Question

Give an example of two irrational numbers whose difference is a rational number

Answer 1

                                                hii  :)
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Here
         Each one of (5+√2) and (3+√2) is irrational
         But (5+√2)-(3+√2) =2 which is irrational...

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Answer 2

An example of two irrational numbers whose difference is a rational number

a = $4 + \sqrt{2}$, b = $2 + \sqrt{2}$.

Step-by-step explanation:

A rational number is a number that can be written in ratio. On the other hand that are not rational are irrational. An irrational number that can be written as a decimal but not as a fraction.

Let us take two irrational numbers say a = $4 + \sqrt{2}$, $2 + \sqrt{2$

Therefore, a - b

= $4 + \sqrt{2} - (2 - \sqrt{2} )$

= 2/1(a rational number)

Hence, we can say that the difference between two irrational numbers is a rational number.

Learn more: rational number

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