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Prove that (4 + 3sqrt(5)) is irrational.

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Question

Prove that `(4 + 3sqrt(5))` is irrational.

Theorem
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Solution

Given: Let `x = 4 + 3sqrt(5)`.

To Prove: x is irrational.

Proof [Step-wise]:

1. Suppose, for contradiction, that x is rational.

Then there exist integers a, b with b ≠ 0 and gcd(a, b) = 1 such that `x = a/b = 4 + 3sqrt(5)`.

2. Rearranging, `3sqrt(5) = a/b - 4`

= `(a - 4b)/b`

So, `sqrt(5) = (a - 4b)/(3b)`. 

The right-hand side is a ratio of integers, hence `sqrt(5)` would be rational.

3. But `sqrt(5)` is known to be irrational. A standard proof: assume `sqrt(5) = p/q` in lowest terms (p, q integers, q ≠ 0).

Squaring gives p2 = 5q2, so 5 divides p2 and hence p. 

Write p = 5k; then 25k2 = 5q2, so q2 = 5k2 and 5 divides q, contradicting that p and q are coprime. 

Therefore, `sqrt(5)` is irrational.

4. The contradiction in step 2–3 shows the assumption that `x = 4 + 3sqrt(5)` is rational is false.

Therefore, `4 + 3sqrt(5)` is irrational.

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Chapter 1: Real Numbers - TEST YOURSELF [Page 45]

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R.S. Aggarwal Mathematics [English] Class 10
Chapter 1 Real Numbers
TEST YOURSELF | Q 10. | Page 45
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