Prove that 5-2√3 is a irrational number
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Step-by-step explanation:
Here is your answer:
To prove:
5 - 2√3 is irrational.
Assumption:
Let us assume 5 - 2√3 to be " a " and it is rational.
Proof,
As, 5 - 2√3 Is rational it can be written in the form of p/q where q ≠ 0.
(p , q are coprime)
Then,
5-2 \sqrt{3} = \frac{p}{q}5−2
3
=
q
p
→ -2 \sqrt{3} = \frac{p}{q} - 5−2
3
=
q
p
−5
→ - 2 \sqrt{3} = \frac{p-5q}{2}−2
3
=
2
p−5q
→ \sqrt{3} = - ( \frac{p-5q}{2q})
3
=−(
2q
p−5q
)
We know that ,
√3 is irrational .
And, - ( \frac{p-5q}{2q})−(
2q
p−5q
) is rational.
We know that ,
Irrational ≠ rational..
So, we contradict the statement that 5 - 2 √ 3 is rational.
Therefore 5 - 2√3 is an irrational number
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