You forgot the factor of 1/(z-3) you pulled out front.jinsing said:Okay, so I expand 1/z = 1/((z-3)+3) = (1/(z-3)) * (1/(1-(-3/(z-3))) =
1 - 3/(z-3) + 9/(z-3)^2 - 27/(z-3)^3 + ...
No, you have it backwards. You're in the region where |z-3|>3, right? If you divide that inequality by 3 on both sides, you get |(z-3)/3| > 1, so with your choice for c, you'd have |c|>1, which is what you don't want. You want z-3 in the denominator so the terms get smaller.Is this right? My issue keeps coming up with a way to use the geometric series while keeping |c|<1 (if 1/(1-c) = 1+c+c^2+...)
I think the answer requires that c= (z-3)/3 ..how does that make sense?
A Laurent expansion is a representation of a complex function as a sum of a power series and a Laurent series. It allows for the function to be evaluated at points where it is not analytic, such as poles or branch points.
A Taylor expansion is a representation of a complex function as a sum of a power series. It is valid for analytic functions, while a Laurent expansion is valid for functions with isolated singularities.
The coefficients in a Laurent expansion can be found by using the formula for the nth derivative of a function at a point, multiplied by the reciprocal of n!, where n is the power of the variable in the series.
Yes, a Laurent expansion can be used to find the behavior of a function at infinity by considering the coefficients of the series with negative powers of the variable.
Laurent expansions are important in mathematics because they allow for the evaluation of functions at points where they are not analytic, and can provide information about the behavior of functions at infinity. They also have applications in complex analysis, differential equations, and mathematical physics.