Transcript MCC5.NBT.7
ADDITION
WITH DECIMAL NUMBERS
Kenna Creel
MEDT 3401 Digital Movie Assignment
Fall 2012
Agenda
•I. Standard/EQ/Agenda
•II. Addition Property Vocabulary Review
•III. Decimal Addition With Properties
Review
•IV. Practice Worksheet Activity
Standard
•MCC5.NBT.7 Add, subtract, multiply, and divide
decimals to hundredths, using concrete
models or drawings and strategies based on
place value, properties of operations, and/or
the relationship between addition and
subtraction; relate the strategy to a written
method and explain the reasoning used.
Essential Question
•How do we add decimal
numbers?
What do we know about adding?
•What different ways can we add?
•Can we use different properties to
add? If so, what properties?
Commutative Property
•When two numbers are added, the sum is
the same regardless of the order of the
addends.
•For example: 4 + 2 = 2 + 4
Associative Property
•When three or more numbers are added,
the sum is the same regardless of the
grouping of the addends.
•For example (2 + 3) + 4 = 3 + (4 + 2)
Additive Identity Property
•The sum of any number and zero is the
original number.
•For example 5 + 0 = 5.
Things to remember…
•One of the easiest ways to solve an
addition problem with decimal numbers is
by doing what we would do to determine
which is larger… STACK THEM UP! Your
decimals should ALWAYS be lined up!
•You need to know how to use the
different properties in addition problemsthey WILL show up on tests!
Properties and Decimal Numbers
•How can we apply what we know about
these three properties to adding decimal
numbers?
•IT’S EASY!
Commutative Property With Decimal Numbers
•When two numbers are added, the sum is
the same regardless of the order of the
addends- just like when we use the
property with any other number!
•For example: 0.4 + 0.2 = 0.2 + 0.4
Associative Property with Decimal Numbers
•When three or more numbers are added,
the sum is the same regardless of the
grouping of the addends.
•For example (0.2 + 0.3) + 0.4 = 0.3 + (0.4 +
0.2)
Additive Identity Property with Decimal
Numbers
•The sum of any number and zero is the
original number.
•For example 0.5 + 0 = 0.5.
And Now…
•It’s your turn!
•1.04 + 16.78 = 16.78 + 1.04
•0 + 23.437= 23.437
•7.59 + (18.641+0.02)= 18.641 + (0.02 +
7.59)