The grid method is a written method of multiplication that is used to multiply two numbers that contain more than one digit. It involves partitioning the numbers into their place value columns and multiplying each part separately. These results are written in a grid and the final answer is found by adding them up to make a total.
Grid method multiplication may also be referred to as box method multiplication or grammar school multiplication.
Here is an example of the grid method used to multiply 254 × 63.
The two numbers are partitioned into 200 + 50 + 4 and 60 + 3.
In the grid method, each box has two partitioned numbers next to it. One number is above the box and one number is to the left of the box.
We multiply these two numbers together and write the answer in each box of the grid.
We’ll start with 200 x 60.
So, 200 x 60 = 12 000
We write ‘12 000’ where their column and row meet.
Next, we’ll multiply 200 by 3.
So, 200 x 3 = 600
We write ‘600’ in the corresponding box.
Now, we’ll multiply 50 by 60.
So, 50 x 60 = 3000
Now, we’ll multiply 50 by 3.
Now, we’ll multiply 4 by 60.
Finally, we’ll multiply 4 by 3.
Once all of the boxes in the grid are filled, these answers are added together to make a total.
We can add the numbers row by row and use column addition.
We’ll begin by adding the numbers in the first row of our grid.
12 000 + 600 = 12 600
Next, we add the numbers in the middle row of our grid.
3000 + 150 = 3150
Finally, we add the numbers in the bottom row of our grid.
We can now use column addition to find the total of the row totals.
12 600 + 3150 + 252 = 16 002.
Therefore 254 x 63 = 16002.
The grid method is used to provide structure to multiplying larger numbers as an alternative to long multiplication. This structure generally helps students to avoid mistakes as it breaks the multiplication down further and is easier to understand.
Whilst the grid method can be used as an alternative to the long multiplication method, an understanding of grid method multiplication is worthwhile in itself as the same concepts of multiplication can be applied to other mathematical topics such as area and algebra.
To do the grid method of multiplication, follow these steps:
For example, here is the grid method of multiplying 24 x 15 step-by-step.
The first step is to draw a grid containing the same number of rows as the number of digits in the first number and the same number of columns as the number of digits in the second number.
Both of the numbers 24 and 63 have 2 digits and so, we draw a grid with 2 rows and 2 columns.
The second step is to partition each number into its place value columns and write these above and to the left of each box respectively.
24 = 20 + 4 and 63 = 60 + 3.
The next step is to multiply the numbers above and to the left of each box and write the answer inside each box.
We’ll start with 20 x 10.
20 x 10 = 200
Next, we’ll multiply 20 by 5.
We write ‘100’ in the corresponding box.
Now, we’ll multiply 10 by 4.
Finally, we’ll multiply 4 by 5.
The next step is to add the numbers in each box of the grid to find the total. We can add the numbers row by row to break this down.
We’ll start by adding the first row of our grid and writing the answer in the box at the end of this first row.
Next, we’ll add the second row of our grid.
bottom row of sub-calculations" width="740" height="433" />
The sum of the two row totals is 300 + 60 = 360.
Therefore using grid method multiplication, 24 x 15 = 360.
Now try our lesson on Lattice Multiplication where we learn how to use the lattice method of multiplication.
