The method traditionally used for multiplying two numbers of two or more digits is long multiplication, but this is quite an abstract process which is difficult to understand for many children. Grid Multiplication (also known as the Grid Method) is now taught in schools as an intermediate stage before long multiplication.

With grid multiplication, the two numbers to be multiplied are split (partitioned) up into their tens and units components - e.g. 34 = 30 + 4, or hundreds, tens, and units components - e.g. 345 = 300 + 40 + 5. (Click here for our 2-digit number partitioning worksheets and 3-digit number partitioning worksheets for partitioning practice)

The grid method enables a complex multiplication to be broken up into a collection of relatively simple multiplications followed by some column addition.

Grid Method Example

54 x 12 can be partitioned to give us (50 + 4) x (10 + 2)
this can be expanded to four simple multiplications which when added together give the final answer: (50 x 10) + (50 x 2) + (10 x 4) + (4 x 2).
This is done with the use of a grid as shown below:

x	10	2
50	500	100
4	40	8
total	540	108

Total up the columns and write the totals in the row at the bottom of the grid. Then finally add together those totals for the final answer. Here 54 x 12 = 540 + 108 = 648.

The Grid Method can be used to multiply very large numbers using a larger grid, but by the time a child is confident multiplying 3- and 4- digit numbers using grid multiplication, they are ready for long multiplication which is a faster method.

TU x TU Grid Multiplications - Pre-Partitioned

For this introduction to grid multiplication, numbers of type TU are multiplied by numbers of type TU, for example 54x13, 23x71. Both numbers to be multiplied are provided ready partitioned in the grid. These worksheets follow on from Grid Multiplication TUxU Partitioned.

Next move on to Grid Multiplication TUxTU where number partitioning and grid set up is to be done by the child.