lim(xrarroo)(logx^(n)-[x])/([x]), n in N...

`lim_(xrarroo)(logx^(n)-[x])/([x]), n in N`
([x] denotes the greatest integer less than or equal to x)

A

has the value -1

B

has the value 0

C

has the value 1

D

does not exist

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The correct Answer is:

A

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`lim_(xrarroo)(logx^(n)-[x])/([x]), n in N` ([x] denotes the greatest integer less than or equal to x)

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`lim_(xrarroo)(logx^(n)-[x])/([x]), n in N`
([x] denotes the greatest integer less than or equal to x)