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A Laurent's series is a way of representing a complex function as a power series, where a Taylor series expansion is not possible.
The Laurent series for f(z) about a point c, is of the form:
f(z) = sum a(n)*(z - c)^n where the summation is over all integer n: from negative infinity to positive infinity.
The a(n) are constants which are line integrals of f(z). In view of the limitations of this browser: the fact that mathematical symbols are impossible, it is not possible to describe these line integrals.
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