2. Prove that 3+25 is irrational
Answers
Answer:
So,3+2√5 is equal to ab. In the above expression, “a” & “b” are co prime (meaning HCF (a, b) is equal to 1). Now, the expression a−3b2b is a rational number because the definition of a rational number states that it is a number which is in the form of pq where p and q are integers and q≠0.
Given :
To prove: 3 + 2√5 is an irrational number.
Proof :
Let us assume that 3 + 2√5 is a rational number.
So, it can be written in the form a/b 3 + 2√5 = a/b
Here a and b are coprime numbers and b ≠ 0
Solving 3 + 2√5 = a/b we get,
=>2√5 = a/b – 3
=>2√5 = (a-3b)/b
=>√5 = (a-3b)/2b
This shows (a-3b)/2b is a rational number. But we know that √5 is an irrational number.
So, it contradicts our assumption. Our assumption of 3 + 2√5 is a rational number is incorrect.
3 + 2√5 is an irrational number