Prove that √5 is an irrational number

Proof

We prove this by contradiction.

Assume that √5 is a rational number.

Then it can be expressed in the form:

√5 = a / b

where a and b are integers having no common factor other than 1, and b ≠ 0.

Step 1: Square both sides

√5 = a / b

5 = a² / b²

⇒ a² = 5b²

Step 2: Analyze the equation

From a² = 5b², we see that is divisible by 5. This implies that a is divisible by 5.

Let a = 5k, where k is an integer.

Step 3: Substitute the value of a

a² = (5k)²

a² = 25k²

Substitute into the equation:

25k² = 5b²

⇒ b² = 5k²

This shows that is also divisible by 5, and hence b is divisible by 5.

Step 4: Reach a contradiction

Now both a and b are divisible by 5. This contradicts the assumption that a and b have no common factor other than 1.

Conclusion

Our assumption that √5 is a rational number is false.

∴ √5 is an irrational number.

Hence proved.

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