To prove that the sum of a rational number and an irrational number is irrational, we can use a method based on the definition of rational and irrational numbers and their properties.
Definitions:
- A rational number can be expressed as the fraction \( \frac{p}{q} \), where \( p \) and \( q \) are integers and \( q \neq 0 \).
- An irrational number cannot be expressed as a fraction of two integers; its decimal representation is non-repeating and non-terminating.
Proof: Let \( r \) be a rational number and \( i \) be an irrational number.
Assume for a moment that the sum \( s = r + i \) is rational. This means that \( s \) can be expressed as \( \frac{m}{n} \) for some integers \( m \) and \( n \) (where \( n \neq 0 \)).
Now, we can isolate \( i \): \[ i = s - r \] Since \( s \) is rational (by our assumption) and \( r \) is also rational (by given), the difference \( s - r \) must also be rational because the set of rational numbers is closed under addition and subtraction.
This leads to a contradiction because we started with the assumption that \( i \) is irrational. Therefore, our assumption that the sum \( r + i \) is rational must be false. Thus:
Conclusion: The sum of a rational number and an irrational number must be irrational.
Answering the options provided:
- A: The sum or difference of two rational numbers is a rational number. (True, but not directly relevant to proving our statement.)
- B: Irregular numbers can be added or subtracted; the sum or difference of two irrational numbers is NOT necessarily rational. (This statement needs clarification as the sum or difference can either be rational or irrational.)
- C: The sum of an irrational and a rational number cannot be predicted. (This suggests uncertainty, but our proof shows that it is definitively irrational.)
- D: This option is not making a correct statement in the context.
Thus, the correct understanding from these statements is that the proof hinges on the closure property of rational numbers, which helps illustrate that the sum of a rational number and an irrational number cannot be rational.