Foundations for Algebra. Introduction to Algebra I

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1 Foundations for Algebra Introduction to Algebra I

2 Variables and Expressions Objective: To write algebraic expressions.

3 Objectives 1. I can write an algebraic expression for addition, subtraction, multiplication, and division from an algebraic phrase. 2. I can write algebraic expressions using more than one operation. 3. I can write algebraic phrases when I am given an algebraic expression. 4. I can write a rule to describe a pattern using both algebraic phrases and algebraic expressions.

4 Vocabulary A mathematical quantity is anything that can be measured or counted. Some quantities remain constant. Others change, or vary, and are called variable quantities. Algebra uses symbols to represent quantities that are unknown or that vary. You can represent mathematical phrases and real world relationships using symbols and operations. A variable is a symbol, usually a letter, that represents the value(s) of a variable quantity. An algebraic expression is a mathematical phrase that includes one or more variables. A numerical expression is a mathematical phrase involving numbers and operation symbols, but no variables.

5 Key Words When you see the words more than, what do you think of? Are there any other words? When you see the words less than, what do you think of? Are there any other words? What do you think of when you see product? Are there any other words? What comes to mind if you see quotient? Are there any other words?

6 Math Vocabulary + -

7 Writing Expressions With Addition and Subtraction What is an algebraic expression for the word phrase? more than a number n less than a number n more than a number n 4. 8 minus a number y

8 Practice Write an algebraic expression for each phrase more than a number less than a number 3. The difference of a number x and The sum of a number m and 7.1

9 Writing Expressions With Multiplication and Division What is an algebraic expression for the word phrase? 1. 8 times a number n 2. Quotient of a number n and 5 3. The product of 7 and a number p 4. Quotient of a 8 and a number c

10 Practice Write an algebraic expression for each phrase. 1. Quotient of 5 and a number 2. Product of 8 and a number 3. The product of 9 and a number t 4. The quotient of 207 and a number m

11 Writing Expressions With Two Operations What is an algebraic expression for the word phrase? 1. 9 more than a number times Difference of 1 and the product of 5 and a number 3. The sum of 3 and the quotient of a number and less than the quotient of 8 and a number

12 Practice Write an algebraic expression for each phrase. 1. A number times 4 plus less than the quotient of 7 and a number more than the product of 5 and n less than the product of 37 and y

13 Using Words for an Expression What word phrase can you use to represent the algebraic expression? r 2. y m 4. 2 w 5. 10x x 1

14 Practice Write a word phrase for each algebraic expression d r y 5 z 8 9

15 Vocabulary You have learned how to write an algebraic expression from a phrase. You have also learned how to write an algebraic phrase from an expression. You can use words or an algebraic expression to write a mathematical rule that describes a real life pattern.

16 Writing a Rule to Describe a Pattern The table shows how the height above the floor of a house of cards depends on the number of levels. What is a rule for the height? Give the rule in words and as an algebraic expression. Number of Levels Height (in.) 2 (3.5 x 2) (3.5 x 3) (3.4 x 4) + 24 n?

17 Writing a Rule to Describe a Pattern A group of students built another house of cards that has 10 levels. Each card was 4 inches tall, and the height from the floor to the top of the house of cards was 70 inches. How tall would the house of cards be if they built an 11 th level?

18 Writing a Rule to Describe a Pattern Another group of students built a third house of cards with n levels. Each card was 5 inches tall, and the height from the floor to the top of the house of cards was n inches. How tall would the house of cards be if the group added 1 more level of cards?

19 Practice While on vacation, you rent a bicycle. You pay $9 for each hour you use it. It costs $5 to rent a helmet while you use the bicycle. Write a rule in words and as an algebraic expression to model the relationship in each table. Number of Hours Rental Costs 1 ($9 x 1) + $5 2 ($9 x 2) + $5 3 ($9 x 3) + $5 n?

20 Order of Operations and Evaluating Expressions Objective: To simplify expressions involving exponents. To use the order of operations to evaluate expressions.

21 Objectives 1. I can simplify powers of numbers by multiplying them out based on the power. 2. I can simplify a numerical expression by using the order of operations. 3. I can evaluate algebraic expressions using the given value for a variable in the equation. 4. I can evaluate and simplify when using real world examples.

22 Vocabulary You can use powers to shorten how you represent repeated multiplication, such as 2 x 2 x 2 x 2 x 2 x 2. A power has two parts, a base and an exponent. The exponent tells you how many times to use the base as a factor. The base is the bottom (or repeated number). If you simplify a numerical expression you replace it with its single numerical value.

23 Simplifying Powers What is the simplified form of the expression? (0.2) ( 2 3 )3 5. (0.5) 3

24 Practice Simplify each expression ( 1 2 )4 3. (0.4) ( 3) 3 6. ( 5) 4

25 Vocabulary When simplifying an expression, you need to perform operation in the correct order. Order of Operations: 1. Perform any operation(s) inside grouping symbols, such as parentheses ( ) and brackets [ ]. A fraction bar also acts as a grouping symbol. 2. Simplify powers. 3. Multiply and divide from left to right. 4. Add and subtract from left to right.

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27 Saying for Order of Operations Please Excuse My Dear Aunt Sally p stands for parenthesis e stands for exponents m stands for multiply d stands for divide a stands for add s stands for subtract Remember to multiply and divide from left to right. The same is true for addition and subtraction.

28 Simplifying a Numerical Expression What is the simplified form of each expression? 1. (6 2)

29 Practice Simplify each expression (4 2)

30 Vocabulary When two or more variables, or a number and variables, are written together, treat them as if they were within parentheses. You evaluate an algebraic expression by replacing each variable with a given number. Then simplify the expression using the order of operations.

31 Evaluating Algebraic Expressions What is the value of the expression for x = 5 and y = 2? 1. x 2 + x 12 y 2 2. (xy) 2 (xy) What is the value of the expression when a = 3 and b = 4? 1. 3b a b 2 7a

32 Practice Evaluate each expression for s = 4 and t = (s + t) 3 2. s 4 + t 2 + s 2 (3s) 3 t+t 3. s 4. 2st 2 s 2

33 Evaluating a Real-World Expression What is an expression for the spending money you have left after depositing 2 of your wages in savings? Evaluate the 5 expression for weekly wages of $40, $50, $75, and $100. Wages (w) w 2 5 w Total Spending Money

34 Evaluating a Real-World Expression The shipping cost for an order at an online store is 1 the cost of 10 the items you order. What is an expression for the total cost of a given order? What are the total costs for orders of $43, $79, $95, and $103? Online Order p p Total Cost for Order

35 Practice Write an expression for the amount of change you will get when you pay for a purchase p with a $20 bill. Make a table to find the amounts of change you will get for purchases of $11.59, $17.50, $19.00, and $20.00.

36 Real Numbers and the Number Line Objective: To classify, graph, and compare real numbers. To find and estimate square roots.

37 Objectives 1. I can simplify square roots and square root expressions without a calculator. 2. I can estimate square roots. 3. I an classify real numbers. 4. I can compare and order real numbers.

38 Vocabulary Square Root: A number a is a square root of a number b if a 2 = b. Example: 7 2 = 49, so 7 is the square root of 49. You can use the definition of the square root to find the exact square roots of some nonnegative numbers. You can approximate the square roots of other nonnegative numbers. The radical symbol indicates a nonnegative square root. The expression under the radical symbol is called the radicand.

39 Vocabulary radical symbol a radicand Together, the radical symbol and radicand form a radical. The square of an integer is called a perfect square. When a radicand is not a perfect square, you can estimate the square root of the radicand.

40 Simplifying Square Root Expressions What is the simplified form of each expression?

41 Practice What is the simplified form of each expression?

42 Estimating a Square Root Lobster eyes are made of tiny square regions. Under a microscope, the surface of the eye looks like graph paper. A scientist measures the area of one of the squares to be 386 square microns. What is the appropriate side length of the square to the nearest micron? What is the value of 34 to the nearest integer? What is the value of 242 to the nearest integer? What is the value of 61 to the nearest integer?

43 Practice Estimate the square root. Round to the nearest integer Find the approximate sine length of each square figure to the nearest whole number. 1. A game board with an area of 160 in² 2. A mural with an area of 18 m²

44 Vocabulary A set is a well-defined collection of objects. Each object is called an element of the set. A subset of a set consists of elements from the given set. A set of real numbers is formed by rational and irrational numbers.

45 Vocabulary A rational number is any number that you can write in the form a b, where a and b are integers and b cannot equal 0. Rational numbers can also be repeating decimals. An integer can be positive or negative. A whole number starts at 0 and is counted up. A natural number starts at 1 and is counted up using whole numbers. An irrational number cannot be represented as the quotient of two integers. Usually is a nonrepeating decimal or other number that in not in a b form.

46 Examples of Real Numbers RATIONAL Real Numbers IRRATIONAL INTEGER WHOLE NATURAL

47 Classifying Real Numbers Determine the set of real numbers each belongs to

48 Practice Name the subset(s) of the real numbers to which each number belongs. 1. π

49 Vocabulary An inequality is a mathematical sentence that compares the values of two expressions using an inequality symbol. The inequality symbols are: < Less than > Greater than Less than or equal to Greater than or equal to

50 Comparing Real Numbers Determine the correct inequality symbol

51 Practice Compare the numbers in each using an inequality symbol , , , ,

52 Graphing and Ordering Real Numbers What is the order from least to greatest? 1. 4, 0.4, 2 3, 2, , 2.1, 9, 7 2, , 0.3, 1, 2 13, , 31, 11, 5.5, 60 11

53 Practice Order the numbers in each from least to greatest , 2, 5, 7 4, , 3, 8, 2.9, , 20, 4.3, , 0.3, 1, 2 13, 7 8

54 Exit Ticket 1. Solve: Round to the nearest integer: Name the subsets the following belong to: π Compare: 22 25, 2 5. Order from greatest to least: 6, 20, 4.3, 59 9

55 Properties of Real Numbers Objective: To identify and use properties of real numbers.

56 Objectives I can identify the different properties of real numbers. I can use the properties to solve problems and to write equivalent expressions. I can use deductive reasoning and find counterexamples.

57 Vocabulary Two algebraic expressions are equivalent expressions if they have the same value for all values of the variable(s). a b c d e

58 Communitive Property Changing the order of the addends does not change the sum. Changing the order of the factors does not change the product. Algebra Example Addition a + b = b + a = Multiplication a b = b a 12 1 = 1 12

59 Associative Property Changing the grouping of the addends does not change the sum. Changing the grouping of the factors does not change the product. Algebra Example Addition (a + b) + c = a + (b + c) (23 + 9) + 4 = 23 + (9 + 4) Multiplication (a b) c = a (b c) (7 9) 10 = 7 (9 10)

60 Identity Properties The sum of any number and zero is the original number. The product of any number and one is the original number. Algebra Example Addition a + 0 = a = 5.75 Multiplication a 1 = a 67 1 = 67

61 Multiplication Properties Zero Property of Multiplication is the product of a number and zero which always equals zero. Multiplication Property of Negative One states that the product of negative one and a number is that number negative. Zero Property of Multiplication Multiplication Property of 1 Algebra Example a 0 = = 0 1 a = a 1 9 = 9

62 Identifying Properties What property is illustrated by each statement? a = b = -88 c. (12 + 3) + 5 = (3 + 5) + 12 d. 7 1 = 1 7 e. 4 0 = 0 f. (2 4) 6 = (6 2) 4 g = 6 h = 13

63 Practice What property is illustrated by each statement? a. 3 1 = 3 b = 14 c. ( 2 3) 8 = ( 3 8) 2 d. 7 8 = 8 7 e = 0 f ( 8) = ( 8) + 14 g = 77 h. (7 + 3) + 5 = ( 3 + 5) + 7

64 Using Properties for Mental Calculations A movie ticket costs $7.75. A drink costs $2.40. Popcorn costs $1.25. What is the total cost for a ticket, a drink, and popcorn? Use mental math. A can holds 3 tennis balls. A box holds 4 cans. A case holds 6 boxes. How many tennis balls are in 10 cases? Use mental math.

65 Practice Simplify each expression. a b. 10 x 2 x 19 x 5 c d x 12 x 4

66 Writing Equivalent Expressions Simplify each expression. a. 5 + (3n 7) b. (4 + 7b) + 8 6xy c. y d. 2.1(4.5x) e. 6 + (4h + 3) f. 8m 12mn

67 Practice Simplify each expression. Justify each step x x p pq 33xy 4. 3x (9t + 4)

68 Vocabulary Deductive reasoning is the process of reasoning logically from given facts to a conclusion. To show that a statement is not true, find an example for which it is not true. An example showing that a statement is false is a counterexample.

69 Using Deductive Reasoning and Counterexamples Is the statement true or false? If it is false, give a counterexample. For all real numbers a and b, a b = a + b. For all real numbers a, b, and c, a + b + c = b + a + c. For all real numbers j and k, j k = k + 0 j. For all real numbers m and n, m n + 1 = mn + 1.

70 Practice Use deductive reasoning to tell whether each statement is true or false. If it is false, give a counterexample. If true, use properties of real numbers to show the expressions are equivalent. For all real numbers r, s, and t, r s t = t s r For all real numbers p and q, p q = q p For all real numbers x, x + 0 = 0 For all real numbers a and b, a b = a ( b)

71 Exit Ticket 1. Name the property: a = b. (2 3) 4 = 3 (4 2) c. h + 0 = h d. 9-1 = -9 e = 0 f. 3 2 = 2 3 g. 5 1 = 5 h. (3 + 4) + 9 = 4 + (3 + 9) 2. Simplify Using Mental Math: Simplify the Expression: (2 + 3x) Tell if the expressions are equivalent: 9y 0 and 1

72 Adding and Subtracting Real Numbers Objective: To find sums and differences of real numbers.

73 Objectives I can use number lines to model addition and subtraction. I can add real numbers. I can subtract real numbers. I can solve real world problems using addition or subtraction.

74 Using Number Line Models What is each sum? Use a number line. a b. 3 + ( 5) c d. 3 + ( 5) e

75 Practice Use a number line to find each sum. a b. 4 + ( 3) c d. 3 + ( 4) e. 5 + ( 7)

76 Vocabulary The absolute value of a number is its distance from zero on a number line. Absolute value is ALWAYS nonnegative. Adding numbers with the same sign: To add two numbers with the same sign, add their absolute values. The sum has the same sign as the addends. Examples: = ( 4) = 7 Adding numbers with different signs: To add two numbers with different signs, subtract their absolute values. The sum has the same sign as the addend with the greater absolute value. Examples: = ( 4) = 1

77 Adding Real Numbers Find the sum of each. a b ( 2) c d e ( 8) f g. 9 + ( 11) h. 6 + ( 2)

78 Practice Find each sum. a b c d e

79 Vocabulary To numbers that are the same distance from zero on a number line but lie in opposite directions are opposites. A number and its opposite are called additive inverses. To find the sum of a number and its opposite, you can use the Inverse Property of Addition.

80 Vocabulary Inverse Property of Addition: For every real number a, there is an additive inverse a such that a + ( a) = a + a = 0. Example: 13 + ( 13) = 0 You can also use opposite to subtract real numbers. Subtracting Real Numbers: To subtract real numbers us the following expression a b = a + ( b). Example: 15 5 = 15 + ( 5) = 10

81 Subtracting Real Numbers Find the difference. a. 8 ( 13) b c. 9 9 d. 4.8 ( 8.7) e. 7 ( 5) 1 f g h. 36 ( 12)

82 Practice Find each difference. a b c. 7 3 d e f

83 Adding and Subtracting Real Numbers A reef explorer dives 25 feet to photograph brain coral and then rises 16 feet to travel over a ridge before diving 47 feet to survey the base of the reef. Then the diver rises 29 feet to see an underwater cavern. What is the location of the cavern in relation to sea level? A robot submarine dives 803 feet to the ocean floor. It rises 215 feet as the water gets shallower. Then the submarine dives 2619 feet into a deep crevice. Next, it rises 734 feet to photograph a crack in the wall of the crevice. What is the location of the crack in relation to sea level?

84 Practice A stock s starting price per share is $51.47 at the beginning of the week. During the week, the Price changes by gaining $1.22, then losing $3.47, then losing $2.11, then losing $0.98, and finally gaining $2.41. What is the ending stock price?

85 Exit Ticket Find the sum or difference ( 3) ( 5)

86 Multiplying and Dividing Real Numbers Objective: to find products and quotients of real numbers.

87 Objectives I can multiply real numbers. I can simplify square root expressions. I can divide real numbers. I can divide fractions.

88 Vocabulary The rules for multiplying real numbers are related to the properties of real numbers and the definitions of operations. Multiplying real numbers: The product of two real numbers with different signs is negative. Examples: 2( 3) = 6 2 x 3 = 6 The product of two real numbers with the same sign is positive. Examples: 2 x 3 = 6 2( 3) = 6

89 Multiplying Real Numbers What is each product? 1. 12( 8) 2. 24(0.5) ( 3) ( 15) 6. 12(0.2) ( 4) 2

90 Practice Find each product. Simplify, if necessary ( 1.2) 2

91 Simplifying Square Root Expressions What is the simplified form? ± ± ± 1 36

92 Practice Simplify each expression ±

93 Vocabulary Dividing Real Numbers The quotient of two real numbers with different signs is negative = 4 The quotient of two real numbers with the same sign is positive = 4 The quotient of zero and any real number is o. 0 4 = 0 The quotient of any real number and o is undefined. 4 0 = undefined

94 Dividing Real Numbers A sky diver s elevation changes by feet in 4 minutes after the parachute opens. What is the average change in the sky diver s elevation each minute? You make five withdrawals of equal amounts from your bank account. The total amount you withdraw is $360. What is the change in your account balance each time you make a withdrawal?

95 Practice Find each quotient. Simplify, if necessary

96 Vocabulary The Inverse Property of Multiplication describes the relationship between a number and its multiplicative inverse. Inverse Property of Multiplication: For every nonzero real number a, there is a multiplicative inverse 1 such that a a(1) = 1. a Example: The multiplicative inverse of 4 is 1 because = 1 4 The reciprocal of a nonzero number in the form a is b. b a The product of a number and its reciprocal is 1. The reciprocal of a number is its multiplicative inverse.

97 Dividing Fractions What is the value of x y when x = 3 4 and y = 2 3? What is the value? What is the value of x y when x = 2 7 and y = 20 21? What is the value of x y when x = 5 6 and y = 3 5?

98 Practice Find each quotient. Simplify, if necessary Find the value of the expression x for the given values of x and y y. Write your answer in the simplest form. 1. x = 2 3 and y = x = 3 8 and y = 3 4

99 Exit Ticket What is the reciprocal of 1 5? What is the product of 2 3 Solve: 4 x -5 Solve: -3 x -8 Solve: 7 x 9 and its reciprocal? Solve: Solve:

100 The Distributive Property Objective: To use the distributive property to simplify expressions.

101 Objectives I can use the distributive property to simplify expressions. I can use the distributive property to rewrite fraction expressions. I can use the multiplication property of 1 to simplify expressions. I can use the distributive property to solve mental math problems. I can combine like terms using the distributive property.

102 Vocabulary The distributive property is another property of real numbers that helps you to simplify expressions. When you are using the distributive property, you are combining like terms. You can use the distributive property to simplify the product of a number and a sum or difference.

103 Distributive Property Let a, b, and c be real numbers. a(b + c) = ab + ac 4(20 + b) = 4(20) + 4(b) (b + c)a = ba + ca (20 + b)4 = 20(4) + b(4) a(b c) = ab ac 7(30 x) = 7(30) 7(x) (b c)a = ba ca (30 x)7 = 30(7) x(7)

104 Simplifying Expressions What is the simplified form of each expression? 1. 3(x + 8) 2. 7(5 r) 3. 5(b 4) 4. 2(c + w) 5. 3(8 + y) 6. 4( e 2p)

105 Practice Use the distributive property to simplify each expression a b p (9 3r) 5. 5(4e 2r)

106 Vocabulary Recall that a fraction bar may act as a grouping symbol. A fraction bar indicates division. Any fraction a b can also be written as a 1 b. You can use this fact and the Distributive Property to rewrite some fractions as sums or differences.

107 Rewriting Fraction Expressions What is the sum or difference that is equivalent? x+2 5 4x x x x 8 2+4x 5

108 Practice Write each fraction as a sum or difference t 5 10r w x 51 17

109 Vocabulary The Multiplication Property of 1 states that 1 x r = r. To simplify an expression such as (x + 6), you can rewrite the expression as 1(x + 6).

110 Using Multiplication Property of -1 What is the simplified form? 1. (8 + 2e) 2. (4r 3b) 3. (v + re) 4. (2y 3x) 5. (a + 5) 6. ( x + 31) 7. (4x 12) 8. (6m 9n)

111 Practice Simplify each expression d 2. 4x y 4. ( 2c + b) 5. m n 6. ( c + 3y x)

112 Using Distributive Property for Mental Math Deli Sandwiches cost $4.95. What is the total cost of 8 sandwiches? Use mental math. Julia commutes to work on the train 4 times each week. A round-trip ticket costs $7.25. What is her weekly cost for tickets? Use mental math.

113 Practice You buy 50 of your favorite songs from a Web site that charges $0.99 for each song. What is the cost of 50 songs? Use mental math. One hundred and five students see a play. Each ticket costs $45. What is the total amount the students spend for tickets? Use mental math. Suppose the distance you travel to school is 5 miles. What is the total distance for 197 trips from home to school? Use mental math.

114 Vocabulary A term is a number, a variable, or the product of a number and one or more variables. A constant is a term that has no variable. A coefficient is a numerical factor of a term. Like terms have the same variable factors.

115 Combining Like Terms 8x 2-4xy + 7y 14 What are the terms? What are the constants? What are the coefficients? What are the like terms?

116 Combining Like Terms Simplify each. 1. 8x 2 + 2x y 3 z 6yz 3 + y 3 z 3. 3y y 4. -5w w mn 4 5mn h + 3h 2 4h 3

117 Practice Simplify each expression by combining like terms. 1. n + 4n 2. 2x 2 9x x 3 + 6x h + 3h 2 4h ab + 2ab 2 9ab 6. 2n + 1 4m n

118 Exit Ticket What is the simplified form? (j + 2)7-8(x 3) 3a 5a 12(2j 6) -(-m + n + 1) Use mental math: You buy 50 of your favorite songs from a Web site that charges $.99 for each song. What is the total cost of 50 songs? Use mental math.

119 An Introduction to Equations Objective: To solve equations using tables and mental math.

120 Objectives I can classify different type of equations. I can identify solutions of an equation. I can write an equation. I can use mental math to find solutions of equations. I can use a table to find a solution of an equation. I can estimate a solution of an equation.

121 Vocabulary An equation is a mathematical sentence that uses an equal sign (=). An equation is true if the expressions on either side of the equal sign are equal = 9 2 An equation is false if the expressions on either side of the equal sign are not equal = An equation is an open sentence if it contains one or more variable and may be true or false depending on the values of its variables. 4x + 5 = 13

122 Classifying Equations Is the equation true, false, or open? = = v + 13 = y + 6 = 5y = = 2 3

123 Practice Tell whether each equation is true, false, or open. Explain = t 4 = = = x + 7 = = 5

124 Vocabulary A solution of an equation containing a variable is the value of the variable that makes the equation true. In real-world problems, the word is can indicate equality.

125 Identifying Solutions of an Equation Is x = 6 a solution of the equation 32 = 2x + 12? Is m = 1 2 a solution of the equation 6m 8 = -5? Is x = 3 a solution of the equation 8x + 5 = 29? Is a = -8 a solution of the equation 9a ( 72) = 0?

126 Practice Tell whether the given number is a solution of each equation = 10 4y; b + 5 = 1; t + 2 = 4; = 2n 8; y = 11; a 72 = 0; 8

127 Writing an Equation An art student wants to make a model of the Mayan Great Ball Court in Chichén Itza, Mexico. The length of the court is 2.4 times its width. The length of the student s model is 54 inches. What should the width of the model be? The length of the ball court at La Venta is 14 times the height of its walls. Write an equation that can be used to find the height of a model that has a length of 49 centimeters.

128 Practice The sum of 4x and 3 is 8. The product of 9 and the sum of 6 and x is 1. The manager of a restaurant earns $2.25 more each hour than the host of the restaurant. Write an equation that relates the amount h that the host earns each hour when the manager earns $11.50 each hour.

129 Using Mental Math to Find Solutions What is the solution of each equation? Use mental math. 1. x + 8 = 12 a 2. = y = m = 16

130 Practice Use mental math to find the solution of each equation x = 5 x 2. = a = t = d = = 7 y

131 Using a Table to Find a Solution What is the solution of 5n + 8 = 48? Use a table. N 5n + 8 Value of 5n (5)

132 Using a Table to Find a Solution What is the solution of 25 3p = 55? Use a table. P 25 3p Value of 25 3p

133 Practice Use a table to find the solution of each equation = 6 3b 2. 5x + 3 = x 5 = = 4 + 2y

134 Estimating a Solution What is an estimate of the solution of -9x 5 = 28? Use a table. x -9x 5 Value of -9x (-1)

135 Estimating a Solution What is the solution of 3x + 3 = -22? Use a table. x 3x + 3 Value of 3x + 3

136 Practice Use a table to find two consecutive integers between which the solution lies. 1. 6x + 5 = = y b + 80 = 489

137 Exit Ticket 1. Determine if open, true or false: 85 + ( 10) = 95 4a 3b = 21 5(2) + 7 = Determine if a solution: x = 7, 6 = 2x 8 3. Write an equation: The sum of 4x and -3 is 8 4. Use mental math: 20a = Use a table to solve: 8a 10 = 38

138 Graphing in the Coordinate Plane

139 Vocabulary Two number lines that intersect at right angles form a coordinate plane. The horizontal axis is the x-axis and the vertical axis is the y-axis. The axes intersect at the origin and divide the coordinate plane into four sections called quadrants. An ordered pair of numbers names the location of a point in the plane.

140 Vocabulary These numbers are the coordinates of the point. The x coordinate 2, 4 The y coordinate. To reach the point (x, y), you use the x-coordinate to tell how far to move right (positive) or left (negative) from the origin. You then use the y-coordinate to tell how far to move up (positive) or down (negative).

141 Graph

142 Patterns, Equations, and Graphs Objective: To use tables, equations, and graphs to describe relationships.

143 Objectives I can identify solutions of a two-variable equation. I can use a table, an equation, and a graph to solve an equation. I can extend a pattern using a table, equation, and a graph.

144 Vocabulary Sometimes the value of one quantity can be found if you know the value of another. You can represent the relationship between the quantities in different ways, including tables, equations, and graphs. You can use an equation with two variables to represent the relationship between two varying quantities. A solution of an equation with two variables x and y is any ordered pair (x, y) that makes the equation true.

145 Identifying Solutions of a Two-Variable Equation Is (3, 10) a solution of the equation y = 4x? Is (5, 20) a solution of the equation y = 4x? Is (-5, -20) a solution of the equation y = 4x? Is (1.5, 6) a solution of the equation y = 4x?

146 Practice Tell whether the given equation has the ordered pair as a solution. 1. y = x + 6; 0,6 2. x = y; 3.1, y = x ; 1, y = 1 x; 2,1 5. y = x 3 4 ; (2,1 1 4 )

147 Using a Table, an Equation and a Graph Both Carrie and her sister Kim were born on October 25, but Kim was born 2 years before Carrie. How can you represent the relationship between Carrie s age and Kim s age in different ways? Carrie Kim 3 4

148 Using a Table, an Equation and a Graph Will runs 6 laps before Megan joins him at the track. They then run together at the same pace. How can you represent the relationship between the number of laps Will run and the number of laps Megan runs in different ways. Use a table, an equation, and a graph. Will Megan

149 Practice Use a table, an equation, and a graph to represent each relationship. 1. Ty is 3 years younger than Bea. 2. The number of checkers is 24 times the number of checkerboards. 3. The number of triangles is 1 the number of sides Gavin makes $8.50 for each lawn he mows.

150 Vocabulary Inductive reasoning is the process of reaching a conclusion based on an observed pattern. You can use inductive reasoning to predict values.

151 Extending a Pattern The table shows the relationship between the number of blue tiles and the total number of tiles in each figure. Write an equation and draw a graph. Number of Blue Tiles, x Total Number of Tiles, y

152 Extending a Pattern The table shows amounts earned for pet sitting. How much is earned for a 9 day job? Days, x Dollars, y

153 Practice Use the table to draw a graph and answer the question. The table shows the height in inches of stacks of tires. Extend the pattern. What is the height of a stack of 7 tires? Number of Tires, x Height of Stack, y The table shows amounts earned for pet sitting. How much is earned for a 9 day job? Days, x Dollars, y

154 Exit Ticket Is the ordered pair a solution? y = x + 6 (0, 6) y = -4x (-2, 8) Use a table, an equation, and a graph: Ty is 3 years younger than Bo. Gavin makes $8.50 for each lawn he mows. Use the table to draw a graph and answer the question: The table shows the height in inches of stacks of tires. Extend the pattern. What is the height of the stack of 7 tires? Number of Tires, x Height of Stack, y

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