Question
limπ→∞199+299+399+⋯⋯n99n100= [EAMCET 1994]
Answer: Option B
:
B
limπ→∞199+299+399+⋯⋯n99n100=limπ→∞∑nr=1(r99n100)
=limπ→∞1n∑nr=1(rn)99=∫10x99dx=[x100100]10=1100
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:
B
limπ→∞199+299+399+⋯⋯n99n100=limπ→∞∑nr=1(r99n100)
=limπ→∞1n∑nr=1(rn)99=∫10x99dx=[x100100]10=1100
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