Prove that √2-√5 is an irrational number

1.	Prove that √2-√5 is an irrational number
Answer» ong>Step-by-step EXPLANATION: LET us assume that √2+√5 is a rational number. A rational number can be written in the form of p/q where p,q are integers and q≠0 √2+√5 = p/q On SQUARING both sides we get, (√2+√5)² = (p/q)² √2²+√5²+2(√5)(√2) = p²/q² 2+5+2√10 = p²/q² 7+2√10 = p²/q² 2√10 = p²/q² – 7 √10 = (p²-7q²)/2Q p,q are integers then (p²-7q²)/2q is a rational number. Then √10 is also a rational number. But this contradicts the fact that √10 is an irrational number. Our assumption is incorrect √2+√5 is an irrational number. Hence PROVED.

Answer»

ong>Step-by-step EXPLANATION:

LET us assume that √2+√5 is a rational number.

A rational number can be written in the form of p/q where p,q are integers and q≠0

√2+√5 = p/q

On SQUARING both sides we get,

(√2+√5)² = (p/q)²

√2²+√5²+2(√5)(√2) = p²/q²

2+5+2√10 = p²/q²

7+2√10 = p²/q²

2√10 = p²/q² – 7

√10 = (p²-7q²)/2Q

p,q are integers then (p²-7q²)/2q is a rational number.

Then √10 is also a rational number.

But this contradicts the fact that √10 is an irrational number.

Our assumption is incorrect

√2+√5 is an irrational number.

Hence PROVED.

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Prove that √2-√5 is an irrational number​

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Prove that √2-√5 is an irrational number