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Rational Plus Irrational Is Irrational

Authors
  • avatar
    Name
    Vu Hung
    Twitter

Problem Statement

If aa is rational and bb is irrational, prove that a+ba + b is irrational.


Hints

Use proof by contradiction. Assume a+ba + b is rational, then solve for bb in terms of rational numbers. What property of rational numbers does this contradict?


Solutions

Proof by Contradiction:

Assume, for contradiction, that a+ba + b is rational.

Since aa is rational and a+ba + b is rational (by assumption), we can write:

a=pqwhere p,qZ,q0a+b=rswhere r,sZ,s0\begin{aligned} a &= \frac{p}{q} \quad \text{where } p, q \in \mathbb{Z}, q \neq 0 \\ a + b &= \frac{r}{s} \quad \text{where } r, s \in \mathbb{Z}, s \neq 0 \end{aligned}

Solving for bb:

b=(a+b)a=rspq=rqpssqb = (a + b) - a = \frac{r}{s} - \frac{p}{q} = \frac{rq - ps}{sq}

Since r,q,p,sr, q, p, s are all integers and sq0sq \neq 0, this shows bb is expressible as a ratio of two integers.

Therefore, bb must be rational, which contradicts the given condition that bb is irrational.

Hence, our assumption was false, and a+ba + b must be irrational. \blacksquare


Takeaways

  • Reconstruct the full proof from the hint and the solution outline, and justify every transformation explicitly.
  • Check edge cases and verify where each assumption is used in the argument.

Further Readings

If you found this proof interesting, be sure to check out these relevant HSC booklets to sharpen your reasoning skills:


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