First of all, we need to be clear about what is the first and last term of comparison. Assuming that the first term of the ratio is A, the second term is B, and the quotient obtained by dividing the former term by the latter term is a ÷ B, using the mathematical formula, we can express it as: Quotient =a÷b Now that we have the model, the next step is calculation.

The calculation result is: the quotient obtained by dividing the former item by the latter item, so the quotient obtained by dividing the former item by the latter item is called the quotient obtained by dividing the former item by the latter item. This quotient represents the proportional relationship between two numbers in mathematics. The quotient obtained by dividing the former term by the latter term can be used to compare the relative sizes of two quantities or to calculate the value of a quantity.

For example, if there is a ratio of a:b, then a÷b indicates how many times A is B. If a=3 and b=5, then a÷b=3÷5, and this quotient will tell us how many times 3 is 5. In addition, the quotient obtained from the ratio of the former term can also be used to solve some mathematical problems.

For example, when solving the area or volume of a geometric figure, we may need to find the ratio of the relevant line segments or side lengths first, and then solve the area or volume through this ratio. In a word, the quotient obtained by dividing the former term by the latter term is an important mathematical concept, which can express the proportional relationship between two numbers and can be used to compare the sizes of numbers and solve some mathematical problems.

These properties are very useful in solving some mathematical problems, for example, in solving some geometric problems, we may need to first find the ratio of related line segments or side lengths, and then find the area or volume through this ratio. In addition, this concept can be extended to a wider range of fields. For example, in economics, we can use this concept to compare the prices or costs of different products.

In sociology, we can use this concept to compare the population or economic indicators of different countries or regions and so on. The quotient obtained by dividing the former term of the ratio by the latter term is a very important mathematical concept, which is not only widely used in mathematics, but also can be extended to other fields.