Are the square roots of all positive integers irrational? If not, give an example of the square root of a number that is a rational number.
Solution:
If numbers such as $\sqrt{4}=2, \sqrt{9}=3$ are considered,
Then here, 2 and 3 are rational numbers. Thus, the square roots of all positive integers are not irrational.
Then here, 2 and 3 are rational numbers. Thus, the square roots of all positive integers are not irrational.