Rational numbers
They are rational fractions.
A quotient of two numbers cannot have a denominator which is zero: such a fraction is not defined.
The rational numbers. The set of rational numbers is the set of all numbers that can be expressed as p/q where p and q are integers.
The quotient of two nonzero integers is the definition of a rational number. There are nonzero numbers other than integers (imaginary, rational non-integers) that the quotient of would not be a rational number. If the two nonzero numbers are rational themselves, then the quotient will be rational. (For example, 4 divided by 2 is 2: all of those numbers are rational).
This is the definition of a rational number. The set of rational numbers is usually written as a bold Q, and stands for the Italian quoziente, which means quotient.
Any positive number can be written as a quotient of two positive numbers or a quotient of two negative numbers. Any real number can be written as the quotient of two real numbers.
If a number can be expressed as the quotient of two numbers (a ÷ b) and b is not zero, then it is a rational number.
Pi
Rational numbers are numbers that can be expressed as the quotient of two integers (3/2, 15/16). All integers, then, are rational numbers (12 = 12/1).
a fraction is the representation of a number as the quotient of two integers. all rational numbers can be written as a fraction, and all fractions represent rational numbers.
-- If the two integers have the same sign, their quotient is positive. -- If the two integers have different signs, their quotient is negative.
An Irrational Number..