Math, asked by riyabaliyan1615, 1 year ago

Prove that √5 is an irrational number and hence prove that (2-√5) is also an irrational number

Answers

Answered by sugaMinyoongi
2

Answer:

 \sqrt{5}

is and irrational but in 2-

 \sqrt{5}

because it is an expression in which an under root no. is there butin rational an irrational the irrational no does not contain any under root no.

is

Answered by Anonymous
8

Answer:

Let's prove this by the method of contradiction-

Say, √5 is a rational number. ∴ It can be expressed in the form p/q where p,q are co-prime integers.

⇒√5=p/q

⇒5=p²/q² {Squaring both the sides}

⇒5q²=p² (1)

⇒p² is a multiple of 5. {Euclid's Division Lemma}

⇒p is also a multiple of 5. {Fundamental Theorm of arithmetic}

⇒p=5m

⇒p²=25m² (2)

From equations (1) and (2), we get,

5q²=25m²

⇒q²=5m²

⇒q² is a multiple of 5. {Euclid's Division Lemma}

⇒q is a multiple of 5.{Fundamental Theorm of Arithmetic}

Hence, p,q have a common factor 5. this contradicts that they are co-primes. Therefore, p/q is not a rational number. This proves that √5 is an irrational number.

For the second query, as we've proved √5 irrational. so 2-√5 also irrational number

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