I have to find the supremum and infimum of $(1-1/n^2)^n$ where $n$ is a natural number. A hint is given that an inequality helps. I thought that the inequality which could help is Bernoulli's inequality: $(1+x)^n\ge 1+nx$. But this is not helping. Because then I get: $(1-1/n^2)^n\ge 1-1/n$ It helps in finding an infimum but not a supremum.
Asked
Active
Viewed 177 times
0
-
1Have a look at https://math.stackexchange.com/a/579415/42969. – Martin R Sep 02 '21 at 08:16