MAT 156 Frymire
Chapter 5
Intergers and the Operations of Addition and Subtraction
Addition
Chip Model for addition- Black and red chips to represent positive and negative numbers.
Charge Field Model- Similar to chips but with + and - signs
Number Line Model- Always start at 0. Move left or right depending on the sign
Absolute Value- |x| and |-x| = x, -|x|= -x
Properties of Integer Addition
- Closure Property
- Commutative Property
-Associative Property
- Identity eelement of addition of integers- 0
Subtraction
Chip Model
Charge Field Model for Subtraction- same as addition
Number line for Subtraction- Same as addition, except, when you come across a negative number you TURN AROUND
Subtraction using the Adding the Opposite Approach- Example: 2-8= 2+8= -6 (keep the sign of the larger number)
Properties
- Cannot do commtative property nor associative with subtraction
Multiplication of Integers
Methods
- Pattern Model for Multiplication of Integers- 3(-2)=-6; 2 (-2)= -4... etc
- Chip Model and Charge Field Model- remember to use groups, not just the each chip (-3)(-2)> 3 groups are taken from 2 groups
- Number Line Model- Remember to use groups for multiplication
Properties of Multiplication of Integers
-Closure Property
- Commutative Property
- Associative Property of Multiplication
- Distributive Property of Multiplication over Addition of Integers
- Zero Multiplication Property of Integers
- Additive Inverse
Order of Operations on Integers
PEMDAS- This is the same as the order of operations for anything
Divisibility
Divisibility Rules:
2: If it ends with an even number- 165418
3: If the sum of the digits is divisible by 3- 969
4: If the last two digits are divisible by 4- 424
5: If it ends in 0 or 5- 65
6: If the sum of the digits are divisible by 2 and 3: 126
8: If the last 3 digits are divisible by 8- 1848
9: If the sum of the digits are divisible by 9- 126
10: If the number ends in 0
Prime and Composite Numbers
Prime Factorization
-Factor Tree
- Ladder Model- see diagram in notes
- Number of Divisors- group them together
-Sieve- the game
Prime number:
A number that has only two factors, 1 and itself
Composite number:
Numer in which there are more than two factors
Greatest Common Divisor/ Least Common Multiple
Greatest Common Factor: The greatest factor that can go into both or all numbers
Methods to Finding the GCF:
-Colored Rods Method
- The Interestection of Set Methods- List all of the factors and choose the greatest number that intersects
-Prime Factorization- Factor tree
Ladder Method- See diagram in the notes
Subtopic
Chapters 1 & 2
Problem Solving
George Polya's 4 Step Problem Sovling
1. Understand the Problem
Look for patterns
2. Devising a plan
3. Carrying out the plan
4. Looking back (Check!)
Work Backwards
Patterns
Inductive Reasoning
Conjecture
Counter example
Arithmetic Sequence
Addition or subtraction
an= a1+(n-1)d
Fibonacci Sequence
No fixed difference
1,1,2,3,5,8,13, 21,34,55...
Add the last two sums
Geometic Sequence
Multiplication
an=a1 * r(n-1)< exponent, r= ratio
Numeration Systems
Hindu- Arabic Numeration System
All have base ten
2345= 2000+300+40+5
Tally Numeration System
Tallies- grouped in sets of 5
Roman Numerals
I=1
V= 5
X=10
L=50
C=100
D=500
M=1000
If you place a smaller number before a larger number, it means to subtract it. i.e. IV= 5-1=4
Base 5
1030five= (1*5^3) + (0*5^2) + (3*5^1) +(0*5^0)
Sets
One-to- One Correspondence
There is exactly one match per set.
{1,2,3} {a,b,c}
Equal Sets
The same numbers and amount of numbers in each set. Order does not matter
{1,2,3} {3,2,1}
Equivalent Sets
Must have the same number of items per set.
{a,b,c,d} {l,m,n,o}
Subsets
Contained within the other set
{1,2,3,4,5,6} {2,3,4}
Set Intercection
Venn Diagram
cUs
Set Union
The whole Venn Diagram
Set Difference
The compliment
Properties of Set Operations
Associative
Order is important. Also called grouping
Communative
Order doesn't matter
Cartesian Products
A X B (A cross B)
Chapters 3 & 4
Addition and Subtraction
a+b=c
a+b> Addends
c> sum
"Mastering Addition"
Counting On
Doubles
Making 10 (and then add any leftovers)
Counting Back
Fact Families
Properties of Additions
Identity Property- a+0=a
Commutative Property- a+b=b+a
Associative Property- (a+b)+c= a+(b+c)
Closure Property- If a and b are whole numbers, then a + b is a whole number.
"Mastering Subtraction"
Inverse Operations
Take-Away Model
Missing Addend Model
Comparison Model
Number Line Model
Properties of Subtraction
Closure- {1,3,5,7,…} (3-5=-2) NO- Answer is not a WHOLE number
Associative (a-b)-c=a-(b-c) YES
Commutative- a-b=b-a NO
Identity- a-0=a YES However: 0-a=0 is not true.
Algorithms
Addition Algorithms
To help students understand algorithms, we should start with manipulatives. Children can touch, move around, and be led to developing their own algorithms.
b. After working with manipulatives, then move to paper/pencil operations.
c. Regroup or trade problems are then used to describe carrying.
Lattice Algorithm for Addition
Example: 3 5 6 7
+ 5 6 7 8
0/1/1/1
/8/1/3/5
9 2 4 5
Subtraction Algorithms
Use base-ten blocks to provide a concrete model for subtraction as we did in addition.
b. The concept of remove or take away is used.
c. Then paper/pencil algorithms are introduced.
III. Equal-Addition Algorithm
a. Based on the fact that the difference between two numbers does not change if we add the same amount to both numbers.
Example: 255 > 255 + 7 > 262 > 262 + 30 > 292
- 163 163 + 7 -170 -(170 + 30) - 200
92
Multiplication and Division
Multiplication
• Repeated-Addition Model
• We can use addition to put equal groups of numbers together to use multiplication. 3 + 3 + 3 + 3 = 12 (four groups of 3’s)
• Can be shown by number lines and arrays. (See pg. 143)
• The constant feature (+) on a calculator can help relate multiplication to addition. Example: + 3 = = = = 12
The Array and Area Model
• Cartesian-Product Model
Use of a tree diagram to solve multiplication problems (See pg. 146)
*Be aware of how multiplication is modeled:
*A X B, A(B), A B where A and B are the factors and A X B is the product
Properities of Multiplication
A. Closure property of multiplication of whole numbers- The set of whole numbers is closed under multiplication. That is, if we multiply any two whole numbers, the result is a unique whole number.
B. Commutative property of multiplication of whole numbers- For whole numbers a and b, a X b = b X a.
C. Associative property of multiplication of whole numbers- For whole number a, b, and c, (a X b) X c = a X (b X c)
D. Identity property of multiplication of whole numbers- There is a unique whole number 1 such that for any whole number a, a X 1 = A = 1 X a
E. Zero multiplication property of whole numbers- For any whole number a, a X 0 = 0 = 0 X a
F. Distributive property of multiplication over addition and subtraction- For any whole numbers a, b, and c, a(b+c)= ab + ac and a(b-c) = ab – ac
Example of how distributive property works:
7 X 13 = 7 X (10 + 3) = (7 X 10) + (7 X 3) = 70 + 21 + 91
Division
Set (Partition) Model- Set up a model of the total number of items in the problem then partition them into sets. Example: 18 cookies divided by 3 would be 3 sets of 6 cookies
b. Missing-Factor Model- Using multiplication, the number of groups times the unknown variable is equal to the total. Example: 3 X c = 18 By using multiplication, we know that 3 X 6 equals 18, thus c = 6.
Repeated subtraction model-
Example: 18 divided by 6 could be shown as 18- 6 = 12 – 6 = 6 – 6 = 0
or 18 - 6 -6 -6 = 0
V. Relating Multiplication and Division as Inverse Operations
*Division is the inverse of multiplication.
*Division with a remainder of 0 and multiplication are related.
*Note—is division closed, commutative, associative, and/or identity property?
VI. Division by 0 or 1 ( bottom of pg. 154 and see School Book Page on pg. 155)
• n divided by 0 is undefined (there is no answer to the equivalent multiplication problem.)
• 0 divided by n = 0
• 0 divided by 0 is undefined also.
Order of Operations
Parenthesis
Exponents
Multiplication/ Division
Addition/ Subtration
Functions
A FUNCTION from set A to Set B is a correspondence from A to B in which each element of A is paired with one, and only one, element of B
Functions as Equations
Functions as Arrow Diagrams
Functions as Tables and Ordered Pairs
Functions as Graphs
Horizontal- inputs
Vertical- outputs
Relations
A relation from Set A to set B is a correspondence between elements of A and element of B, but unlike functions, do not require that each element of A be paired with one, and only one, element of B.
• Every function is a relation, but not every relation is a function
Chapters 6 & 7
The Set of Rational Numbers
Rational numbers are all numbers
Can be proper or improper fractions
Denseness of Rational Numbers:
Find two numbers between two different fractions by multiplying denominators
Addition, Subtraction, and Estimation with Rational Numbers
Be able to model fractions with pictures
Use a number line to represent a fraction and estimate. Remember to always start at 0.
Additive Inverse Property: a/b, the additive inverse would be -a/b. Additive inverse is the opposite of the original number. Should add up to 0.
Addition Property of Equality: Two equivilant fractions added to the same fraction will equal eachother.
Use a number line to estimate fractions. Be careful with - numbers though- remember the closer to zero on the left side is the greater number.
Multiplication and Division of Rational numbers
Multiplication can be modeled with repeated addition.
"Of the" in a word problem means multiplication.
Multiplicative Identity: The number 1 is unique- when multiplied by a number, it is the number.
Multiplicative Inverse: The opposite. When multiplied will equal 1.
Division: Keep, Switch, Switch
a^m * a^n= a^m+n
a^-n= 1/a^n
a^m/a^n= a^m-n
(a^m)^n= a^mn
Introduction and Operations on Decimals
Need to know the ones, tens, and hundreds places in decimals.
Terminating decimals are ones that end. Order them with the greatest one, then tens, then hundreds and so on.
Repeating Decimals: Ones that don't end and repeat the same numbers to infinity. Order them in the same manor as ordering terminating decimals.