Want this question answered?
Perhaps it makes sense to ask; in any case, the answer is that there is no greatest and no smallest integer. Whatever number you choose, you can always add one to get an even larger integer; or subtract one to get an even smaller one.
The range
Given an undirected graph G=(V,E) and an integer k, find induced subgraph H=(U,F) of G of maximum size (maximum in terms of the number of vertices) such that all vertices of H have degree at least k
Subtract the greatest range by the least and you have your answer.
round number of 2000000 to least and greatest number
That's known as the range.
The difference between the greatest and least number is the range.
No. The positive integers are {1, 2, 3, 4, 5, ...}. They start at 1 (which is the least positive integer) and progress forever (to infinity). There is no end to the positive integers, so there is no greatest positive integer. Another way to look at it might be to think of any really large integer (a "counting" or "whole" number) and add one. That will create a "next bigger" large number. You can continue to do this infinitely many times.
Greatest number of 70,000
the scale is two #s that one is the least and the other is the greatest
The least possible integer is -98765432. The least possible positive integer is 10234567.
you use > to show greatest to least, and <to show least to greatest