All integers are rational numbers. There are integers with an i behind them that are imaginary numbers. They are not real numbers but they are rational. The square root of 2 is irrational. It is real but irrational.
All integers are rational. Not all rational numbers are integers.
-3 is a real, rational, whole integer. But then, -- All integers are real rational whole numbers. -- All whole numbers are real rational integers. -- All rational numbers are real. -- All counting numbers are real, rational, whole integers.
Any 2 digit integers are rational numbers because all integers or whole numbers are rational numbers.
All integers are rational numbers.
That's a true statement. Another true statement is: All integers are rational numbers.
All integers are rational numbers. There are integers with an i behind them that are imaginary numbers. They are not real numbers but they are rational. The square root of 2 is irrational. It is real but irrational.
All integers are rational numbers.
Rational numbers are integers and fractions
All integers are rational. Not all rational numbers are integers.
No, not all rational numbers are integers. All integers are whole numbers, but a non-whole number can be rational if the numbers after the decimal point either 1. end or 2. repeat. So, sometimes rational numbers are integers, sometimes they're not. But all integers are rational numbers.
Integers are aproper subset of rational numbers.
It is true.
because not all rational numbers are integers, recurring numbers, numbers to 1 decimal place and fractions are rational as well but all integers are rational
Yes, it is both. All integers are rational numbers.Yes, it is both. All integers are rational numbers.Yes, it is both. All integers are rational numbers.Yes, it is both. All integers are rational numbers.
Not necessarily true. All integers are rational numbers, though, because an integer x can be expressed as a ratio of two integers (e.g. x/1).
All integers are rational numbers. As a result, there are no such numbers. There is, therefore, no name for these non-existent numbers.