2-√3 is irrational . prove it . given √3 is irrational
Answers
Answer:
To prove: 2 + 3 3 is irrational, let us assume that 2 + 3 3 is rational. 2 + 3 3 = a b ; b ≠ 0 and a and b are integers. Since a and b are integers so, a - 2 b will also be an integer. ... Thus, 2 + 3 3 is irrational.
Answer:
To prove: 2 + 3 3 is irrational, let us assume that 2 + 3 3 is rational. 2 + 3 3 = a b ; b ≠ 0 and a and b are integers. Since a and b are integers so, a - 2 b will also be an integer. ... Thus, 2 + 3 3 is irrational.
Step-by-step explanation:
9th
Maths
Number Systems
Irrational Numbers
Prove that √(2) + √(3) is i...
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Asked on December 20, 2019 by
Aakash Jerushah
Prove that
2
+
3
is irrational
EASY
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ANSWER
Let us assume that
2
+
3
is a rational number
Then. there exist coprime integers p, q,q
=0 such that
2
+
3
=
q
p
=>
q
p
−
3
=
2
Squaring on both sides, we get
=>(
q
p
−
3
)
2
=(
2
)
2
=>
q
2
p
2
−2
q
p
3
+(
3
)
2
=2
=>
q
2
p
2
−2
q
p
3
+3=2
=>
q
2
p
2
+1=2
q
p
3
=>
q
2
p
2
+q
2
×
2p
q
=
3
=>
2pq
p
2
+q
2
=
3
Since, p,q are integers,
2pq
p
2
+q
2
is a rational number.
=>
3
is a rational number.
This contradicts the fact that
3
is irrational.
Thus, our assumption is incorrect.
Therefore,
2
+
3
is a irrational.