Rock750 wrote:
It seems that i can't get any set where the difference between any two numbers is equal to 2. Statement 1 cannot be sufficient by itself.
Can someone please give me an example of a set containing TWO numbers where their difference is always equal to 2.
Thanks
Can someone please give me an example of a set containing TWO numbers where their difference is always equal to 2.
Thanks
Consider set S={0,2}
The difference between the elements is 2.
The question says that S contains distinct integers, and A says that the difference between any two elements is 2.
now consider set M for example
{0,2,4} This respect the question (distinct integers) but goes against A (the difference between 0 and 4 is 4, not 2)
With A we can enstablish that the set has only two elements.
Is it clear? let me know