Question: Let the sequence { a n } n N be given by begin{equation*} a_n = log (n + cos(n)) - log n end{equation*} Determine whether

Let the sequence{an}nN be given by \begin{equation*} a_n = \log (n + \cos(n)) - \log n \end{equation*} Determine whether{an}nN is convergent, and if so, determine the limit value.

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