Math, asked by PRINCEkifanKIRAN, 1 month ago

Q1.Given that √2 and √3 are irrational, prove that the following are irrational 3 - 5√2​.

Answers

Answered by PRINCE100001
6

Step-by-step explanation:

S O L U T I O N :

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We're given with two irrational numbers √2 and √3. We've to prove that 3 – 5√2 is an irrational number. To do so, we'll assume as that the given number 3 – 5√2 is an rational number. As we know that, rational numbers are the numbers which can be written in the form of ᵐ⁄ₙ, where n ≠ 0.

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Let's say, that 3 – 5√2 is an rational number. So, we can write it in the form of ᵐ⁄ₙ.

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\begin{gathered}\longrightarrow\sf 3 - 5\sqrt{2} =\Bigg(\dfrac{m}{n}\Bigg)\\\\\end{gathered} </p><p>

\begin{gathered}\longrightarrow\sf -5\sqrt{2} =\Bigg(\dfrac{m}{n}\Bigg) - 3\\\\\end{gathered} </p><p>

\begin{gathered}\longrightarrow\sf -5\sqrt{2} = \Bigg(\dfrac{m - 3n}{n}\Bigg)\\\\\end{gathered} </p><p>

\begin{gathered}\longrightarrow\sf \sqrt{2} = \Bigg(\dfrac{m - 3n}{-3n}\Bigg)\\\\\end{gathered} </p><p>

\longrightarrow\sf\sqrt{2} = \Bigg(\dfrac{3n - m}{3n}\Bigg) </p><p>

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Here, we can see that 3n – m/3n is an rational number but it is given that √2 is an irrational number and both are equal to each other and this arises the contradiction the fact that √2 is an irrational number.

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∴ Therefore, 3 – 5√2 is an irrational number.

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⠀⠀⠀⠀⠀⠀⠀⠀∴ Hence, Proved!

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