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Question
Prove that `5 - 2sqrt3` is an irrational number. It is given that `sqrt3` is an irrational number.
Sum
Solution
Let's assume that `5 - 2sqrt3` is rational.
Therefore, it can be expressed in the form of `p/q` where p and q are integers and q ≠ 0
Therefore, we write `5 - 2sqrt3 = p/q`
or, `2sqrt3 = 5 - p/q`
or, `sqrt3 = (5q - p)/(2q)`
But `(5q - p)/(2q)` is a rational number as p and q are integers. This contradicts the fact that `sqrt3` is irrational, so our assumption is wrong.
Hence `5 - 2sqrt3` is an irrational number.
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