A series bn is called conditionally convergent if it converges and the corresponding series of positive terms converges. O it converges but the corresponding series of positive terms diverges. it diverges and the corresponding series of positive terms diverges. it diverges but the corresponding series of positive terms converges.
A series bn is called conditionally convergent if it converges and the corresponding series of positive terms converges. O it converges but the corresponding series of positive terms diverges. it diverges and the corresponding series of positive terms diverges. it diverges but the corresponding series of positive terms converges.
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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Transcribed Image Text:A series
is called conditionally convergent if
it converges and the corresponding series of positive terms
Σ
converges.
it converges but the corresponding series of positive terms
Σ
diverges.
it diverges and the corresponding series of positive terms
diverges.
it diverges but the corresponding series of positive terms
converges.
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