Lesson 4: Introduction to Division

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What is division?

Division is splitting something equally. For instance, let's say you have 10 raffle tickets, and you'd like to share them with 5 friends.

You divide the tickets among your friends. Each friend gets an equal number of tickets.

See how they each have 2 tickets? When you divide 10 tickets among your five friends, you create 5 equal groups of 2 tickets.

Division happens a lot in real life. For instance, consider the situation below.

  • Imagine we have 6 cupcakes...

  • Imagine we have 6 cupcakes... and 2 empty trays.

  • We'll place an equal number of cupcakes on each tray. In other words, we'll divide the cupcakes between the two trays.

  • We'll place an equal number of cupcakes on each tray. In other words, we'll divide the cupcakes between the two trays.

  • We'll place an equal number of cupcakes on each tray. In other words, we'll divide the cupcakes between the two trays.

  • We'll place an equal number of cupcakes on each tray. In other words, we'll divide the cupcakes between the two trays.

  • We'll place an equal number of cupcakes on each tray. In other words, we'll divide the cupcakes between the two trays.

  • We'll place an equal number of cupcakes on each tray. In other words, we'll divide the cupcakes between the two trays.

  • We'll place an equal number of cupcakes on each tray. In other words, we'll divide the cupcakes between the two trays.

  • The six cupcakes have been divided into 2 equal groups.

  • Let's count the cupcakes to find out how many are in each group.

  • Let's count the cupcakes to find out how many are in each group.

  • Let's count the cupcakes to find out how many are in each group.

  • Let's count the cupcakes to find out how many are in each group.

  • Let's count the cupcakes to find out how many are in each group.

  • Let's count the cupcakes to find out how many are in each group.

  • Let's count the cupcakes to find out how many are in each group.

  • Each tray has 3 cupcakes. If you start with six cupcakes and divide them into two equal groups, then each group has three cupcakes.

Writing division expressions

In the slideshow, you saw that we divided six cupcakes into two equal groups. To figure out the number of cupcakes that are in each group, you could write a division expression like this:

6 / 2

You could also write the expression like this:

6 ÷ 2

You can read either expression as six divided by two. The division sign (/ or ÷) means something is being divided. This is why we always put it after the first number — there were 6 cupcakes, and we divided them into 2 groups.

Many real-life situations can be expressed with division. For example, imagine you're placing 15 cans on 3 shelves. You can divide to make sure you put the same number of cans on each shelf. In other words, 15 cans divided by three shelves, or 15 / 3.

Try this!

Try setting up these situations as division expressions. Don't try to solve them yet.

A teacher has 16 pencils that she distributes evenly between 4 students.

A florist has 18 roses and divides them equally between 3 vases.

You have 6 treats to share equally with your 3 dogs.

Solving division problems

You can use counting to solve simple division problems. For instance, let's say we have 12 seedlings. We decide to plant them in two even rows. How many plants go in each row? We could write that question like this:

12 / 2

Remember, that expression means 12 divided by two, or 12 seedlings divided into 2 rows. It's a simple problem. To solve it, you can put the seedlings into two groups and then count how many plants are in each group. The answer is 6. We know that 12 / 2 = 6.

While counting works for problems that begin with small numbers, a problem that begins with a large number can take a long time to solve with counting. For this reason, most people memorize common division problems so that they can solve them quickly. If this sounds hard, don't worry. With some practice, you'll be able to quickly remember the answers.

In Introduction to Multiplication, you were introduced to the times table. In that lesson, you used it to solve multiplication problems. You can also use the times table to solve division problems.

Let's start with a problem we're already familiar with. How would we have solved the seedling problem with the times table?

Click through the slideshow below to learn how.

  • Remember, each number at the top of the times table is at the start of a column.

  • For example, this is the column that goes with 7.

  • Each number on the left side of the times table is the start of a row. This row goes with 9.

  • Let's try solving the seedling problem: 12 / 2.

  • First, find the number that you are dividing by on the right of the division sign. In 12/2 we're dividing by 2.

  • Find the 2's column.

  • Next, find the number that you're dividing on the left of the division sign. In 12/2 it's 12.

  • Find 12 in the 2's column.

  • Find the number at the start of the row that overlaps 12. In this case, it's the 6's row.

  • So, the answer, or quotient for 12 / 2 is 6.

  • Let's try that once more. This time, we'll solve 15 / 5.

  • First, we'll find the 5's column since we are dividing by 5.

  • Next, we'll find 15 in the 5's column since that is the number we are dividing.

  • Finally, we'll find the number at the start of the row that overlaps 15. It's 3. So, 15 / 5 = 3.

Try this!

Solve these division problems. If you need some help, you can use the times table.

42 ÷ 7 =
5 ÷ 1 =
33 ÷ 3 =

Remainders

In the previous pages, we divided numbers equally. For instance, at the beginning of the lesson, we divided 10 tickets equally between 5 people. Each person received 2 tickets. What happens when a number can't be equally divided?

For example, consider the situation below.

  • Let's say we have 10 tickets...

  • Let's say we have 10 tickets... that we are dividing between 3 friends.

  • We'll try solving the problem 10 / 3.

  • Let's see how many tickets we can give to each of our friends...

  • Let's see how many tickets we can give to each of our friends...

  • Let's see how many tickets we can give to each of our friends... One...

  • Let's see how many tickets we can give to each of our friends... One...

  • Let's see how many tickets we can give to each of our friends... One...

  • Let's see how many tickets we can give to each of our friends... One... Two...

  • Let's see how many tickets we can give to each of our friends... One... Two...

  • Let's see how many tickets we can give to each of our friends... One... Two...

  • Let's see how many tickets we can give to each of our friends... One... Two... Three.

  • What happens now? We have 3 friends and only 1 ticket is left.

  • That means 1 is the remainder, or the amount left over.

  • We're ready to write our quotient.

  • Each friend has three tickets, so we'll write 3.

  • Then, we'll write our remainder. That's 1. See how we wrote it next to the lowercase letter r?

  • So, 10 / 3 = 3 r1. We can read this quotient as three remainder one. 10 tickets divided by 3 friends means each friend gets 3 tickets with 1 ticket left over.

You can see from the slideshow that the remainder (1) is smaller than the number we divided by (3). That will always be the case when the problem has a remainder. For example, look at each of these problems below:

21 / 5 = 4 r1

The remainder of 1 is smaller than 5.

76 / 6 = 12 r4

The remainder of 4 is smaller than 6.

If the remainder is larger, that means the amount left over is too large. You'll need to try dividing again. For example, if you have 4 friends and 7 tickets left over, you know that each friend can get at least one more ticket.

Practice!

Practice division with these problems. If you'd like, you can use the times table for help. There are 3 sets of problems with 5 problems each.

Set 1

72 ÷ 9 =
64 ÷ 8 =
70 ÷ 10 =
55 ÷ 11 =
21 ÷ 3 =

Set 2

35 ÷ 5 =
32 ÷ 4 =
72 ÷ 6 =
12 ÷ 2 =
28 ÷ 7 =

Set 3

6 ÷ 1 =
81 ÷ 9 =
24 ÷ 3 =
49 ÷ 7 =
144 ÷ 12 =

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