1.

If z = a is an isolated singularity of f and \(f\left( z \right) = \mathop \sum \limits_{ - \infty }^\infty {a_n}{\left( {z - a} \right)^n}\) is its Laurent expansion in ann (a; 0, R), then z = a is a removable singularity if

A. an = 0, n ≤ -1
B. an ≠ 0, n ≤ -1
C. an = 0, n ≥ -1
D. an ≠ 0, n ≥ -1
Answer» B. an ≠ 0, n ≤ -1


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