👉 In mathematics, a gaum-like function is a type of analytic function that can be described in terms of a sum of elementary functions. These functions are particularly useful in studying the asymptotic behavior of certain mathematical objects. In particular, they can be used to study the convergence of series and the distribution of zeros of certain polynomials. A gaum-like function is defined as follows: Let f(z) = Σ a_n z^n + b_n z^(n-1) + c_n
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