How can you describe a rational number as a quotient when the divisor is not zero? ,.
A rational number can be described as a quotient when the divisor is not zero because a rational number is defined as a number that can be expressed as the quotient or fraction of two integers: the numerator and the denominator. The numerator represents the dividend and the denominator represents the divisor. As long as the divisor (denominator) is not zero, the rational number can be expressed as the quotient of these two integers.
To describe a rational number as a quotient when the divisor is not zero, you need to understand that a rational number can be expressed as the ratio of two integers.
Let's say we have a rational number, x, where x can be written as a fraction, p/q. Here, p and q are integers, and q cannot be zero.
In this case, p is the numerator and q is the denominator. The numerator represents the number being considered, and the denominator represents the number of parts into which the whole has been divided.
For example, if we have the rational number 3/5, the numerator is 3, and the denominator is 5. This means we have divided a whole into 5 equal parts, and we are considering 3 of those parts.
So, a rational number can be described as a quotient by expressing it as a fraction, where the numerator is the number being considered, and the denominator is the number of equal parts into which the whole has been divided, as long as the denominator is not zero.