Proof: Let us assume that √5 is a rational number. So it can be expressed in the form p/q where p,q are co-prime integers and q≠0 ⇒ √5 = p/q On squaring both the sides we get, ⇒5 = p²/q² ⇒5q² = p² —————–(i) p²/5 = q² So 5 divides p p is a multiple of 5 ⇒ p = 5m ⇒ p² = 25m² ————-(ii) From equations (i) and (ii), we get, 5q² = 25m² ⇒ q² = 5m² ⇒ q² is a multiple of 5 ⇒ q is a multiple of 5 Hence, p,q have a common factor 5. This contradicts our assumption that they are co-primes. Therefore, p/q is not a rational number √5 is an irrational number. hence proved Reply
Proof:
Let us assume that √5 is a rational number.
So it can be expressed in the form p/q where p,q are co-prime integers and q≠0
⇒ √5 = p/q
On squaring both the sides we get,
⇒5 = p²/q²
⇒5q² = p² —————–(i)
p²/5 = q²
So 5 divides p
p is a multiple of 5
⇒ p = 5m
⇒ p² = 25m² ————-(ii)
From equations (i) and (ii), we get,
5q² = 25m²
⇒ q² = 5m²
⇒ q² is a multiple of 5
⇒ q is a multiple of 5
Hence, p,q have a common factor 5. This contradicts our assumption that they are co-primes. Therefore, p/q is not a rational number
√5 is an irrational number.
hence proved