Consider the ceiling function [z] = min{z € Z]z >1}. This basically rounds up any real number. For instance, [1] = 1 and [3.00001] = 4. Show that lim [r] does not exist.
Consider the ceiling function [z] = min{z € Z]z >1}. This basically rounds up any real number. For instance, [1] = 1 and [3.00001] = 4. Show that lim [r] does not exist.
Chapter3: Functions
Section3.3: Rates Of Change And Behavior Of Graphs
Problem 2SE: If a functionfis increasing on (a,b) and decreasing on (b,c) , then what can be said about the local...
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