what are the seven properties of rational numbers
No because they have different mathematical properties
Dividing rational numbers involves inverting the divisor and multiplying, which can help simplify calculations. The result of dividing two rational numbers is also a rational number, provided the divisor is not zero. Additionally, the process demonstrates that division can be viewed as multiplication by the reciprocal, maintaining the properties of rational numbers throughout. Overall, understanding this concept is crucial for effectively working with fractions and ratios in mathematics.
All rational numbers are real numbers.
yes * * * * * No. Rational and irrational numbers are two DISJOINT subsets of the real numbers. That is, no rational number is irrational and no irrational is rational.
All prime numbers are rational.
i m stuck on it too
They are real numbers, so they share all the properties of real numbers.
No because they have different mathematical properties
If there are no numbers after the 9 it is rational
No, the two are mutually exclusive properties. One or the other, never both.
No. Rational numbers are numbers that can be written as a fraction. All rational numbers are real.
The set of rational numbers includes all whole numbers, so SOME rational numbers will also be whole number. But not all rational numbers are whole numbers. So, as a rule, no, rational numbers are not whole numbers.
Rational numbers are numbers that can be written as a fraction. Irrational numbers cannot be expressed as a fraction. All natural numbers are rational.
6.6 is rational. Rational numbers are numbers that can be written as a fraction. Irrational numbers cannot be expressed as a fraction.
The set of rational numbers includes the set of natural numbers but they are not the same. All natural numbers are rational, not all rational numbers are natural.
All rational numbers are not whole numbers, as rational numbers can include fractions.
They do not. There is no relationship between rational numbers and rational decisions.