Expressions, Equations, and Inequalities Chapter 1
1.3 Algebraic Expressions Pg. 18-24 Obj: Learn how to evaluate and simplify algebraic expressions. A.SSE.1.a
1.3 Algebraic Expressions Evaluate – substitute a number for each variable in the expression and then simplify using the order of operations Term – an expression that is a number, a variable, or the product of a number and one or more variables Coefficient – the numerical factor of a term Constant Term – a term with no variables Like Terms – have the same variables raised to the same powers
1.4 Solving Equations Pg. 26-32 Obj: Learn how to solve equations and solve problems by writing equations. A.CED.1, A.CED.4
1.4 Solving Equations Equation – a statement that two expressions are equal Solution of an Equation – finding all values of the variable that make the equation true Inverse Operations – operations that “undo” each other Identity – an equation that is true for every value of the variable Literal Equation – an equation that uses at least two different letters as variables
1.4 Solving Equations Properties of Equality Reflexive – a=a Symmetric – If a=b, then b=a Transitive – If a=b and b=c, then a=c Substitution – If a=b, then you can replace a with b and vice versa
1.4 Solving Equations Properties of Equality Addition – If a=b, then a+c=b+c. Subtraction – If a=b, then a-c=b-c. Multiplication – If a=b, then a(c)=b(c) Division – If a=b, then a/c=b/c
1.5 Solving Inequalities Pg. 33-40 Obj: Learn how to solve and graph inequalities and how to write and solve compound inequalities. A.CED.1
1.5 Solving Inequalities Compound Inequality – Two inequalities joined with the words “and” or “or” Inequality Symbols and Graphing Greater Than - > - open circle Greater Than or Equal to - > - closed circle Less Than - < - open circle Less Than or Equal to - < - closed circle
1.5 Solving Inequalities Properties of Inequalities Transitive – If a>b and b>c, then a>c Addition – If a>b, then a+c>b+c Subtraction – If a>b, then a-c>b-c Multiplication – If a>b and c>0, then ac>bc Division – If a>b and c>0, then a/c > b/c
1.6 Absolute Value Equations and Inequalities Pg. 41 – 48 Obj: Learn how to write and solve equations and inequalities involving absolute value. A.SSE.1.b, A.CED.1
1.6 Absolute Value Equations and Inequalities Absolute Value – the distance of a number from zero – always positive Extraneous Solution – a solution derived from an original equation that is not a solution of the original equation
1.6 Absolute Value Equations and Inequalities Solutions of Absolute Value Statements |x| = a x = a or x = -a |x| < a or |x| < a x < a and x > -a or x < a and x > -a |x| > a or |x| > a x > a or x < -a or x > a or x > -a