Consider the series If we let / (z) = 1+3z' then O O O 1+3n is finite. is not finite. cannot be evaluated. n=0 Based on this result, what can you deduce about the series 3 1+ 3n 01 (2) dz ? The series is convergent. The series is divergent. The integral could not be evaluated.

Advanced Engineering Mathematics
10th Edition
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Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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Consider the series
If we let f (z)=1+3z'
O
is finite.
O
O
1+3n
is not finite.
cannot be evaluated.
n=0
Based on this result, what can you deduce about the series
3
1+ 3n
then
?
01 (2) dz
The series is convergent.
The series is divergent.
The integral could not be evaluated.
Transcribed Image Text:Consider the series If we let f (z)=1+3z' O is finite. O O 1+3n is not finite. cannot be evaluated. n=0 Based on this result, what can you deduce about the series 3 1+ 3n then ? 01 (2) dz The series is convergent. The series is divergent. The integral could not be evaluated.
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