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Study Guides > Prealgebra

Identifying Multiples of Numbers

Learning Outcomes

  • Determine whether a given number is divisible by 2,3,5, or 10
Annie is counting the shoes in her closet. The shoes are matched in pairs, so she doesn’t have to count each one. She counts by twos: 2,4,6,8,10,122,4,6,8,10,12. She has 1212 shoes in her closet. The numbers 2,4,6,8,10,122,4,6,8,10,12 are called multiples of 22. Multiples of 22 can be written as the product of a counting number and 22. The first six multiples of 22 are given below. 12=222=432=642=852=1062=12\begin{array}{l}1\cdot 2=2\\ 2\cdot 2=4\\ 3\cdot 2=6\\ 4\cdot 2=8\\ 5\cdot 2=10\\ 6\cdot 2=12\end{array} A multiple of a number is the product of the number and a counting number. So a multiple of 33 would be the product of a counting number and 33. Below are the first six multiples of 33. 13=323=633=943=1253=1563=18\begin{array}{l}1\cdot 3=3\\ 2\cdot 3=6\\ 3\cdot 3=9\\ 4\cdot 3=12\\ 5\cdot 3=15\\ 6\cdot 3=18\end{array} We can find the multiples of any number by continuing this process. The table below shows the multiples of 22 through 99 for the first twelve counting numbers.
Counting Number 11 22 33 44 55 66 77 88 99 1010 1111 1212
Multiples of 2\text{Multiples of }2 22 44 66 88 1010 1212 1414 1616 1818 2020 2222 2424
Multiples of 3\text{Multiples of }3 33 66 99 1212 1515 1818 2121 2424 2727 3030 3333 3636
Multiples of 4\text{Multiples of }4 44 88 1212 1616 2020 2424 2828 3232 3636 4040 4444 4848
Multiples of 5\text{Multiples of }5 55 1010 1515 2020 2525 3030 3535 4040 4545 5050 5555 6060
Multiples of 6\text{Multiples of }6 66 1212 1818 2424 3030 3636 4242 4848 5454 6060 6666 7272
Multiples of 7\text{Multiples of }7 77 1414 2121 2828 3535 4242 4949 5656 6363 7070 7777 8484
Multiples of 8\text{Multiples of }8 88 1616 2424 3232 4040 4848 5656 6464 7272 8080 8888 9696
Multiples of 9\text{Multiples of }9 99 1818 2727 3636 4545 5454 6363 7272 8181 9090 9999 108108

Multiple of a Number

A number is a multiple of nn if it is the product of a counting number and nn.
Recognizing the patterns for multiples of 2,5,10,and 32, 5, 10, \text{and }3 will be helpful to you as you continue in this course. Doing the Manipulative Mathematics activity "Multiples" will help you develop a better understanding of multiples. The table below shows the counting numbers from 11 to 5050. Multiples of 22 are highlighted. Do you notice a pattern? Multiples of 22 between 11 and 5050 The image shows a chart with five rows and ten columns. The first row lists the numbers from 1 to 10. The second row lists the numbers from 11 to 20. The third row lists the numbers from 21 to 30. The fourth row lists the numbers from 31 and 40. The fifth row lists the numbers from 41 to 50. All factors of 2 are highlighted in blue. The last digit of each highlighted number in the table is either 0,2,4,6,or 80, 2, 4, 6, \text{or }8. This is true for the product of 22 and any counting number. So, to tell if any number is a multiple of 22 look at the last digit. If it is 0,2,4,6,or 80, 2, 4, 6, \text{or }8, then the number is a multiple of 22.

example

Determine whether each of the following is a multiple of 2:2\text{:}
  1. 489489
  2. 3,7143,714
Solution:
1.
Is 489489 a multiple of 22?
Is the last digit 0,2,4,6,or80, 2, 4, 6, or 8? No.
489489 is not a multiple of 22.
2.
Is 3,7143,714a multiple of 22?
Is the last digit 0,2,4,6,or80, 2, 4, 6, or 8? Yes.
3,7143,714 is a multiple of 22.
 

try it

#145413
The table below highlights the multiples of 1010 between 11 and 5050. All multiples of 1010 all end with a zero. Multiples of 1010 between 11 and 5050 The image shows a chart with five rows and ten columns. The first row lists the numbers from 1 to 10. The second row lists the numbers from 11 to 20. The third row lists the numbers from 21 to 30. The fourth row lists the numbers from 31 and 40. The fifth row lists the numbers from 41 to 50. All factors of 10 are highlighted in blue.

example

Determine whether each of the following is a multiple of 10:10\text{:}
  1. 425425
  2. 350350

Answer: Solution:

1.
Is 425425 a multiple of 1010?
Is the last digit 00? No.
425425 is not a multiple of 1010.
2.
Is 350350 a multiple of 1010?
Is the last digit 00? Yes.
350350 is a multiple of 1010.

 

try it

#145418
Look back at the charts where you highlighted the multiples of 22, of 55, and of 1010. Notice that the multiples of 1010 are the numbers that are multiples of both 22 and 55. That is because 10=2510=2\cdot 5. Likewise, since 6=236=2\cdot 3, the multiples of 66 are the numbers that are multiples of both 22 and 33. The following video shows how to determine the first four multiples of 6. https://youtu.be/mkEWqspRVKk

Use Common Divisibility Tests

Another way to say that 375375 is a multiple of 55 is to say that 375375 is divisible by 55. In fact, 375÷5375\div 5 is 7575, so 375375 is 5755\cdot 75. Notice in the last example that 10,51910,519 is not a multiple 33. When we divided 10,51910,519 by 33 we did not get a counting number, so 10,51910,519 is not divisible by 33.

Divisibility

If a number mm is a multiple of nn, then we say that mm is divisible by nn.
Since multiplication and division are inverse operations, the patterns of multiples that we found can be used as divisibility tests. The table below summarizes divisibility tests for some of the counting numbers between one and ten.
Divisibility Tests
A number is divisible by
22 if the last digit is 0,2,4,6,or 80,2,4,6,\text{or }8
33 if the sum of the digits is divisible by 33
55 if the last digit is 55 or 00
66 if divisible by both 22 and 33
1010 if the last digit is 00

example

Determine whether 1,2901,290 is divisible by 2,3,5,and 102,3,5,\text{and }10.

Answer: Solution: The table below applies the divisibility tests to 1,2901,290. In the far right column, we check the results of the divisibility tests by seeing if the quotient is a whole number.

Divisible by…? Test Divisible? Check
22 Is last digit 0,2,4,6,or 8?0,2,4,6,\text{or }8? Yes. yes 1290÷2=6451290\div 2=645
33 Is sum of digits divisible by 3?\text{Is sum of digits divisible by }3? 1+2+9+0=121+2+9+0=12 Yes. yes 1290÷3=4301290\div 3=430
55 Is last digit 55 or 0?0? Yes. yes 1290÷5=2581290\div 5=258
1010 Is last digit 0?0? Yes. yes 1290÷10=1291290\div 10=129
Thus, 1,2901,290 is divisible by 2,3,5,and 102,3,5,\text{and }10.

 

try it

#145433
 

example

Determine whether 5,6255,625 is divisible by 2,3,5,and 102,3,5,\text{and }10.

Answer: Solution: The table below applies the divisibility tests to 5,6255,625 and tests the results by finding the quotients.

Divisible by…? Test Divisible? Check
22 Is last digit 0,2,4,6,or 8?0,2,4,6,\text{or }8? No. no 5625÷2=2812.55625\div 2=2812.5
33 Is sum of digits divisible by 3?\text{Is sum of digits divisible by }3? 5+6+2+5=185+6+2+5=18 Yes. yes 5625÷3=18755625\div 3=1875
55 Is last digit is 55 or 0?0? Yes. yes 5625÷5=11255625\div 5=1125
1010 Is last digit 0?0? No. no 5625÷10=562.55625\div 10=562.5
Thus, 5,6255,625 is divisible by 33 and 55, but not 22, or 1010.

 

try it

[ohm_question]145433[/ohm_question]
The following video lesson shows how to determine whether a number is divisible by 2,3,4,5,6,8,9,102,3,4,5,6,8,9,10 https://youtu.be/i16N01IdIhk

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