elizaburlap said:How would you go about extending it to infinity?
In the text it has a few examples that span n from 1 to infinity.
Such as, an=n(-1)^n
I understand that it does converge, because an approaches 0 as n approaches infinity, but when the equations become more complicated, how to I recognise this without a graph?
The Supremum of a set is the smallest upper bound for all the elements in the set, while the Infimum is the largest lower bound for all the elements in the set.
Supremum and Infimum can be visualized on a graph as the highest and lowest points, respectively, on the graph. They represent the maximum and minimum values of a function or set of data.
Supremum and Infimum are important concepts in mathematical analysis because they help determine the boundaries and limits of a function or set of data. They can also be used to prove the existence of certain values within a set.
Yes, a set can have both a Supremum and Infimum if the set is bounded. If a set has a Supremum and Infimum, it is known as a complete set.
To find the Supremum and Infimum of a set or function, you must first determine the upper and lower bounds of the set or function. Then, the Supremum is the smallest upper bound and the Infimum is the largest lower bound.