Analyzing Equations and Inequalities Objectives: - evaluate expressions and formulas using order of operations - understand/use properties & classifications of real numbers - solve equations and inequalities, including those containing absolute value
Expressions & Formulas ORDER OF OPERATIONS Parentheses Exponents Multiply/Divide from left to right Add/Subtract from left to right
Order of Operations Simplify: [9 ÷ ( )] - 8 Exponents [9 ÷ (16 - 7)] - 8 Parentheses [9 ÷ (9)] - 8 Divide [ 1 ] - 8 Subtract -7
Expressions and Formulas How do you evaluate expressions and formulas? Replace each variable with a value and then apply the order of operations.
Expressions Evaluate: a[b 2 (b + a)] if a = 12 and b= 1 Substitute: 12[1 2 (1 + 12)] Parentheses: 12[1 2 (13)] Exponents: 12[1(13)] Parentheses: 12[13] Multiply: 156
Properties of Real Numbers The properties of real numbers allow us to manipulate expressions and equations and find the values of a variable.
Number Classification Natural numbers are the counting numbers. Whole numbers are natural numbers and zero. Integers are whole numbers and their opposites. Rational numbers can be written as a fraction. Irrational numbers cannot be written as a fraction. All of these numbers are real numbers.
Number Classifications Subsets of the Real Numbers I - Irrational Z - Integers W - Whole N - Natural Q - Rational
Classify each number -1 real, rational, integer real, rational, integer, whole, natural real, irrational real, rational real, rational, integer, whole real, rational
Properties of Real Numbers Commutative Property Think… commuting to work. Deals with ORDER. It doesn’t matter what order you ADD or MULTIPLY. a+b = b+a 4 6 = 6 4
Properties of Real Numbers Associative Property Think…the people you associate with, your group. Deals with grouping when you Add or Multiply. Order does not change.
Properties of Real Numbers Associative Property (a + b) + c = a + ( b + c) (nm)p = n(mp)
Properties of Real Numbers Additive Identity Property s + 0 = s Multiplicative Identity Property 1(b) = b
Distributive Property a(b + c) = ab + ac (r + s)9 = 9r + 9s Properties of Real Numbers
5 = (2x + 7) = 10x = (2) = 2(24) (7 + 8) + 2 = 2 + (7 + 8) Additive Identity Distributive Commutative Name the Property
7 + (8 + 2) = (7 + 8) v + -4 = v + -4 (6 - 3a)b = 6b - 3ab 4(a + b) = 4a + 4b Associative Multiplicative Identity Distributive
Properties of Real Numbers Reflexive Property a + b = a + b The same expression is written on both sides of the equal sign.
Properties of Real Numbers If a = b then b = a If = 9 then 9 = Symmetric Property
Properties of Real Numbers Transitive Property If a = b and b = c then a = c If 3(3) = 9 and 9 = 4 +5, then 3(3) = 4 + 5
Properties of Real Numbers Substitution Property If a = b, then a can be replaced by b. a(3 + 2) = a(5)
Name the property 5(4 + 6) = (4 + 6) = 5(10) 5(4 + 6) = 5(4 + 6) If 5(4 + 6) = 5(10) then 5(10) = 5(4 + 6) 5(4 + 6) = 5(6 + 4) If 5(10) = 5(4 + 6) and 5(4 + 6) = then 5(10) = Distributive Substitution Reflexive Symmetric Commutative Transitive
Solving Equations To solve an equation, find replacements for the variables to make the equation true. Each of these replacements is called a solution of the equation. Equations may have {0, 1, 2 … solutions.
Solving Equations 3(2a + 25) - 2(a - 1) = 78 4(x - 7) = 2x x
Solving Equations Solve: V = πr 2 h, for h Solve: de - 4f = 5g, for e