31 decimals, addition and subtraction of decimals

Decimals

Back to Algebra–Ready Review Content.

DecimalsIn order to track smaller and smaller quantities we include base-

10 fractions to the whole number-system.

$100’s $1’s$10’s

10 fractions to the whole number-system. Let’s demonstrate

this with a cash register that holds $1’s, $10’s, $100’s, ...etc.

$100’s $1’s$10’s

For a moment let’s assume that US Treasury not only makes

(dime),101

$ (penny),1001

, a “itty”, and1000

1$ , a “bitty”, etc...

100001

but also makes smaller value coins

$100’s $1’s$10’s

pennies itties

$ 10001

(dime),101

$ (penny),1001

100001

bitties

$100’s $1’s$10’s

$ 1001

$ 10001

(dime),101

$ (penny),1001

100001

Note that 10 itties = 1 penny and 10 bitties = 1 itty, etc...

dimes pennies itties bitties

$100’s $1’s$10’s

$ 1001

$ 10001

(dime),101

$ (penny),1001

100001

Let’s further assume each slot only hold up to 9 bills or coins

so we may record the money stored in the register

100001

$100’s $1’s$10’s

$ 1001

$ 10001

(dime),101

$ (penny),1001

100001

# # # # ##

100001

$100’s $1’s$10’s

$ 1001

$ 10001

(dime),101

$ (penny),1001

100001

# # # # ##

simply as . # # # # where the #’s = 0,1,.., or 9. # # #

The decimal point (the divider)

100001

$100’s* $1’s$10’s* 101

$ 1001

$ 10001

4 5 63

For example,

Decimals

$100’s* $1’s$10’s*

pennies itties

$ 10001

4 5 63

For example,

. 43 5 6is written as

Decimals

bitties

$100’s* $1’s$10’s*

pennies itties

$ 10001

4 5 63

For example,

4 $1’s

3 $10’s

Decimals

bitties

$100’s* $1’s$10’s*

pennies itties

$ 10001

4 5 63

For example,

4 $1’s

3 $10’s

(5 dimes)

(6 pennies)

Decimals

bitties

$100’s* $1’s$10’s*

pennies itties

$ 10001

4 5 63

For example,

4 $1’s

3 $10’s

(5 dimes)

(6 pennies)

$100’s $1’s$10’s* 101

1$ 1000

4 5 0 7

Decimals

100001$

bitties

$100’s* $1’s$10’s*

pennies itties

$ 10001

4 5 63

For example,

4 $1’s

3 $10’s

(5 dimes)

(6 pennies)

$100’s $1’s$10’s* 101

1$ 1000

4 5 0 7

4 $1’s

4is written as .

Decimals

100001$

bitties

$100’s* $1’s$10’s*

pennies itties

$ 10001

4 5 63

For example,

4 $1’s

3 $10’s

(5 dimes)

(6 pennies)

$100’s $1’s$10’s*

pennies itties

1$ 1000

4 5 0 7

4 $1’s(no penny)

(5 dimes)105$

10007$

4 75 0is written as .

Decimals

100001$

(8 bitties)10000

bitties

(7 itties)

Comparing Decimal NumbersDecimals

Because decimal numbers may be viewed as coins stored in a

base-10 cash registers, therefore to determine which decimal

numbers is the largest is similar to finding which cash register

contains more money (in coins.)

Comparing Decimal Numbers

Example A.

List 0.0098, 0.010, 0.00199

from the largest to the smallest.

Decimals

contains more money (in coins.)

1. line up the numbers by their decimal points,

Example A.

List 0.0098, 0.010, 0.00199

Decimals

contains more money (in coins.) Specifically, to compare

multiple decimal numbers to see which is largest, we

Example A.

List 0.0098, 0.010, 0.00199

Decimals

0.0098

0.00199

1. line up by the decimal points

2. scan the digits, i.e. the number of coins, in the slot from

left to right,

Example A.

List 0.0098, 0.010, 0.00199

Decimals

0.0098

0.00199

left to right,

Example A.

List 0.0098, 0.010, 0.00199

Decimals

0.0098

0.00199

2. scan the digits in each slot from

left to right

left to right,

3. the one with the 1st largest digit is the largest quantity.

Example A.

List 0.0098, 0.010, 0.00199

Decimals

0.0098

0.00199

left to right

left to right,

Example A.

List 0.0098, 0.010, 0.00199

Decimals

0.0098

0.00199

left to right

1st largest digit, so it’s

the largest number

left to right,

Example A.

List 0.0098, 0.010, 0.00199

Decimals

0.0098

0.00199

left to right

the largest number

2nd largest digit, so it’s

the 2nd largest number

left to right,

Example A.

List 0.0098, 0.010, 0.00199

Decimals

0.0098

0.00199

left to right

the largest number

2nd largest digit, so it’s

the 2nd largest number

So listing them from the largest

to the smallest, we have:

0.010, 0.0098, 0.00199.

Here are the official names of some of the base-10-denominator

fractions. Note the suffix “ ’th ” at the end their names.

1’s 10 100 1,000 10,000 100,000

1 1 1 1 11,000,000

Decimals

10’s

ones tenths hundredths thousandthsten–

thousandths

Decimal point

hundred–

thousandths millionths.

1’s 10 100 1,000 10,000

thousandths

100,000

Decimal point

hundred–

1 1 1 1 11,000,000

2 . 3 4 5 6 7

is 2 +10 100 1,000 10,000 100,0003 4 5 6 7

+ + + +

tenths

hundredths

thousandths

hundred-

thousandth

Decimals

10’s

In fraction it’s 2 100,00034,567

Decimals

2 . 3 4 5 6 7

is 2 +10 100 1,000 10,000 100,0003 4 5 6 7

+ + + +

tenths

hundredths

thousandths

hundred-

thousandth

1’s 10 100 1,000 10,000

thousandths

100,000

Decimal point

hundred–

1 1 1 1 11,000,000

110’s

Fact About Shifting the Decimal Points in a Fraction

Decimals

Given a fraction, if the decimal points of the numerator and the

denominator are shifted in the same direction with the same

number of spaces, the resulting fraction is an equivalent

fraction, i.e. it’s the same.

Decimals

Example A. a. Convert the following fractions to decimals.

Decimals

To change from base-10-denominator fractions to decimals,

1. line up the top and bottom decimal points,

Decimals

1. Line up the

decimal points.

Decimals

1. Line up the

decimal points.

2. slide the pair of points in tandem left to behind the 1 in the

denominator, and pack 0’s in the skipped slots in the numerator.

Decimals

1. Line up the

decimal points.

1.000.03

2. Move the pair of points in tandem until the

denominator is 1 and pack 0’s in the skipped

slots in the numerator.

Decimals

1. Line up the

decimal points.

1.000.03

The new numerator is the decimal form of the fraction.

Decimals

1. Line up the

decimal points.

1.000.03 =

... = 0.03

The new numerator is the decimal form of the fraction.

The decimal form

of the fraction

Decimals

b. Convert the following fractions to decimals.

Decimals

16.35=

1. Line up the

decimal points.

Decimals

16.35= =

. 1 0000

0.0016 35

1. Line up the

decimal points. 2. Move the pair of points in tandem until

the denominator is 1 and pack 0’s in the

skipped slots in the numerator.

Decimals

16.35= =

. 1 0000

0.0016 35

... = 0.001635

1. Line up the

Decimals

The decimal form

of the fraction

16.35= =

. 1 0000

0.0016 35

... = 0.001635

1. Line up the

Recall that x =x1.

Decimals

The decimal form

of the fraction

To change a decimal number of the form

16.35= =

. 1 0000

0.0016 35

... = 0.001635

1. Line up the

0 . # # # # to a fraction:

Recall that x =x1.

Decimals

1. Put “1.” in the denominator and line up the decimal points.

0 . # # # #1 . =

The decimal form

of the fraction

16.35= =

. 1 0000

0.0016 35

... = 0.001635

1. Line up the

Recall that x =x1.

Decimals

2. Slide the decimal point of the

numerator to end

of the number. 0 . # # # #1 . =

The decimal form

of the fraction

16.35= =

. 1 0000

0.0016 35

... = 0.001635

1. Line up the

Recall that x =x1.

Decimals

numerator to end

of the number. 0 . # # # #1 .

0 . # # # #

Drag the decimal point

to the end of the number

The decimal form

of the fraction

16.35= =

. 1 0000

0.0016 35

... = 0.001635

1. Line up the

Recall that x =x1.

Decimals

numerator to end

of the number.

3. Pack a “0” for

each move to the right.

0 . # # # #1 .

0 . # # # #

1 ...0000

Drag the decimal point

to the end of the number

then fill in a “0” for each move.

The decimal form

of the fraction

Example B. Convert the following decimals to fractions.

a. 0.023

Decimals

a. 0.0231. Insert “1.” in the denominator

and line up the decimal points.

Decimals

a. 0.023

0 . 0 2 3

1. Insert “1.” in the denominator

Decimals

a. 0.023

0 . 0 2 3

2. Slide the pair of points in

tandem right, to the back of the

last non-zero digit in the

numerator, and pack 0’s in the

skipped slots in the denominator.

Decimals

a. 0.023

0 . 0 2 3

1 .0 0 0

0 . 0 2 3

Decimals

a. 0.023

0 . 0 2 3

1 .0 0 0 1000

0 . 0 2 3

Decimals

a. 0.023

0 . 0 2 3

1 .0 0 0 1000

0 . 0 2 3

b. 37. 25

Decimals

a. 0.023

0 . 0 2 3

1 .0 0 0 1000

0 . 0 2 3

b. 37. 25

we only need to convert the decimal 0.25 to a fraction.

Since 37.25 = 37 + 0.25

Decimals

a. 0.023

0 . 0 2 3

1 .0 0 0 1000

0 . 0 2 3

b. 37. 25

0 . 2 5

Since 37.25 = 37 + 0.25

0. 2 5 =

Decimals

a. 0.023

0 . 0 2 3

1 .0 0 0 1000

0 . 0 2 3

b. 37. 25

0 . 2 5

Since 37.25 = 37 + 0.25

0. 2 5 =0 . 2 5

1 . 0 0=

Decimals

a. 0.023

0 . 0 2 3

1 .0 0 0 1000

0 . 0 2 3

b. 37. 25

0 . 2 5

Since 37.25 = 37 + 0.25

0. 2 5 =0 . 2 5

1 . 0 0=

Decimals

a. 0.023

0 . 0 2 3

1 .0 0 0 1000

0 . 0 2 3

b. 37. 25

0 . 2 5

Since 37.25 = 37 + 0.25

0. 2 5 =0 . 2 5

1 . 0 0=

Decimals

a. 0.023

0 . 0 2 3

1 .0 0 0 1000

0 . 0 2 3

b. 37. 25

0 . 2 5

Since 37.25 = 37 + 0.25

0. 2 5 =0 . 2 5

1 . 0 0=

Therefore 37.25 = 374

Decimals

Adding 0’s to the right end of a decimal number does not

change the decimal number. Hence 1.2 = 1.20 = 1.200 etc..

since the extra 0’s do not carry any value.

Decimals

We add 0’s to carry out long division to convert a fraction to a

decimal.

Example C. Convert the fractions into decimals.

Decimals

decimal.

Decimals

decimal.

Decimals

decimal.

)4 11. Place a decimal point above

the decimal point of the

denominator. This is the

decimal point of the quotient.

Decimals

decimal.

)4 1.1. Place a decimal point above

Decimals

decimal.

2. Add 0’s to the right of the

dividend to perform the division

then perform the long division.

Decimals

decimal.

Decimals

decimal.

Decimals

decimal.

Decimals

decimal.

=Therefore

Decimals

decimal.

=Therefore

Decimals

decimal.

Using similar division method, we list some of the common

fractions and their decimals expansions on the next slide.

Decimals

0.50 =41

0.25 =51

0.20 =101

0.05 =251

0.04 =501

0.02 =1001

Here is a list of common fractions and their decimal expansions.

Decimals

0.50 =41

0.25 =51

0.20 =101

0.05 =251

0.04 =501

0.02 =1001

A helpful way to remember some of these conversion is to

relate them to money.

Decimals

0.50 =41

0.25 =51

0.20 =101

0.05 =251

0.04 =501

0.02 =1001

A helpful way to remember some of these conversion is to

relate them to money.

A half-dollar is 50 cents.

A quarter is 25 cents.

A fifth of a dollar is 20 cents.

A tenth of a dollar is 10 cents (dime.)

0.01 One hundredth of a dollar is 1 cents (penny.)

0.05 One twenty of a dollar is 5 cents (nickel).

DecimalsTo add decimal numbers, we line up the decimal point the

set the its position then add as usual.

Example D.

a. Add 8.978 + 0.657

Example D.

a. Add 8.978 + 0.6578 . 9 7 80 . 6 5 7 +

Do the same for subtracting decimals.

Example D.

a. Add 8.978 + 0.6578 . 9 7 80 . 6 5 7 +

Example D.

a. Add 8.978 + 0.6578 . 9 7 80 . 6 5 7 +

9So the sum is 9.635. .

Example D.

a. Add 8.978 + 0.6578 . 9 7 80 . 6 5 7 +

b. Subtract 0.078 – 0.0293

Example D.

a. Add 8.978 + 0.6578 . 9 7 80 . 6 5 7 +

b. Subtract 0.078 – 0.0293

0 . 0 7 80 . 0 2 9 3 –

Example D.

a. Add 8.978 + 0.6578 . 9 7 80 . 6 5 7 +

b. Subtract 0.078 – 0.0293

0 . 0 7 80 . 0 2 9 3 –

Add 0’s at the end

of the decimal

expansion,

then subtract

Example D.

a. Add 8.978 + 0.6578 . 9 7 80 . 6 5 7 +

b. Subtract 0.078 – 0.0293

0 . 0 7 80 . 0 2 9 3 –

8400 . 7

of the decimal

expansion,

then subtract

Example D.

a. Add 8.978 + 0.6578 . 9 7 80 . 6 5 7 +

b. Subtract 0.078 – 0.0293

0 . 0 7 80 . 0 2 9 3 –

8400 . 7

Hence 0.078 – 0.0293 = 0.0487.

of the decimal

expansion,

then subtract.

31 decimals, addition and subtraction of decimals

Education

Control Instructions - WordPress.com · Addition, Subtraction, Multiplication, Division B. Division, Multiplication, Addition, Subtraction C. Multiplication, Addition, Division, Subtraction

Chapter 3 - Decimals Math Skills – Week 4. Outline Introduction to Decimals – Section 3.1 Addition of Decimals – Section 3.2 Subtraction of Decimals –

Addition, Subtraction, and Multiplication of Decimals

Addition & Subtraction

Addition and Subtraction

What is Numeracy? Numeracy covers the following skills: Addition and Subtraction Multiplication and Division Fractions, Decimals and Percentages

Simplify fractions Convert fractions to decimals Subtraction of decimals Addition of fractions Equivalent fractions

Kungfu math p4 slide13 (subtraction decimals)pdf

Addition and Subtraction of Decimals - 3P Learning and Subtraction of Decimals GRADE 5 WORKSHEETS

Lesson 1: Review of Decimals: Addition, Subtraction, Multiplication · 2020-01-23 · Lesson 1: Review of Decimals: Addition, Subtraction, Multiplication D. Legault, Minnesota Literacy

Copyright © 2015 Cengage Learning® Chapter 1 Relative Value, Addition and Subtraction of Decimals

Quarter 2 Test 3 Review XXVII.Comparing & Ordering Fractions XXVIII. Decimals and Fractions XXIX. Addition and Subtraction w/Fractions & Mixed Numbers

Math Test Addition and Subtraction of Decimals

Diagnosing Mathematical Errors: Fractions and Decimals: Addition and Subtraction Dr. Jill Drake College of Education

Whole!Numbers! Addition!and!Subtraction!! Multiplication ... · Whole!Numbers! Multiplication!and!Division! Patterns!and!Algebra! Addition!and!Subtraction!! Fractions!and!Decimals!!

Addition/Subtraction Review

Addition & subtraction unit - Corpus Christi Catholic … · Unit Title – Addition & Subtraction Unit – Addition & Subtraction Maths Year 6 Curriculum Emerging Expected Exceeding

Seminar 3 Welcome. Agenda Decimal/Fraction Notation Addition, Subtraction, multiplication/division with Decimals

ADDITION AND SUBTRACTION

Lesson 1: Review of Decimals: Addition, Subtraction ... 1: Review of Decimals: Addition, Subtraction, Multiplication D. Legault, Minnesota Literacy Council, 2014 p.5 GED Math Curriculum