Test the series below for convergence using the Ratio Test.
∞ 3n
n!
n=1
The limit of the ratio test simplifies to lim |f(n)| where
n→∞
f(n) =
=
The limit is:
(enter oo for infinity if needed)
Based on this, the series ✔ Select an answer
Diverges
Converges](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F54cb8c7a-f5c8-4f70-beb9-4c302d85da57%2F5aab635a-ed92-4a45-8be5-3153a1971c20%2Fhqenea3_processed.jpeg&w=3840&q=75)
Transcribed Image Text:Test the series below for convergence using the Ratio Test.
∞ 3n
n!
n=1
The limit of the ratio test simplifies to lim |f(n)| where
n→∞
f(n) =
=
The limit is:
(enter oo for infinity if needed)
Based on this, the series ✔ Select an answer
Diverges
Converges
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