Using Patterns and Mental Math to Divide
Key Concepts
Introduction
- Division of whole numbers using division patterns
- Understand to use multiples of 10
- Understand to use multiplication patterns to find the quotient
- Use basic division facts to solve mental math divisions
- Estimate using compatible numbers
- Check the reasonableness
- Understand how to use compatible numbers and patterns to divide whole numbers
Use patterns and mental math to divide
How to divide whole numbers using division patterns?
Consider the below real-life scenario to understand pattern divisions:
A bakery sells chocolates to local grocery stores in boxes; each box has 20 chocolates. How many boxes are used if 80 chocolates are sold? 800 chocolates are sold? 8000 chocolates are sold?
| Number of chocolates sold | Number of chocolates per box | Number of boxes |
| 80 | 20 | |
| 800 | 20 | |
| 8,000 | 20 |
How do you use multiplication to divide 8,000 by 20?
Solving patterns in two methods:
Method 1: Multiples of 10
Use basic facts and patterns with zeros to divide the large numbers.
Here, the basic fact is
8÷2 = 4
80÷20 = 8 tens÷2 tens = 4
(using patterns with zeros)
8,00÷20 = 80 tens÷2 tens = 40
8,000÷20 = 8,00 tens÷2 tens = 400
So, the number of chocolate boxes are:
| Number of chocolates sold | Number of chocolates per box | Number of boxes |
| 80 | 20 | 4 |
| 800 | 20 | 40 |
| 8,000 | 20 | 400 |
Method 2: Use multiplication
20×4=8020×4=80
20×40 = 800
20×400 = 8000
So,
8000÷20 = 400 boxes.
Example 1:
Find the quotient of 3,600 using basic division facts and patterns.
Solution:
Here we have to solve the question by finding the basic facts of multiplication.
Step 1: Writing each expression as a multiplication fact.
Step 2: Mark all the numbers in the basic fact to see the number of zeros to write in the quotient.
Step 3: If there is a zero, the quotient has one zero less than the dividend.
Basic division fact:
36÷6 = 6
3,60÷6 = 60
3,600÷6 = ?
Using multiplication (multiples of 10):
6×6 = 36
6×60 = 360
6×600 = 3,600
So,
3,600÷6 = 600
∴ The quotient of 3,600 is 600.
Example 2:
Using basic division facts, divide
480÷6480÷6
mentally.
Solution:
Given
480÷6
Basic fact = 48÷6 = 8
⇒ 480÷6 = 80
∴ The quotient is 80.
Estimate quotients with 2-digit divisors
How to estimate quotients using compatible numbers?
The following steps explain how do we estimate the quotients with compatible numbers:
Consider the example 298÷25, use compatible numbers to find the estimated quotient.
Solution:
Given
298÷25
Step 1: First, find the compatible numbers for 298 and 25.
25 is close to its tens place. So, 25 rounds to 30.
298 is close to its hundreds place. So, 298 rounds to 300.
∴ 30 and 300 are compatible numbers.
Step 2: Divide the compatible numbers.
Using division patterns,
300÷30 is the same as 30 tens ÷ 3 tens.
⇒ 30÷3 = 10
∴ 300÷30 = 10
Step 3: Check for reasonableness.
10 × 30 = 300
So, a good estimate of 298÷25 is 10.
Example 1:
Estimate 228÷19, using compatible numbers.
Solution:
Given
228÷19
19 is close to its tens place. So, 19 rounds to 20.
228 is close to its hundreds place. So, 228 rounds to 200.
∴ 20 and 200 are compatible numbers.
Using division patterns,
200÷20 is the same as 20 tens ÷ 2 tens.
⇒ 20÷2=1020÷2=10
∴ 200÷20 = 10
Check for reasonableness.
10 × 20 = 200
So, a good estimate of 228÷19 is 10.
Exercise
Use mental math to find the quotient for the following questions (1 – 5):
- 240 + 40 = 24tens + 4tens = ____.
- 180+ 30
- 6400 = 8
- 2,800 = 71
- 45,000 + 90
Estimate using compatible numbers for the following questions (6 – 8):
- 276 = 42.
- 5564+ 91.
- 485 = 92.
A company purchased 225 bottles of milk. Each department needs 12 bottles. Find the
compatible numbers to estimate the number of departments that can get the bottles they
need.
Nancy wants to divide 300 lemons equally among 30 baskets. How many lemons does Nancy
need to fill each basket?
What have we learned
- Understand division of whole numbers using division patterns
- Understand to use multiples of 10
- Understand to use multiplication patterns to find the quotient
- Use basic division fact to solve mental math divisions
- Estimate using compatible numbers
- Check the reasonableness
- Understand how to use compatible numbers and patterns to divide whole numbers
Concept Map
Related topics
Square 1 to 20 : Chart, Table, Perfect Squares and Examples
Square 1 to 20 When you multiply a number by itself, the result is called a square. And when you’re preparing for exams, you need to have a foundation for algebra and quick mental math because you get a really short time to do your exam. Therefore, learning the squares from one to twenty is […]
Square 1 to 40 : Table, Perfect Squares, Chart and Examples
Square 1 to 40 When you multiply a number by itself, the resulting number is a square, and if you are someone who is either appearing in a competitive exam or just wants to do well in math in school, knowing square 1 to 40 is a really important skill. But manually multiplying every time, […]
Square Root : Definition, Formula, Methods and Types Explained
Square Root Square roots are one of those seemingly daunting maths topics that appear in many different situations, from algebra to geometry. Yet the concepts behind them aren’t as hard to grasp. It makes handling numbers far easier if you know the concept well. Let us understand how to find the square roots of a number […]
Cubes 1 to 20 : Chart, Table, Memory Tricks and Examples
Most students don’t struggle much with smaller cubes like 2³ or 3³. Those usually come quickly. The hesitation starts with numbers like 11³ or 17³. Or when someone suddenly asks, what is 20 cubed? That pause is not a memory problem. It’s about the lack of proper understanding and hence confidence. Naturally, learning cubes 1 […]
Other topics
Comments: