Question

Let's evaluate each statement about the relationships between the number sets:

1. **All integers are also rational numbers.**
- **True.** An integer can be expressed as a fraction (like \( a = \frac{a}{1} \)) which makes it a rational number.

2. **Some rational numbers are also integers.**
- **True.** Specifically, any integer is a rational number (as stated above), hence at least the integers are included in the set of rational numbers.

3. **Not all natural numbers are real numbers.**
- **False.** All natural numbers (like 1, 2, 3,...) are indeed real numbers.

4. **Whole numbers include all positive and negative integers.**
- **False.** Whole numbers typically include all non-negative integers (like 0, 1, 2, 3,...), but do not include negative integers.

Based on the above evaluations, the true statements are:
- All integers are also rational numbers.
- Some rational numbers are also integers.

The other two statements are false.