Teachers should review multiplication and division facts on the board or orally and reaffirm the relationship between multiplication and division. Students should understand that when they multiply the quotient and divisor together, they will get the dividend as an answer. For example, 63 divided by 9 equals 7, and 7 times 9 equals 63. Once students have a firm grasp on quotative and partitive division, the teacher can demonstrate the relationship between fractions and division. The numerator of a fraction is like the dividend and the denominator is like the divisor.
Teachers can introduce partitive and quotative division by acting out real-world scenarios for the whole class using props and student volunteers. For example, for partitive division, the teacher can call up four volunteers to the front of the class; each student represents one group. The teacher has 16 items and starts passing out one prop to each student, while asking the class how many items each student will receive. To act out a quotative real-world scenario, the teacher can tell the class that each person needs two socks and that she has 12. She starts passing out two socks to each student while asking the class how many students (or groups) will receive the appropriate amount of socks. For each role-play, the teacher should follow up by writing the relevant equation on the board.
Students can complete worksheets that include both quotative and partitive division word problems. For the initial worksheets, teachers should show students how to illustrate each scenario. For example, for a question that says, "Two people were given eight hot dogs; how many hot dogs does each person get?", students can draw eight hot dogs and underneath draw two people, each with four hot dogs surrounding them. Once they understand the concepts, they can simply complete word problems without drawing.
If students are doing a sheet with only division problems, they have a fairly simple task of coming up with the correct answer. But, if they are given a sheet with multiplication and division problems, they may have issues figuring out the correct operation. Teachers should read word problems aloud and see if the class can identify whether the problem requires multiplication, division, or even addition or subtraction. "Per," "groups of" and "shared equally" are examples of keywords that denote division. The Aversboro Math Resources page offers a list of keywords for each operation that teachers can teach their students.