Question

show that set of integrs have no limit point​

Answer 1

Answer:

For example the set [0,1]∪{2} is a closed set in R. Every point is an adherent point, but 2 is not a limit point. ... To answer the original question, the integers have no limit points in the reals, since all integers are isolated; that is, each integer has a neighborhood that does not contain any other integers.

Answer 2

Answer:

Step-by-step explanation: