When we need to divide a three digit number, such as $400$400 by a one digit number, such as $8$8, we can use arrays and area models to help us.
We can also start with a simpler problem, such as $40$40 divided by $8$8, (also written as $40\div8$40÷8) which helps us as well.
Let's use an area model to find the answer to $133\div7$133÷7.
We set up the area model using a rectangle like this.
$7$7 | |
Total area: $133$133 |
Now if we don't know straight away what $133\div7$133÷7 is, we start with something we do know, like groups of $10$10.
Fill in the area used so far if we take out $10$10 groups of $7$7.
$10$10 | ||
$7$7 | $\editable{}$ | |
Total area: $133$133 |
How much area is remaining?
$10$10 | ||
$7$7 | $70$70 | $\editable{}$ |
Total area: $133$133 |
What is the width of the second rectangle?
$10$10 | $\editable{}$ | |
$7$7 | $70$70 | $63$63 |
Total area: $133$133 |
Using the area model above, what is $133\div7$133÷7?
We want to find $108\div6$108÷6.
Fill in the boxes to complete the area model.
$10$10 | $\editable{}$ | |
$6$6 | $\editable{}$ | $\editable{}$ |
Total area: $108$108 |
Using the area model above, what is $108\div6$108÷6?
We want to find $138\div6$138÷6.
Fill in the widths of the rectangles on the area model.
$\editable{}$ | $\editable{}$ | |
$6$6 | $66$66 | $72$72 |
Total area: $138$138 |
Using the area model above, what is $138\div6$138÷6?