Subtracting Whole Numbers and Applications

 

Learning Objective(s)

·         Subtract whole numbers without regrouping.

·         Subtract whole numbers with regrouping.

·         Solve application problems using subtraction.

 

Introduction

 

Subtracting involves finding the difference between two or more numbers. It is a method that can be used for a variety of applications, such as balancing a checkbook, planning a schedule, cooking, or travel. Suppose a government official is out of the U.S. on business for 142 days a year, including travel time. The number of days per year she is in the U.S. is the difference of 365 days and 142 days. Subtraction is one way of calculating the number of days she would be in the U.S. during the year.

 

When subtracting numbers, it is important to line up your numbers, just as with addition. The minuend is the greater number from which the lesser number is subtracted. The subtrahend is the number that is subtracted from the minuend. A good way to keep minuend and subtrahend straight is that since subtrahend has “subtra” in its beginning, it goes next to the subtraction sign and is the number being subtracted. The difference is the quantity that results from subtracting the subtrahend from the minuend. In 86 – 52 = 34, 86 is the minuend, 52 is the subtrahend, and 34 is the difference.

 

 

Subtracting Whole Numbers

 

When writing a subtraction problem, the minuend is placed above the subtrahend. This can be seen in the example below, where the minuend is 10 and the subtrahend is 7.

 

Example

Problem

10 – 7

=

?

                                        10

                                     –   7

                                          3

 

Answer    10 – 7 = 3

 

When both numbers have more than one digit, be sure to work with one place value at a time, as in the example below.

 

Example

Problem

689 – 353 = ?

 

 

 

       6 8 9

    – 3 5 3

 

 

 

        6 8 9

     3 5 3

              6

 

            

        6 8 9

     3 5 3

           3 6

 

 

 

        6 8 9

     3 5 3

        3 3 6

 

 

 

First, set up the problem and align the numbers by place value.

 

 

Then, subtract the ones.

 

 

 

 

Next, subtract the tens.

 

 

 

 

Finally, subtract the hundreds.

Answer  689 – 353 = 336

 

 

Lining up numbers by place value becomes especially important when you are working with larger numbers that have more digits, as in the example below.

 

Example

Problem

                9,864 – 743 =?

 

 

       9 8 6 4

        7 4 3

 

 

       9 8 6 4

        7 4 3

                1

 

 

        9 8 6 4

         7 4 3

              2 1

 

 

        9 8 6 4

         7 4 3

           1 2 1

 

 

        9 8 6 4

         7 4 3

        9 1 2 1

 

 

First, set up the problem and align the numbers by place value.

 

 

Then, subtract the ones.

 

 

 

 

Next, subtract the tens.

 

 

 

 

Now, subtract the hundreds.

 

 

 

 

There is no digit to subtract in the thousands place, so keep the 9.

Answer    9,864 – 743 = 9,121

 

 

 Subtract:  2,489 – 345.

 

A) 2,144

 

B) 1,355

 

C) 2,834

 

D) 1,134

 

Show/Hide Answer

A) 2,144

Correct. You successfully subtracted 345 from 2,489.

 

B) 1,355

Incorrect. You probably did not line up your numbers correctly by place value. The correct answer is 2,144.

 

C) 2,834

Incorrect. You probably added when you should have subtracted. The correct answer is 2,144.

 

D) 1,134

Incorrect. You probably did not subtract correctly in the tens and thousands places. The correct answer is 2,144.

 

 

 

Subtracting Whole Numbers, with Regrouping

 

You may need to regroup when you subtract. When you regroup, you rewrite the number so you can subtract a greater digit from a lesser one.

When you’re subtracting, just regroup to the next greater place-value position in the minuend and add 10 to the digit you’re working with. As you regroup, cross out the regrouped digit in the minuend and place the new digit above it. This method is demonstrated in the example below.

 

 

Example

Problem

3,225 – 476 = ?

 

 

       3 2 2 5

   –     4 7 6

 

 

 

             1 15

       3 2 2 5

     –   4 7 6

                9

 

 

 

          1 11 15

       3 2 2 5

     –   4 7 6

             4 9

 

 

       2 11 11 15

       3 2 2 5

     –   4 7 6

          7 4 9

 

 

       2 11 11 15

       3 2 2 5

     –   4 7 6

       2 7 4 9

 

 

 

First, set up the problem and align the digits by place value.

 

 

 

Since you can’t subtract 6 from 5, regroup, so 2 tens and 5 ones become 1 ten and 15 ones. Now you can subtract 6 from 15 to get 9.

 

 

 

 

Next, you need to subtract 7 tens from 1 ten. Regroup 2 hundreds as 1 hundred, 10 tens and add the 10 tens to 1 ten to get 11 tens. Now you can subtract 7 from 11 to get 4.

 

 

To subtract the digits in the hundreds place, regroup 3 thousands as 2 thousands, 10 hundreds and add the 10 hundreds to the 1 hundred that is already in the hundreds place. Now, subtract 4 from 11 to get 7.

 

 

 

Since there is no digit in the thousands place of the subtrahend, bring down the 2 in the thousands place into the answer.

 

Answer    3,225 – 476 = 2,749

 

 

Subtract:   1,610 – 880.

 

A) 1,522

 

B) 2,490

 

C) 730

 

D) 620

 

Show/Hide Answer

A) 1,522

Incorrect. You probably did not line up the numbers by place value when you were subtracting. The correct answer is 730.

 

B) 2,490

Incorrect. You probably added the numbers instead of subtracting. The correct answer is 730.

 

C) 730

Correct. You successfully subtracted 880 from 1,610.

 

D) 620

Incorrect. You probably did not regroup correctly. The correct answer is 730.

 

 

 

Checking Your Work

 

You can check subtraction by adding the difference and the subtrahend. The sum should be the same as the minuend.

 

 

Example

Problem

Check to make sure that 7 subtracted from 12 is equal to 5.

                            12 – 7 = 5

 

 

 

 

                                        5

                                     + 7

                                      12

 

 

Here, write out the original equation. The minuend is 12, the subtrahend is 7, and the difference is 5.

 

 

 

Here, add the difference to the subtrahend, which results in the number 12. This confirms that your answer is correct.

Answer    The answer of 5 is correct.

 

 

Checking your work is very important and should always be performed when time permits.

 

 

Subtracting Numbers, Using the Expanded Form

 

An alternative method to subtract involves writing numbers in expanded form, as shown in the examples below. If you have 4 tens and want to subtract 1 ten, you can just think (4 – 1) tens and get 3 tens. Let’s see how that works.

 

Example

Problem

45 – 12 = ?

45 = 40 + 5

12 = 10 + 2

 

Let’s write the numbers in expanded form so you can see what they really mean.

45 = 40 + 5

12 = 10 + 2

        30

Look at the tens. The minuend is 40, or 4 tens. The subtrahend is 10, or 1 ten. Since 4 – 1 = 3, 4 tens – 1 ten = 3 tens, or 30.

  45 = 40 + 5

12 = 10 + 2

          30 + 3

Look at the ones. 5 – 2 = 3. So, 30 + 3 = 33.

Answer  45 – 12 = 33

 

 

Now let’s use this method in the example below, which asks for the difference of 467 and 284. In the tens place of this problem, you need to subtract 8 from 6. What can you do?

 

Example

 

Problem

467 – 284 = ?

 

Step 1: Separate by place value

 

     4 hundreds + 6 tens + 7 ones

     2 hundreds + 8 tens + 4 ones

 

Step 2: Identify impossible differences

 

 6 – 8 = [ ]

 

 

Step 3: Regroup

 

    3 hundreds + 16 tens + 7 ones

  2 hundreds +   8 tens + 4 ones

    1 hundred   +   8 tens + 3 ones

 

 

Step 4: Combine the parts

 

1 hundred + 8 tens + 3 ones = 183

 

Write both the minuend and the subtrahend in expanded form.

 

 

 

Here, we identify differences that are not whole numbers. Since 8 is greater than 6, you won’t get a whole number difference.

 

Regroup one of the hundreds from the 4 hundreds into 10 tens and add it to the 6 tens. Now you have 16 tens. Subtracting 8 tens from 16 tens yields a difference of 8 tens.

 

 

Combining the resulting differences for each place value yields a final answer of 183.

 

Answer    467 – 284 = 183

 

 

 

 

 

A woman who owns a music store starts her week with 965 CDs. She sells 452 by the end of the week. How many CDs does she have remaining?

 

A) 313

 

B) 513

 

C) 510

 

D) 1,417

 

Show/Hide Answer

A) 313

Incorrect. You probably made an error when you were subtracting digits in the hundreds place. The correct answer is 513.

 

B) 513

Correct. You successfully subtracted 452 from 965. In expanded form, 513 is 5 hundreds, 1 ten, and 3 ones.

 

C) 510

Incorrect. You probably made an error when you were subtracting digits in the ones place. The correct answer is 513.

 

D) 1,417

Incorrect. You probably added instead of subtracting. The correct answer is 513.

 

 

 

 

 

Example

Problem

45 – 17 = ?

 

 

 

 

45 = 40 + 5

17 = 10 + 7

When you try to subtract 17 from 45, you would first try to subtract 7 from 5. But 5 is less than 7.

 

Let’s write the numbers in expanded form so you can see what they really mean.

45 = 30 + 15

17 = 10 +   7

Now, regroup 4 tens as 3 tens and 10 ones. Add the 10 ones to 5 ones to get 15 ones, which is greater than 7 ones, so you can subtract.

   45 = 30 + 15

– 17 = 10 +   7

           20 +   8

Finally, subtract 7 from 15, and 10 from 30 and add the results: 20 + 8 = 28.

Answer    45 – 17 =  28

 

 

 

 

 

Solve Application Problems Using Subtraction

 

You are likely to run into subtraction problems in every day life, and it helps to identify key phrases in a problem that indicate that subtraction is either used or required. The following phrases appear in problem situations that require subtraction.

 

 

Phrase or word

Example problem

Less than

The cost of gas is 42 cents per gallon less than it was last month. The cost last month was 280 cents per gallon. How much is the cost of gas this month?

 

Take away

Howard made 84 cupcakes for a neighborhood picnic. People took away 67 cupcakes. How many did Howard have left?

 

Decreased by

The temperature was 84oF in the early evening. It decreased by 15­o overnight. What was the temperature in the morning?

 

Subtracted from

Jeannie works in a specialty store on commission. When she sells something for $75, she subtracts $15 from the $75 and gives the rest to the store. How much of the sale goes to the store?

 

The difference

What is the difference between this year’s rent of $1,530 and last year’s rent of $1,450?

 

Fewer than

The number of pies sold at this year’s bake sale was 15 fewer than the number sold at the same event last year. Last year, 32 pies were sold. How many pies were sold this year?

 

 

 

When translating a phrase such as “5 fewer than 39” into a mathematical expression, the order in which the numbers appears is critical. Writing 5 – 39 would not be the correct translation. The correct way to write the expression is 39 – 5. This results in the number 34, which is 5 fewer than 39. The chart below shows how phrases with the key words above can be written as mathematical expressions.

 

 

Phrase

Expression

three subtracted from six

6 – 3

the difference of ten and eight

10 – 8

Nine fewer than 40

40 – 9

Thirty-nine decreased by fourteen

39 – 14

Eighty-five take away twelve

85 – 12

Four less than one hundred eight

108 – 4

 

 

 

Example

Problem

Each year, John is out of the U.S. on business for 142 days, including travel time. The number of days per year he is in the U.S. is the difference of 365 days and 142 days. How many days during the year is John in the U.S.?

 

 

 

 

 

       3 6 5

     - 1 4 2

 

 

 

       3 6 5

     - 1 4 2

             3

 

 

       3 6 5

     - 1 4 2

          2 3

 

 

 

       3 6 5

     - 1 4 2

       2 2 3

 

 

The words “the difference of” suggest that you need to subtract to answer the problem.

 

First, write out the problem based on the information given and align numbers by place value.

 

 

Then, subtract numbers in the ones place.

 

 

 

Subtract numbers in the tens place.

 

 

 

Finally, subtract numbers in the hundreds place.

 

 

 

Answer       John is in the U.S. 223 days during the year.

 

 

To make sure he was paid up for the month on his car insurance, Dave had to pay the difference of the amount on his monthly bill, which was $289, and what he had paid earlier this month, which was $132. Write the difference of $289 and $132 as a mathematical expression.

 

A) 132 – 289

 

B) 289 + 132

 

C) 132 + 289

 

D) 289 – 132

 

Show/Hide Answer

A) 132 – 289

Incorrect. 132 – 289 Dave had paid $132, so that $132 can be taken away from the full $289 he owed for the month. The correct answer is 289 – 132.

 

B) 289 + 132

Incorrect. Dave owes the difference of 132 and 289, not the sum of 289 and 132. The correct answer is 289 – 132.

 

C) 132 + 289

Incorrect. Dave owes the difference of 132 and 289, not the sum of 132 and 289. The correct answer is 289 – 132.

 

D) 289 – 132

Correct. The difference of 289 and 132 can be written as 289 – 132.

 

 

 

Example

Problem

An African village is now getting cleaner water than it used to get. The number of cholera cases in the village has declined over the past five years. Using the graph below, determine the difference between the number of cholera cases in 2005 and the number of cases in 2010.

 

outbreaks

 

 

 

 

 

       5 0 0

     - 2 0 0

       3 0 0

 

 

 

 

The words “the difference” suggest that you need to subtract to answer the problem.

 

First, use the graph to find the number of cholera cases per year for the two years: 500 in 2005 and 200 in 2010.

 

Then write the subtraction problem and align numbers by place value. Subtract the numbers as you usually would.

Answer      500 – 200 = 300 cases

 

 

 

Summary

 

Subtraction is used in countless areas of life, such as finances, sports, statistics, and travel. You can identify situations that require subtraction by looking for key phrases, such as difference and fewer than. Some subtraction problems require regrouping to the next greater place value, so that the digit in the minuend becomes greater than the corresponding digit in the subtrahend. Subtraction problems can be solved without regrouping, if each digit in the minuend is greater than the corresponding digit in the subtrahend.

 

In addition to subtracting using the standard algorithm, subtraction can also can be accomplished by writing the numbers in expanded form so that both the minuend and the subtrahend are written as the sums of their place values.