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Chapter 5 Expressions.

Published byKerry Cooper Modified over 9 years ago

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Presentation on theme: "Chapter 5 Expressions."— Presentation transcript:

1 Chapter 5 Expressions

2 Day….. Exponents Order of Operations Numerical Expressions
Algebraic Properties Distributive Property

3 Day 1

4 Vocabulary Algebraic Expressions -
A combination of variables, numbers, and at least one operation. Ex. 4x + 3 Equivalent Expressions- Expressions that have the same value. Ex. 5+9 = 20-6 To find the value of an algebraic expression by replacing variables with numbers. 10a + 3 when a = (6) + 3 = 57 Evaluate- Numerical Expression - A combination of numbers and operations. Ex Order of Operations- The rules that tell which operation to preform first when more than one operation is used. (PEMDAS) Properties - Mathematical statements that are true of any number belonging to the set of numbers for which the properties are defined. Variable - A letter or symbol used to represent an unknown number.

5 Write and evaluate expressions involving exponents
I Can…. Write and evaluate expressions involving exponents

6 Exponent Essential Understanding:
Exponents are a shorthand way to show how many times a number, called the base, is multiplied times itself. A number with an exponent is said to be "raised to the power" of that exponent. The "Laws of Exponents” come from three ideas: The exponent says how many times to use the number in a multiplication.   A negative exponent means divide, because the opposite of multiplying is dividing A fractional exponent like 1/n means take the nth root

7 Laws of Exponents Law: Examples: x1 = x 61 = 6 x0 = 1 70 = 1
xmxn = xm+n x2x3 = x2+3 = x5 xm/xn = xm-n x6/x2 = x6-2 = x4 (xm)n = xmn (x2)3 = x2×3 = x6 (xy)n = xnyn (xy)3 = x3y3 (x/y)n = xn/yn (x/y)2 = x2 / y2 x-n = 1/xn x-3 = 1/x3

8 Wrap it Up Review Questions Exit Tickets

9 Day 2

10 Complete the provide page in your book.
Bell Work Complete the provide page in your book.

11 Homework Check

12 Vocabulary Algebraic Expressions -
A combination of variables, numbers, and at least one operation. Ex. 4x + 3 Equivalent Expressions- Expressions that have the same value. Ex. 5+9 = 20-6 To find the value of an algebraic expression by replacing variables with numbers. 10a + 3 when a = (6) + 3 = 57 Evaluate- Numerical Expression - A combination of numbers and operations. Ex Order of Operations- The rules that tell which operation to preform first when more than one operation is used. (PEMDAS) Properties - Mathematical statements that are true of any number belonging to the set of numbers for which the properties are defined. Variable - A letter or symbol used to represent an unknown number.

13 Solve expressions involving multiple operations.
I Can…. Solve expressions involving multiple operations.

14 Order of Operations Essential Understanding: Examples: 4+6*8-6(12-9) =
Order of operation is the rule that states the order in which an expression or equation is solved. You can remember this order with simple mnemonic devices such as “Please Excuse My Dear Aunt Sally”. Where as: P stands for parenthesis E stands for Exponents M stands for multiply D stands for divide A stands for addition S stands for subtraction Examples: 4+6*8-6(12-9) = 14-8+5*5+102=

15 Wrap it Up Review Questions Exit Tickets

16 Day 3

17 Bell Work Directions: Use your knowledge of the order of operations to simplify each expression. * 6 – – 5 12 * 4 * – 11 * 5 – 3 * 7 + 9 * 4 * – 8 * 9 Justify your response.

18 Homework Check

19 Vocabulary Algebraic Expressions -
A combination of variables, numbers, and at least one operation. Ex. 4x + 3 Equivalent Expressions- Expressions that have the same value. Ex. 5+9 = 20-6 To find the value of an algebraic expression by replacing variables with numbers. 10a + 3 when a = (6) + 3 = 57 Evaluate- Numerical Expression - A combination of numbers and operations. Ex Order of Operations- The rules that tell which operation to preform first when more than one operation is used. (PEMDAS) Properties - Mathematical statements that are true of any number belonging to the set of numbers for which the properties are defined. Variable - A letter or symbol used to represent an unknown number.

20 Solve expressions involving multiple operations.
I Can…. Solve expressions involving multiple operations.

21 Order of Operations

22 Your Turn…. Clear your desk of everything but a pencil.

23 Wrap it Up Review Questions Exit Tickets

24 Day 4

25 Homework Check

26 Vocabulary Algebraic Expressions -
A combination of variables, numbers, and at least one operation. Ex. 4x + 3 Equivalent Expressions- Expressions that have the same value. Ex. 5+9 = 20-6 To find the value of an algebraic expression by replacing variables with numbers. 10a + 3 when a = (6) + 3 = 57 Evaluate- Numerical Expression - A combination of numbers and operations. Ex Order of Operations- The rules that tell which operation to preform first when more than one operation is used. (PEMDAS) Properties - Mathematical statements that are true of any number belonging to the set of numbers for which the properties are defined. Variable - A letter or symbol used to represent an unknown number.

27 Properties Commutative- states that the order in which numbers are added or multiplied does not change the sum or product. Ex: 4+3=7 or 3+4=7 Associative- states that the way in which numbers are grouped does not change the sum or product. Ex: 1 + (2+3) = 6 or (1+2) +3= 6 Identity- states that any number added to 0 or multiplied by 1 will be itself. Ex: = 6 or 4 x 1 = 4 Distributive- is used to simplify or rewrite expressions by multiplying a number outside the parenthesis by each number or term inside the parenthesis. Ex: 4(2 + 3) = 8 +12

28 Apply the properties of operations to generate equivalent expressions.
I Can…. Apply the properties of operations to generate equivalent expressions.

29 Algebraic Properties Essential Understanding:
Algebraic properties can be used to rewrite expressions or generate equivalent expressions. For instance, the expression can be rewritten like this using commutative property of addition to rearrange the numbers. Examples of other algebraic properties: 1 x 4 x 3 = 4 x 3 x 1 -_____________________ (6 + 3) +8 = (8 +3) + 6-____________________ 9 x (3 x 2) = (9 x 3) x 2-____________________ 4(3 – 2)-______________________

30 Watch This Associative property: ( 5 mins) Commutative property: (3 mins)

31 Please take out your maker boards
Group Work Please take out your maker boards

32 Wrap it Up Review Questions Exit Tickets

33 Day 5

34 pOp Quiz Take out a pencil and a calculator
Clear everything else from your desk

35 Bell Work Justify Your Methods
Directions: Use your knowledge of associative and commutative properties to rewrite the following expressions. 3 * 3 * 8 2 * (7 * 6) 5 + (4 + 3) – 2 15 ÷ 3 Justify Your Methods

36 Homework Check

37 Vocabulary Algebraic Expressions -
A combination of variables, numbers, and at least one operation. Ex. 4x + 3 Equivalent Expressions- Expressions that have the same value. Ex. 5+9 = 20-6 To find the value of an algebraic expression by replacing variables with numbers. 10a + 3 when a = (6) + 3 = 57 Evaluate- Numerical Expression - A combination of numbers and operations. Ex Order of Operations- The rules that tell which operation to preform first when more than one operation is used. (PEMDAS) Properties - Mathematical statements that are true of any number belonging to the set of numbers for which the properties are defined. Variable - A letter or symbol used to represent an unknown number.

38 Properties Commutative- states that the order in which numbers are added or multiplied does not change the sum or product. Ex: 4+3=7 or 3+4=7 Associative- states that the way in which numbers are grouped does not change the sum or product. Ex: 1 + (2+3) = 6 or (1+2) +3= 6 Identity- states that any number added to 0 or multiplied by 1 will be itself. Ex: = 6 or 4 x 1 = 4 Distributive- is used to simplify or rewrite expressions by multiplying a number outside the parenthesis by each number or term inside the parenthesis. Ex: 4(2 + 3) = 8 +12

39 Apply the properties of operations to simplify expressions.
I Can…. Apply the properties of operations to simplify expressions.

40 Distributive Property
Essential Understanding: Distributive property can be used to rewrite algebraic expressions by multiplying the number outside the parenthesis by each number, term, or variable inside. For instance the expression 3(p+2) can be rewritten as 3p + 6 Examples: 2(3+7) (6-3)3 5(3+6d) (4-a)8 (5b+6c)8 9(ab + 4c)

41 Watch This Distributive property:
( 5 mins)

42 Puzzle Time Before we begin……. Complete an exit ticket.
Pack up everything except for your pencil. Sit quietly unit everyone is ready.

43 Wrap it Up Review Questions Exit Tickets

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