Let zk = cos(2kpi/10)+isin(2kpi/10); k=1...

Let `z_k = cos(2kpi/10)+isin(2kpi/10); k=1,2,34,...,9` (A) For each `z_k` there exists a `z_j` such that `z_k.z_j=1` (ii) there exists a `k in {1,2,3,...,9}` such that `z_1 z = z_k`has no solution z in the set of complex numbers

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Let `z_k = cos(2kpi/10)+isin(2kpi/10); k=1,2,34,...,9` (A) For each `z_k` there exists a `z_j` such that `z_k.z_j=1` (ii) there exists a `k in {1,2,3,...,9}` such that `z_1 z = z_k`has no solution z in the set of complex numbers

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