Prove that 2 − 3√5 is an irrational number.

1.	Prove that 2 − 3√5 is an irrational number.
Answer» Let’s assume on the contrary that 2 – 3√5 is a rational number. Then, there exist co prime positive integers a and b such that 2 – 3√5 = \(\frac{a}{b}\) ⇒ 3√5 = 2 – \(\frac{a}{b}\) ⇒ √5 = \(\frac{(2b – a)}{(3b)}\) ⇒ √5 is rational [∵ 3, a and b are integers ∴ \(\frac{(2b – a)}{(3b)}\) is a rational number] This contradicts the fact that √5 is irrational. So, our assumption is incorrect. Hence, 2 – 3√5 is an irrational number.

Answer»

Let’s assume on the contrary that 2 – 3√5 is a rational number.

Then, there exist co prime positive integers a and b such that

2 – 3√5 = \(\frac{a}{b}\)

⇒ 3√5 = 2 – \(\frac{a}{b}\)

⇒ √5 = \(\frac{(2b – a)}{(3b)}\)

⇒ √5 is rational [∵ 3, a and b are integers ∴ \(\frac{(2b – a)}{(3b)}\) is a rational number]

This contradicts the fact that √5 is irrational. So, our assumption is incorrect.

Hence, 2 – 3√5 is an irrational number.

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