Difference of two irrational numbers

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It is possible for the difference of two irrational numbers to be rational, specifically when one irrational number is expressed as the sum of another irrational number and a rational number. For example, if x is an irrational number and y is defined as x plus a rational number r, then y remains irrational while the difference y - x equals r, which is rational. This situation illustrates the construction of equivalence classes in measure theory, where each irrational number forms its own class due to the property that their differences can yield rational results. The discussion highlights the relationship between irrational numbers and rational differences, reinforcing concepts in measure theory and equivalence relations. Thus, the exploration of irrational numbers and their differences reveals important mathematical principles.
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Im wondering if its possible given x,y irrational, that x-y is rational (other than the case x=y). The reason I am asking this is that I am reading a book on measure theory and they try to construct a non measurable set and they start with an equivalence relation on [0,1} x~y if x-y is rational. Then they construct a set using the axiom of choice which contains exactly 1 element from each equivalence class. I know that the set of all rational numbers in [0,1) is an equivalence class, also each irrational number forms an equivalence class because for each irrational number x, x-x=0 (rational). Is there any other possibilities?
 
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Let x be any irrational, and let y=x+r. (with r any rational number). Then y and x are irrational, and y-x is rational.
 
that was simple :)
 

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