1、2÷3/5=2×5/3= 10/3

2、6÷2/7=6×7/2=2 1

3、 10/3÷5/6= 10/3×6/5=4

4、4/7÷8/9=4/7×9/8=6/7

5、9/ 10÷3/4=9/ 10×4/3=6/5

Apply it to real life.

Fractional division can be used to solve many practical problems. For example, when sharing candy, if a * * * has 8 pieces of candy, and three of them share it equally, how many pieces of candy does each person get? Can be calculated by fractional division: 8/3=8÷3=2 (block) +2/3 (block). Where 2 is an integer part and 2/3 is a decimal part, indicating the number of sweets for three people.

Extend to multiple fractional divisions

Fractional division can be extended to multiple fractional divisions. For example, if you have three grades: a/b÷c/d÷e/f, you can divide them first and then divide them. Such as: (a×d×f)/(b×c×e). In addition, parentheses can also be used to indicate the order of division, such as: a/b ÷ (c/d ÷ e/f) = a/b ÷ c/d× e/f = (a× d× e)/(b× c× f).

Conversion between decimal and integer

Fractional division can be converted into decimals or integers. For example, a score of 4/5 divided by 2 can get 0.8 or 1 (because 4÷5=0.8). Therefore, a fraction divided by an integer equals a decimal divided by an integer. If the decimal number is 0.8, it can be calculated by fractional division: 8/ 10=0.8. So decimals and fractions can be converted to each other.

Fractional division is an important concept in mathematics, which refers to the result of dividing two or more fractions. Division can be regarded as the inverse operation of multiplication, that is, if the product of two numbers and the result of division between a number and the product are known, the number can be obtained through a series of equations. In fractional division, this number can be an integer, a fraction or a decimal.