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Also for problem 10.2 instead of using the comparison test you can just use the Hadamard Theorem since your <math>An=n^n</math> Then <math>\frac{1}{lim sup(An)^{1/n}} = \frac{1}{n}</math> which equals zero as n tends to infinity | Also for problem 10.2 instead of using the comparison test you can just use the Hadamard Theorem since your <math>An=n^n</math> Then <math>\frac{1}{lim sup(An)^{1/n}} = \frac{1}{n}</math> which equals zero as n tends to infinity | ||
--[[User:Kfernan|Kfernan]] 15:47, 8 November 2009 (UTC) | --[[User:Kfernan|Kfernan]] 15:47, 8 November 2009 (UTC) | ||
+ | |||
+ | Hey if any one can give me a hint to get somewhere with the last 4 problems which are 16.2 16.3 17.1 and 18.1 that would be awesome. | ||
+ | --[[User:Kfernan|Kfernan]] 16:37, 8 November 2009 (UTC) |
Revision as of 11:37, 8 November 2009
Homework 8
NEWS FLASH: The due date for HWK 8 has been extended to Monday, Nov. 9
Hint for V.16.1: We know that
$ f(z)=\sum_{n=0}^\infty z^n=\frac{1}{1-z} $
if $ |z|<1 $. Notice that
$ f'(z)=\sum_{n=1}^\infty nz^{n-1} $,
and
$ f''(z)=\sum_{n=2}^\infty n(n-1)z^{n-2} $.
What are the power series for $ zf'(z) $ and $ z^2f''(z) $? How can you combine these to get the series in the question? --Steve Bell
Does anybody know how to attack problem 10.2? Also for problem 8.1, I am thinking the power series should just be $ (z-zo)^{k} $Did anybody do it another way? --Adrian Delancy
^^^On 8.1, I think you just need to use what you already know about geometric series, as Taylor's Theorem isn't mentioned until a couple of sections after. I just wrote $ z^k = z^k * (1-z)/(1-z) $ , and used the fact that the geometric series (with coefficient 1, center 0) converges to $ 1/(1-z) $
--Dgoodin 10:46, 8 November 2009 (UTC)
for 10.2 compare $ \sum_{n=0}^\infty n^nz^{n} $ to $ \sum_{n=0}^\infty c^nz^{n} $ where $ c $ is a constant to establish the inequality in the RoC's. Then let $ c \rightarrow \infty $ to squeeze the RoC of the first power series to zero.--Rgilhamw 14:21, 8 November 2009 (UTC)
did any one get this as the answer for 8.1?
$ \sum_{n=0}^\infty (1-z)(z-z0)^{2k} $
--Kfernan 15:41, 8 November 2009 (UTC)
Also for problem 10.2 instead of using the comparison test you can just use the Hadamard Theorem since your $ An=n^n $ Then $ \frac{1}{lim sup(An)^{1/n}} = \frac{1}{n} $ which equals zero as n tends to infinity --Kfernan 15:47, 8 November 2009 (UTC)
Hey if any one can give me a hint to get somewhere with the last 4 problems which are 16.2 16.3 17.1 and 18.1 that would be awesome. --Kfernan 16:37, 8 November 2009 (UTC)