if A and B are rational and irrational number is a + b and irrational number justify your answer
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Hi ,
Given ,
a is rational number,
b is irrational number take it as ( sqrt b )
We have to show the number a + ( sqrt b ) is an irrational
Let us assume to the contrary , that ( sqrt b ) is rational.
Then ,
a + sqrt b is rational . [ since sum of two rational is rational ]
So, we can find coprime integers p and q ( q is not equals to zero )
such that
a + sqrt b = p / q
Sqrt b = p / q - a
Since , p and q are integers , we get p / q is rational
and so , ( p / q - a ) is rational and so , sqrt b is rational.
But this contradicts the fact that sqrt b is irrational.
So , we conclude that a + sqrt b is irrational number.
I hope this will useful to you.
Given ,
a is rational number,
b is irrational number take it as ( sqrt b )
We have to show the number a + ( sqrt b ) is an irrational
Let us assume to the contrary , that ( sqrt b ) is rational.
Then ,
a + sqrt b is rational . [ since sum of two rational is rational ]
So, we can find coprime integers p and q ( q is not equals to zero )
such that
a + sqrt b = p / q
Sqrt b = p / q - a
Since , p and q are integers , we get p / q is rational
and so , ( p / q - a ) is rational and so , sqrt b is rational.
But this contradicts the fact that sqrt b is irrational.
So , we conclude that a + sqrt b is irrational number.
I hope this will useful to you.
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