Let three non-equivalent rational numbers be expressed in the form of 1 and a+b, or in the form of 0 and b parts a and b respectively. Let be three non-equivalent rational numbers, which can be expressed as 1 and a+b, respectively, or as 0 and b parts a and b parts, respectively, and calculate the value of the 2010 power of a+b and the 2009 power of b. Let three non-equivalent rational numbers be expressed in the form of 1 and a+b respectively, and in the form of 0 and b parts a and b respectively. Let be three non-equivalent rational numbers, which can be expressed as 1 and a+b, respectively, or as 0 and b parts a and b parts, respectively, and calculate the value of the 2010 power of a+b and the 2009 power of b.

Because it can be expressed as a b of 0, a is not equal to 0, and because it can be expressed as 1a + b
B =1 a =-1 so the 2010 power of a + the 2009 power of b equals 2

Because it can be expressed as a b of 0, a is not equal to 0, and because it can be expressed as 1 a + b.
B =1 a =-1 so the 2010 power of a + the 2009 power of b equals 2

Let there be three rational numbers which are not equal to each other. They can be written in the form of 1, a+b, a expressed in the form of 0, b/a, b. Try a^2001+ b^2002. Let three rational numbers be equal to each other, which can be written in the form of 1, a + b, a or 0, b/a, b. Try a^2001+ b^2002.

{1, A+b, a }={0, a/b, b}
If a=0, then a/b=0 does not conform to the meaning
A+b=0
A=-b
A/b=-b/b=-1
Only a=-1
B=1
Ze
A^2001+ b^2002
= -1+1
=0

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