The discussion revolves around the convergence of complex sequences as n approaches infinity, specifically examining the expressions (1+i)⁻ⁿ and n/(1+i)ⁿ.
Some participants have offered clarifications regarding the treatment of the exponent and the absolute value in the expressions. There is an acknowledgment of differing interpretations of the limits involved, with some suggesting that the sequences approach zero.
Participants are navigating potential errors in their calculations and assumptions regarding the behavior of complex sequences, particularly in relation to the impact of negative exponents and the nature of convergence.
There's your error (re^{i\theta})^n= r^n e^{ni\theta}. (1+ i)^n= (\sqrt{2})^n e^{n\pi i/4}. You did not take the absolute value to the -n powerr.yy205001 said:My answers were divergent for both question because (1+i)n=sqrt(2)*en*pi*i/4
, so when n→∞, the limit is varying on the circle with radius sqrt(2). But the solution said both of them equal to 0. How can I get that?
Any help is appreciated.