Survey
* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project
Download chapter-1-lesson-plan - PreAlgebrateachers.Com
Document related concepts
Transcript
UNIT 1 Chapter 1-1 Variables and expressions PreAlgebrateachers.com www.prealgebrateachers.com Vocabulary: Expression-mathematical phrase that contains operations, numbers, AND/OR variables. ***Does not have an equal sign (=) Variable β A letter that represents a value that can change or vary 2 types of expression: ο§ Numerical Expression: Does not contain variables ο§ Variable Expression: Contains one or more variables. Numerical Expression Examples: 3+2 27-18 4(5) 3 4 www.prealgebrateachers.com Variable Expressions Examples π X+2 7 P-R 4N Writing Variable Expression Key Words: Total (+) Difference (-) Product (X) (β’) () More Than (+) Fewer Than (-) Times (X) (β’) () Increased By (+) Less Than (-) Decreased By (-) www.prealgebrateachers.com Quotient (÷) (-) (/) Divided By (÷) (-) (/) β Write the algebraic expression for the given verbal expression: Ex 1: Nine more than a number Y Ex 2: Four less than a number N Ex 3: Five times the quantity four plus a number C (See next slide for answers) www.prealgebrateachers.com β Write the algebraic expression for the given verbal expression: Ex 1: Nine more than a number Y 9+Y Ex 2: Four less than a number N N-4 Ex 3: Five times the quantity four plus a number C 5 X (4+C) or 5(4+C) www.prealgebrateachers.com Substitution Property of Equality β If two quantities are equal, then one quantity can be replaced by the other in a mathematical expression β βPlug it in Plug it in!β Evaluate each expression if K = 2, m=7, and X = 4. Ex 1: 6M-2K 6(7) β 2 (2) (replace m with 7 and K with 2) 42 - 4 38 Multiply Subtract www.prealgebrateachers.com Substitution Property of Equality Example 2: Example 3: β Evaluate each expression if K = 2, m=7, and X = 4. β Evaluate each expression if K = 2, m=7, and X = 4. β Example 2: β Example 3: = πΎπ 2 = 2 (7) 2 14 = 2 (Replace k with 2 and m with 7) (Multiply numerator) =3X + 7 (Replace x with 4 ) =3(4) +7 (Multiply 3 and 4) =12 +7 (Add) =19 (Divide fraction) =7 www.prealgebrateachers.com Letβs do some practice Evaluate: 1) 3a β 5, A=10 2) 6π 2 Y=2 3) 2X + 3Y + 4Z, X=4, Y=3, Z=2 (answers on next slide) www.prealgebrateachers.com Letβs check our answers! Evaluate: 1) 3a β 5, A=10 3 (10) β 5 30 β 5 = 25 2) 6π 2 Y=2 6 (2) 2 = 12 2 =6 3) 2X + 3Y + 4Z, X=4, Y=3, Z=2 2 (4) + 3 (3) +4 (2) 8 + 9 + 8 = 25 www.prealgebrateachers.com UNIT 1 Chapter 1-2 Order of Operations www.prealgebrateachers.com β Vocabulary: β Evaluate an expression: find the numerical value Order of Operations Rules: 1) Simplify expressions inside parenthesis ( ) 2) Simplify any exponents 3) Do all multiplication and/or division from left to right 4) Do all addition and/or subtraction from left to right www.prealgebrateachers.com Find the value of each expression: Ex 1) 4 + 15 ÷ 3 4 + 5 (divide) 9 (simplify) EX 2) 4 (5) β 3 20 β 3 (complete parenthesis) 17 (simplify) www.prealgebrateachers.com Find the value of each expression Ex 3: Ex 4: [2 + (6 β’ 8)] β 1 [ 2 + 48] β 1 (complete parenthesis) [50] - 1 49 (Add) (Simplify) 10 ÷ [9 β (2 β’ 2)] 10 ÷ [9 β ( 4)] (complete parenthesis) 10 ÷ [5] parenthesis) 2 dividing) www.prealgebrateachers.com (complete (simplify by Letβs Practice! Find the value of each expression: 1) 3 + 4 x 5 2) 6 (2+9) β 3 β’ 8 3) 53β15 17β13 www.prealgebrateachers.com Letβs check our answers! Find the value of each expression: 1) 3+4x5 3 + 20 (multiply) 23 (simplify) 2) 6 (2+9) β 3 β’ 8 6 (11) β 3 β’ 8 (complete parenthesis) 66 β 24 42 3) 53+15 17β13 (complete each multiplication) (simplify) = (53 +15) ÷ (17-13) (68) ÷ (4) 17 (rewrite as division problem) (simplify each parenthesis) (divide) www.prealgebrateachers.com UNIT 1 Chapter 1 β 2 Properties www.prealgebrateachers.com Vocabulary and Properties: β Properties: statements that are true for any numbers www.prealgebrateachers.com β Vocabulary and Properties www.prealgebrateachers.com β Vocabulary and Properties www.prealgebrateachers.com β Name the property shown by each statement: β EX 1) 3 + 5 + 9 = 9 + 5 +3 β EX 2) A β’ (9 β’ 7) = (Aβ’9) β’ 9 β EX 3) 0 + 15 = 15 Check answers next! www.prealgebrateachers.com Name the property shown by each statement: EX 1) 3 + 5 + 9 = 9 + 5 +3 Commutative Property of Addition EX 2) A β’ (9 β’ 7) = (Aβ’9) β’ 9 Associative Property of Multiplication EX 3) 0 + 15 = 15 Additive Identity www.prealgebrateachers.com You can use what youβve learned about properties of numbers to find sums and products mentally. Group numbers mentally so that sums or products end in a zero. Ex 1: 4 + 5 + 6 (4+6) + 5 (group the 4 and 6) 10 + 5 (simplify) 15 (Add mentally) EX 2: 5 β’ 7 β’ 8 (5β’8) β’ 7 (group the 5 and 8) (40) β’ 7 (simplify) 280 (multiply mentally) www.prealgebrateachers.com UNIT 1 Chapter 1 β 4 Ordered Pairs www.prealgebrateachers.com Vocabulary: Coordinate System - used to locate points and is formed by the intersection of two numbers that meet at a right angle at their zero points (also called a coordinate plane) Y-axis β Vertical number line Origin- is at (0,0), the point at which the number lines intersect www.prealgebrateachers.com X-Axis - the horizontal number line Vocabulary: An ordered pair of numbers is used to locate a point on a coordinate plane. The first number is called is the X-coordinate. The second number is called the Y-coordinate. (3, 2) The x-coordinate corresponds to a Number on the x-axis www.prealgebrateachers.com The y-coordinate corresponds to a number on the y-axis To graph an ordered pair, draw a dot at the point that corresponds to the ordered pair. The coordinates are your direction to locate the point. Example 1: Graph each ordered pair on a coordinate system (4, 2) Step 1: Start at origin Step 2: Since the x-coordinate is at 4, move 4 units to the right Step 3: Since the y-coordinate is 2, move 1 unit up. Draw a dot. www.prealgebrateachers.com Example 2: Grade the ordered pair on a coordinate system (5,0) Step 1: Start at the origin Step 2: The x-coordinate is 5. So, move 5 units to the right Step 3: Since the y-coordinate is 0, you will not need to move up. Place your dot directly on the x-axis www.prealgebrateachers.com Sometimes a point on a graph is named by using a letter. To identify its location, you can write the ordered pair that represents the point. Write the ordered pair that names each point Ex. 1) Point C Step 1: Start at the origin Step 2: Move right on the x-axis to find the X-coordinate of point C, which is 3. Step 3: Move up the y-axis to find the y-coordinate, Which is 4. The ordered pair for point C is (3,4) Ex 2) Point G The x-coordinate of G is 4, and the y-coordinate is 5. The ordered pair for point G is (4,5) www.prealgebrateachers.com
