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Why is the square root of a non perfect square always irrational number ?
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Why is the square root of a non perfect square always irrational number ?

User Apqu
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2 Answers

3 votes

Answer:

Yes, unless X is a perfect square, sqrt(X) is irrational

Explanation:

The proof where X= 2 is an example of the general proof: Supposesqrt(X) is rational, then there exists integers p and q such that (p/q)^2 = 2, we can cancel any common factors out of p and q so these are the simplest integers which satisfy the equation.

User Mandeep Pasbola
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5.4k points
6 votes

Answer:

The square root of any prime number must be an irrational number. For example, because of this proof we can quickly determine that √3, √5, √7, or √11 are irrational numbers...

User Boydenhartog
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4.6k points
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