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Question
State with reason, whether the following is a surd.
`sqrt(sqrt(3) - sqrt(2))`
Give Reasons
Sum
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Solution
`sqrt(sqrt(3) - sqrt(2))` is a surd
Reason:
A surd is an irrational number expressed using roots.
Let `x = sqrt(sqrt3 − sqrt2)`.
If x were rational then x2 would be rational.
But `x^2 = sqrt3 − sqrt2`, so `sqrt3 − sqrt2` would be rational.
Suppose `sqrt3 − sqrt2` = r (r rational).
Then `sqrt3 = r + sqrt2` and squaring both sides gives `3 = r^2 + 2 + 2rsqrt2`, so `2rsqrt2 = 1 - r^2` and hence `sqrt2 = (1 - r^2)/(2r)`, which is rational a contradiction (`sqrt(2)` is irrational).
Therefore, `sqrt3 − sqrt2` is irrational, so x2 is irrational, so x is irrational.
Since x is an irrational number given by a root, it is a surd.
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Chapter 1: Rational and Irrational Numbers - EXERCISE 1C [Page 15]
