prove that root 3 is irrational?
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let us assume on the contrary that
3
is a rational number.
Then, there exist positive integers a and b such that
3
=
b
a
where, a and b, are co-prime i.e. their HCF is 1
Now,
3
=
b
a
⇒3=
b
2
a
2
⇒3b
2
=a
2
⇒3 divides a
2
[∵3 divides 3b
2
]
⇒3 divides a...(i)
⇒a=3c for some integer c
⇒a
2
=9c
2
⇒3b
2
=9c
2
[∵a
2
=3b
2
]
⇒b
2
=3c
2
⇒3 divides b
2
[∵3 divides 3c
2
]
⇒3 divides b...(ii)
From (i) and (ii), we observe that a and b have at least 3 as a common factor. But, this contradicts the fact that a and b are co-prime. This means that our assumption is not correct.
Hence,
3 is an irrational number.
Verified answer
♦ Answer: Let us assume 4 – 5√3 be a rational number. ⇒ 4 – 5√3 = a/b
Where a, b are integers and b ≠ 0.
⇒ – 5√3 = a/b -4
⇒ √3 = 4/5 – a
LHS is √3 which is an irrational number.
RHS is a rational number.
LHS ≠ RHS
∴ our assumption is wrong. 4 – 5√3 is an irrational number.
♦Given: √5
We need to prove that √5 is irrational
Proof:
Let us assume that √5 is a rational number.
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