Let three rational numbers which are not equal to each other be written in the form of 1, a + b, a or 0, a/b, b.

Let three rational numbers which are not equal to each other be written in the form of 1, a + b, a or 0, a/b, b.

Because two of these three numbers have been determined, one is 1, the other is 0 and expressed as 1, a, in the form of a plus b, there is no 0, so only a =0 or a+b =0, and if a =0, in the second representation, a =0, there are two 0s, which contradict three non-equivalent rational numbers, so a can not =0, so only a+b =0, then a =-b, then b, then a =-1, then...

Because two of these three numbers have been determined, one is 1, the other is 0 and expressed as 1, a, in the form of a plus b, there is no 0, so only a =0 or a + b =0, and if a =0, in the second representation, a =0, there are two 0s, which contradict three non-equivalent rational numbers, so a can not =0, so only a + b =0, then a =-b, then b, then a =-1, then...

Because two of these three numbers have been determined, one is 1, the other is 0 and expressed as 1, a, in the form of a plus b, there is no 0, so only a =0 or a+b =0, and if a =0, in the second representation, a =0, there are two 0s, which contradict three rational numbers which are not equal to each other, so a can not =0, so only a+b =0, then a =-b, then b, then a =-1, then...

If three non-equivalent rational numbers can be expressed in the form of 1, a, a+b or 0, b, b/a, then these three numbers are I want it today ~~~ It will be added!

1,-1,0