Exercises
[23F](Proposed on 2022-12-13) Note:Written exam 29th January 2021.Let it be \(πΌ{\gt}0\). Say (justifying) for which \(πΌ\) the following series converge or diverge
- \[ β_{n=1}^β \left({\sqrt[4]{n^ 8+n^πΌ} - n^ 2 }\right) \]
- \[ β_{n=2}^β \left( \frac{1}{n^πΌ} - \frac{1}{n^πΌ+1} \right) \]
- \[ β_{n=2}^β \frac{1}{(\log _ 2 n) ^{πΌ\log _ 2(n)}} \]
where the logarithms are in base 2.
Solution 1