How can you describe a rational number as a quotient when the divisor is not zero?(1 point)
Responses
A rational number is a fraction that includes all integers.
A rational number is a fraction that includes all integers.
A rational number is a fraction.
A rational number is a fraction.
All numbers are rational numbers.
All numbers are rational numbers.
A rational number is a fraction that includes all integers except for when zero is the divisor.
A rational number can be described as a quotient when the divisor is not zero because a quotient represents the result of dividing one number (the numerator) by another number (the divisor). In the case of rational numbers, both the numerator and the divisor are integers, and dividing one integer by another will result in a rational number. As long as the divisor is not zero, the rational number can be represented as the quotient of the numerator divided by the divisor. However, if the divisor is zero, the division is undefined and no rational number can be obtained.
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What is the answer the question?!
The answer to the question is that a rational number can be described as a quotient when the divisor is not zero.
A rational number can be described as a quotient when the divisor is not zero. Specifically, a rational number is a fraction that includes all integers except for when the divisor is zero.
To describe a rational number as a quotient when the divisor is not zero, you can understand that a rational number is indeed a fraction. A fraction represents a division operation, where the numerator is divided by the denominator. The numerator and the denominator can be any integers, except that the denominator cannot be zero.
Therefore, a rational number can be written as a quotient by placing the numerator over the denominator, separated by a slash (/). The numerator represents the dividend, and the denominator represents the divisor. For example, 3/4 is a rational number because it can be interpreted as the division operation 3 ÷ 4.
Note that all numbers are not rational numbers. Irrational numbers, such as pi (π) or the square root of 2 (√2), cannot be expressed as a quotient of two integers. Only fractions, which are ratios of two integers, are considered rational numbers.