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MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Patterns, Relationships and Functions State Standard/Benchmarks: I.1.HS.1, I.1.HS.2 Grade Level Outcome: PA-1 Infer and evaluate mathematical patterns. Enabler: 1. Analyze and generalize mathematical patterns. LEARNING ACTIVITY CONCRETE (conceptualizing) 1. Write the next three numbers in each pattern. a. 2, 4, 6, 8, _____, _____, _____ b. 30, 25, 20, 15, _____, _____, _____ c. 2, -2, 2, -2, _____, _____, _____ 2. Write a rule to describe each pattern in #1. (ans. a) 10, 12, 14 b) 10, 5, 0 c) 2, -2, 2) (ans. a. add 2 b. subtract 5 c. 2 and its opposite) Vocabulary: sequence, series 0PICTORIAL (symbolic) Which of the following is a tessellation? a. b. c. (ans. c) Which geometric shape is used in the following tessellation? (ans. equilateral triangle) Vocabulary: tessellation ABSTRACT (computational)) Make a tessellation using the following shape. Vocabulary: (ans. )))) PA-1 Enabler 1 (continued) PROBLEM SOLVING A kitchen floor is rectangular and is 3.5 m wide and 4.2 m long. How many .5 m. by .5 m square tiles are needed to tile the floor? (ans. 29.5 tiles) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Patterns, Relationships and Functions State Standard/Benchmarks: I.1.HS.3, I.1.HS.4 Grade Level Outcome: PA-1 Infer and evaluate mathematical patterns. Enabler: 2. Study and interpret models of patterns. LEARNING ACTIVITY CONCRETE (conceptualizing) Display the following information as ordered pairs: Time 1 a.m. 2 a.m. 3 a.m. 4 a.m. 5 a.m. Temp (F) 0 2 4 6 10 (ans. (1 a.m., 0) (2 a.m., 2) (3 a.m., 4) (4 a.m., 6) (5 a.m., 10)) Vocabulary: PICTORIAL (symbolic) Below are daily high temperatures in the first week of January recorded in Saginaw, Michigan. What trend does the graph illustrate concerning temperatures? Vocabulary: ordered pairs PA-1 Enabler 2 (continued) ABSTRACT (computational)) “Population Changes in Seven U.S. Cities” City New York Los Angles Chicago Houston Philadelphia San Diego Detroit 1970 7,896,000 2,818,000 3,369,000 1,234,000 1,950,000 697,000 1,514,000 1988 7,353,000 3,533,000 2,978,000 1,698,000 1,648,000 1,070,000 1,036,000 Which city has the largest decline in population from 1970 to 1988? How much was the decline? (ans. New York, 543,000) Vocabulary: PROBLEM SOLVING Construct a circle graph using the following information: Yearly Spending Patterns for the Cox Family a. b. c. d. e. f. Housing Transportation $8,000 Food & Clothing Medical Entertainment Miscellaneous $6,600 $8,000 $2,000 $2,000 $6,000 (ans.) Vocabulary: circle graph MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Patterns, Relationships and Functions State Standard/Benchmarks: I.1.HS.5 Grade Level Outcome: PA-1 Infer and evaluate mathematical patterns. Enabler: 3. Solve real-world problems. LEARNING ACTIVITY CONCRETE (conceptualizing) Not Applicable Vocabulary: PICTORIAL (symbolic) Not Applicable Vocabulary: ABSTRACT (computational)) Not Applicable Vocabulary: PROBLEM SOLVING Marjorie opened a savings account with $100 at the beginning of January. The table below shows the interest earned each month for four months. Month January February March April Interest $1.00 $1.01 $1.02 $1.03 Balance $101.00 $102.01 $103.03 $104.06 a. Describe the pattern for the values under the balance column. b. Use the pattern to extend the table for the next four months. (ans. a. Each month the interest increases by one penny. b. May, $1.04, $105.10; June, $1.05, 106.15 July, $1.06, $107.21; August, $1.07, $108.28) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Patterns, Relationships and Functions State Standard/Benchmarks: I.2.HS.1, I.2.HS.2 Grade Level Outcome: PA-2 Investigate variability and change. Enabler: 1. Investigate with ordered pairs, tables, graphs, and equations and understand rate of change. LEARNING ACTIVITY CONCRETE (conceptualizing) Give the coordinates of each pt: A, D, F. (ans. A = (0,3) D = (-3, -2 F = (-5,5)) Vocabulary: PICTORIAL (symbolic) Use the above graph to name the coordinates of any point: 1. in the first quadrant 2. between the 1st and 2nd quadrants. Vocabulary: quadrants, x-axis, y-axis (ans. 1. B (3,2) 2. A (0,3)) PA-2 Enabler 1 (continued) ABSTRACT (computational)) Not Applicable Vocabulary: PROBLEM SOLVING Graph y = 2x + 1 by completing the table and plotting the points. Then connect the points. (ans.) x y x y 0 1 -1 2 -2 0 1 -1 2 -2 Vocabulary: 1 3 -1 5 MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Patterns, Relationships and Functions State Standard/Benchmarks: I.2.HS.6 Grade Level Outcome: PA-2 Investigate variability and change. Enabler: 2. Solve real-world problems. LEARNING ACTIVITY CONCRETE (conceptualizing) Not Applicable Vocabulary: PICTORIAL (symbolic) Not Applicable Vocabulary: ABSTRACT (computational)) Not Applicable Vocabulary: PROBLEM SOLVING Two years ago the value of a new car was $12,000. Its current value is $9,000. Predict the value of the car three years from now if it continues to depreciate at the same rate. Use the graph to help find the solution. (ans. the graph indicates after five years, the car’s value is $4,500) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Geometry and Measurement State Standard/Benchmarks: I.2.HS.1, I.2.HS.2 Grade Level Outcome: PA-3 Construct and critique geometric figures. Enabler: 1. Identify plane and solid geometric figures. LEARNING ACTIVITY CONCRETE (conceptualizing) Where have you seen objects like these before? What do you call them? What geometric shape are they? What are some objects like these that you have seen in your home, school, and community. (ans. will vary) Vocabulary: PICTORIAL (symbolic) Make a collection of objects found in the classroom. Identify the geometric shapes that your items represent. (ans. Example: ball = sphere, tissue box = rectangular prism) Vocabulary: ABSTRACT (computational)) Not Applicable Vocabulary: PROBLEM SOLVING Name three real-world objects that look like: a. spheres b. cylinders c. cones d. cubes Vocabulary: (ans. will vary. Examples include; sun, golf ball, can, silo, volcano, tornadoes, dice) MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Geometry and Measurement State Standard/Benchmarks: II.1.HS.3, II.1.HS.4 Grade Level Outcome: PA-3 Construct and critique geometric figures. Enabler: 2. Draw and construct 2 and 3-dimensional figures. LEARNING ACTIVITY CONCRETE (conceptualizing) Create a variety of 2 and 3-dimensional figures using mini marshmallows and toothpicks. Vocabulary: PICTORIAL (symbolic) Create your own skeletal models of a cube using toothpicks and mini marshmallows. Using graph paper, make a drawing of each of your marshmallow-toothpick figures. Vocabulary: ABSTRACT (computational)) Using your geometric model of a cube (with marshmallows and toothpicks), find the number of: 1. edges 2. faces 3. vertices (ans. 1. 12 2. 6 3. 8) Vocabulary: PROBLEM SOLVING Circles and rectangles can be used to create 3-dimensional models. Which of the networks (flat patterns) below could be used to create a cylinder? Justify your conclusion. A B C D (ans. A & C) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Geometry and Measurement State Standard/Benchmarks: II.1.HS.6 Grade Level Outcome: PA-3 Construct and critique geometric figures. Enabler: 3. Compare and analyze shapes. LEARNING ACTIVITY CONCRETE (conceptualizing) 1. Congruent figures have the same shape and size. Which figures look congruent? A. B. C. 2. Similar figures have the same shape, but not necessarily the same size. Which figures are similar? A. B. C. 3. Which letter(s) have a line of symmetry? G M R (ans. 1. C 2. C 3. M) Vocabulary: congruent, similar, symmetry PICTORIAL (symbolic) List the pairs of equal angles in the congruent figures. 1. f a b 2. a c d d b e c c e (ans. 1. a = d; b = e; c = f 2. Vocabulary: congruent, similar ab & de , ac & df , bc & ef f PA-3 Enabler 3 (continued) ABSTRACT (computational)) ABC DEF. Find the length of AB . Use proportional thinking. D 15 F A x B 10 6 C E (ans. x/10 = 6/15, x =4) Congruent figures have corresponding sides equal in length. List the pairs of equal sides in the following congruent triangles. A D (ans. AB = DE , Vocabulary: proportional, similar, congruent, corresponding AC = DF , BC = EF ) PROBLEM SOLVING A right triangle has sides with lengths 3, 4, and 5 centimeters. The smallest side of a similar right triangle has length 9. Find the lengths of the other two sides of the similar right triangle. (ans. 3/9 = 4/x x = 12 3/9 = 5/x x = 15) ABCD EFGH. Draw two parallograms to represent this congruency. List all pairs of equal angles and equal sides. (ans.) A D B C D G E F (ans. A = D B = E D = F C = G Vocabulary: similar, right triangle, congruent AB AD DC BC = DE DG = GF = EF = MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Geometry and Measurement State Standard/Benchmarks: II.1.HS.2 Grade Level Outcome: PA-3 Construct and critique geometric figures. Enabler: 4. Apply necessary conditions to analyze shapes. LEARNING ACTIVITY CONCRETE (conceptualizing) Which of these figures is not a parallelogram? A B C D (ans. D) Vocabulary: parallelogram PICTORIAL (symbolic) 1. Draw a figure that is a parallelogram. 2. Draw figure that is not a parallelogram. (ans. 1. 2. ) Vocabulary: ABSTRACT (computational)) Write an algebraic equation that can be used to define the parallelogram ABCD. (ans. AB = CD and BC = DA) Vocabulary: PROBLEM SOLVING Measure the lengths of the sides and the angles of a parallelogram. What conclusions can you draw about angles and lengths of sides in a parallelogram? (ans. opposite sides and opposite angles are equal) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Geometry and Measurement State Standard/Benchmarks: II.1.HS.7 Grade Level Outcome: PA-3 Construct and critique geometric figures. Enabler: 5. Use shape properties and relationships to solve problems. LEARNING ACTIVITY CONCRETE (conceptualizing) Not Applicable Vocabulary: PICTORIAL (symbolic) Not Applicable Vocabulary: ABSTRACT (computational)) Not Applicable Vocabulary: PROBLEM SOLVING A shirt, to be given as a gift, is put into a box. The dimensions of the box are 35 cm, 22.5 cm, and 6.25 cm. What is the least amount of wrapping paper needed to wrap the gift? (ans. 876.25 cm2) How much leather is needed to cover a tiny ball whose radius is 6 cm? (ans. 452.16 cm2) Vocabulary: `MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Geometry and Measurement State Standard/Benchmarks: II.2.HS.3 Grade Level Outcome: PA-4 Construct and predict mathematical transformations. Enabler: 1. Plot and describe transformations. LEARNING ACTIVITY CONCRETE (conceptualizing) Identify each preimage and image as an example of translation, reflection, or rotation. a b c (ans. a. translation b. reflection c. rotation) Vocabulary: translation, reflection, rotation PICTORIAL (symbolic) Draw the reflective image of ABCD and label each reflective point. A B A B C D (ans. C D D B Vocabulary: reflective C A ABSTRACT (computational)) By adding 2 to the first coordinate of each ordered pair, will the pre-image ABC be translated to the right or left in a coordinate plane? (ans. the image will be moved 2 units to the right) Vocabulary: translate, coordinate PA-4 Enabler 1 (continued) PROBLEM SOLVING Your designer has asked you to cut a pattern for a special skirt design. Draw the arrangement of the pattern pieces that use the least amount of fabric. Pattern Pieces A B Fabric C (ans. will vary) Vocabulary: reflected over, y-axis MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Geometry and Measurement State Standard/Benchmarks: II.2.HS.3 Grade Level Outcome: PA-4 Construct and predict mathematical transformations. Enabler: 2. Compare size change. LEARNING ACTIVITY CONCRETE (conceptualizing) Create an expansion by multiplying each coordinate by 2 and graph the image. What relationship exists between corresponding lines? (ans. Corresponding line segments are parallel. Image segments are twice as long.) Vocabulary: PICTORIAL (symbolic) Create a contraction by multiplying each coordinate by ½ and graph the image. What relationship exists between corresponding lines? (ans. Corresponding line segments are parallel and the image has segments 1/2 the length of the pre-image.) Vocabulary: ABSTRACT (computational)) Not Applicable Vocabulary: PA-4 Enabler 2 (continued) PROBLEM SOLVING Make a drawing that is similar and 2.5 times the size of the drawing below. Hint: Student should assemble an axis, record coordinate points, then expand/contract its size. Vocabulary: expansion, contraction MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Geometry and Measurement State Standard/Benchmarks: II.2.HS.5 Grade Level Outcome: PA-4 Construct and predict mathematical transformations. Enabler: 3. Solve real-world problems. LEARNING ACTIVITY CONCRETE (conceptualizing) Not Applicable Vocabulary: PICTORIAL (symbolic) Not Applicable Vocabulary: ABSTRACT (computational)) Not Applicable Vocabulary: PROBLEM SOLVING Polygon ABCDEFGH outlines a top view of a school building. The architect wishes to send this outline by computer to a builder. To avoid using negative numbers, the architect slides the graph so that the images of point A is at the origin. The image is drawn here. What will be the coordinates of B', C' ,D', E', F', G', and H'? Vocabulary: (ans. B' = (320,0) C' = (320, 100) D' = (220, 100) E' = (260,40) F' = (60,40) G' = (40, 100) H' = (0, 100)) MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Geometry and Measurement State Standard/Benchmarks: II.2.HS.1, II.3.HS.3 Grade Level Outcome: PA-5 Scrutinize measurement. Enabler: 1. Make accurate measurements. LEARNING ACTIVITY CONCRETE (conceptualizing) Q: How many mm wide is the stamp? A: 15 mm Vocabulary: PICTORIAL (symbolic) Q: Where is pt. A on the meter stick? (cm & mm) A: 2cm; 20mm Vocabulary: PA-5 Enabler 1 (continued) PICTORIAL (symbolic) (continued) 1. Draw a 30 ° angle. (ans. 6) Vocabulary: ABSTRACT (computational) Not Applicable Vocabulary: PA-5 Enabler 1 (continued) PROBLEM SOLVING A. Use your folding meterstick (or metric tape or ruler) to measure these objects in your home after you first have estimated their lengths. Estimate ________ ________ ________ ________ ________ ________ 1. 2. 3. 4. 5. 6. 7. Height of a room from floor to ceiling Width of a doorway Diagonal length of a TV screen. Diagonal of a dinner plate. Length of a fork. Thickness of a telephone directory. Circumference of a small pot. B. 1. 2. 3. 4. 5. Find something in your home that measures. 1 cm ________________________________________ 5 cm ________________________________________ 10 cm _______________________________________ 50 cm _______________________________________ 100 cm ______________________________________ Vocabulary: Measurement ________ ________ ________ ________ ________ ________ MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Geometry and Measurement State Standard/Benchmarks: II.3.HS.2 Grade Level Outcome: PA-5 Scrutinize measurement. Enabler: 2. Apply measurements. LEARNING ACTIVITY CONCRETE (conceptualizing) The perimeter of a polygon is the sum of the lengths of the sides. Find the perimeter of the following polygon. A 7” 6” E B 4” 6” D C (ans. 7+6+6+4+4 = 27) 4” Area is the measure of the region inside of a two dimensional flat figure. Which of the following figures could you find the area of using the above definition? a b c d e (ans. a, c, and e) Volume measures the space inside a three dimensional figure of solid. How many cubic centimeters does this cube have? 10 cm deep 10 cm high (ans. 10 x 10 x 10 = 1,000 cm3) 10 cm across Vocabulary: perimeter, area, volume PA-5 Enabler 2 (continued) PICTORIAL(symbolic) For which of the following figures can you find perimeter? A B C 6 6 4 6 (ans. b and d) Draw two different polygons that could have an area of 24 square units. 6 (ans. 4 6 ) 8 Give an example of an object that would represent a: a. cube b. rectangular solid c. sphere (ans. a. dice b. box c. ball) Vocabulary: perimeter, area, polygons ABSTRACT (computational) Find the perimeter of a rectangle whose length is 10 cm and whose width is 6 cm. (ans. 10 + 10 + 6 + 6 = 32 cm) Find the area of the following figures: 6 A. B. 8 C. D. 10 6 6 6 6 8 10 8 12 (ans. a. 62 = 36 sq. units b. ½ 6 8 = 24 sq. units c. 102 = 100 sq. units d. ½ 8 (8+12) = 80 sq. units) PA-5 Enabler 2 (continued) ABSTRACT (computational) (continued) Find the volume of the following figures: A. B. C. 6 3 10 6 6 3 4 (ans. A. 63 = 216 cubic units B. 3 x 4 x 10 = 120 cubic units C. 4/3 33 113.04 cubic units) Vocabulary: perimeter, area, volume PROBLEM SOLVING A rectangular backyard with dimensions of 100 m by 80 m is to be enclosed with fencing. Each section of fencing is 8 m in length. How many sections of fencing will be needed to enclose the backyard? (ans. 100 + 100 + 80 + 80 = 360 m 360 / 8 = 45 sections needed) Mrs. Smith wants to fertilize her rectangular yard. The dimensions are 200 m by 100 m . A bag of fertilizer will cover 5000 sq.m. Fertilizer cost is $9.00 per bag. What would Mrs. Smith pay to fertilize her yard? (ans. 200 x 100 = 20,000 sq. m 20,000 / 5000 = 4 bags 4 bags x $9.00 = $36.00) The cargo space in a freezer is 19.8 cubic m. How many packages with dimensions 1 m by 1 m by 2 m could the freezer possibly hold? (ans. package volume =- 2 cubic meters 9 packages could fit inside the freezer) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Geometry and Measurement State Standard/Benchmarks: II.3.HS.6 Grade Level Outcome: PA-5 Scrutinize measurement. Enabler: 3. Use measurement knowledge to solve real-world problems. LEARNING ACTIVITY CONCRETE (conceptualizing) Measure your height to the nearest cm. Vocabulary: PICTORIAL (symbolic) Use the figure. a. Tell whether the angle is acute or obtuse. b. Give the measure of the angle. (ans. 1. CDE a. obtuse: b. 93 2. CDB a. acute: b. 87) B 3. A common dimension of camera film is: a. 35 km (ans. d) b. 35 cm c. 35 m d. 35 mm C . A. This picture is a close up of the markings on a giraffe. a. Tell whether the angle is acute, right, or obtuse. (ans. d) Vocabulary: acute, obtuse, right (ans. A. acute B. obtuse C. right) PA-5 Enabler 3 (continued) ABSTRACT (computational) A high school freshman might be how tall? a. 7m b. 1.7 m c. 2.2 m d. 5.6 m (ans. b) Name the type of angle and give the measure of the angle formed by the minute and hour hands of a watch at: a. 1:00 b. 4:00 c. 9:00 d. 6:30 (be careful) (ans. a. acute, 30; b. obtuse, 120; c. right, 90; d. acute, 15) Vocabulary: PROBLEM SOLVING Each edge of the cube shown at the right is 7 cm The surface area of a cube is the sum of the areas of the faces. a. How many faces does a cube have? b. What is the area of one face of the cube? c. Find the surface area of the cube. Explain how you obtained your answer. d. If you double the length of each edge of the cube, does its surface area double? Explain your reasoning. 7 cm 7 cm 7 cm (ans. Vocabulary: a. b. c. d. 6 49 cm2 294 cm2, 6(7cm)2 no 6(142) 2[6(72)]) MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Data Analysis and Statistics State Standard/Benchmarks: III.1.HS.1 Grade Level Outcome: PA-6 Collect, organize, and display data. Enabler: 1. Collect and explore data. LEARNING ACTIVITY CONCRETE (conceptualizing) Survey at least 25 people to find out what their favorite subject is in school. (ans. will vary) Vocabulary: PICTORIAL (symbolic) Organize data from your survey into a frequency distribution table. (ans. Math ||||| |||| || Science |||| |||| Soc. Studies ||| English |||| | ) Vocabulary: ABSTRACT (computational) Not Applicable Vocabulary: PROBLEM SOLVING For five days, keep track of the number of hours you watch TV, do homework, talk on the phone and sleep. Organize the data in a frequency distribution table. Pair up with another student and compare tables. Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Data Analysis and Statistics State Standard/Benchmarks: III.1.HS.2 Grade Level Outcome: PA-6 Collect, organize, and display data. Enabler: 2. Interpret graphs and tables. LEARNING ACTIVITY CONCRETE (conceptualizing) Number of Raisins in a ½ oz. box 40 _____ _____ 36 _____ _____ 32 _____ _____ 28 _____ NUMBER OF _____ RAISINS 24 _____ _____ 20 _____ _____ 16 _____ _____ 12 _____ _____ 8 _____ _____ 4 _____ 0 0 Chris Reagan Guess Amie Ann Jamie Actual Count Use the above graph to answer the following: 1. What do the two color bars represent on the graph? (ans. shaded bars represent guessing the number of raisins in a ½ oz box. White bars represent actual amount of raisins in a ½ oz box.) Vocabulary: PA-6 Enabler 2 (continued) PICTORIAL (symbolic) Use the above graph to answer the following: 1. How many raisins did Ann guess were in her box of raisins? 2. How many raisins were actually in her box of raisins? (ans. 1. 24 2. 40) Vocabulary: ABSTRACT (computational) Use the above graph to answer the following: 1. What is the difference between Ann’s guess of raisins and the actual amount of raisins? (ans. 16) Vocabulary: PROBLEM SOLVING Collect three samples of graphs from the newspaper or magazines. Write a short paragraph that describes the information found in the graph. Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Data Analysis and Statistics State Standard/Benchmarks: III.1.HS.2 Grade Level Outcome: PA-6 Collect, organize, and display data. Enabler: 3. Organize data into tables, charts, and graphs. LEARNING ACTIVITY CONCRETE (conceptualizing) With a set of data (given or collected on own), organize it into tables, scatter plots, box plots, stem and leaf and histogram. Vocabulary: tables, scatter plots, box plots, stem and leaf, histogram PICTORIAL (symbolic) 1. Table/Scatter Plot 2. Line Plot Example: Sixteen students estimated how much television they watched each week, to the nearest hour. Here are their results: 14, 16, 12, 14, 11, 20, 8, 10, 16, 15, 17, 5, 15, 10. Show these results on a line plot. Vocabulary: line plot (ans.) (ans.) PA-6 Enabler 3 (continued) PICTORIAL (symbolic) 3. Box Plot The Federal Highway Administration keeps track of the average miles per gallon for vehicles driven in each state. The table below shows the data for the Midwestern States region for 1992. Use the data to make a box-and-whisker plot. Average Milage in the Midwestern States Region State Illinois Indiana Iowa Kansas Michigan Minnesota Missouri Nebraska North Dakota Ohio South Dakota Wisconsin Miles per Gallon 13.47 16.19 13.75 15.29 17.33 17.65 15.52 14.54 14.66 15.56 15.22 18.05 4. Histogram Each week, Billboard 200 lists the 200 top-selling albums. It also shows how many weeks each album has been on the Top-200 Chart. As of May 10, 1997, the top 25 albums had been on the chart these number of weeks: 1, 1, 12, 6, 24, 43, 63, 59, 1, 11, 42, 33, 69, 11, 8, 7, 2, 6, 39, 7, 45, 24, 5, 10. (Source: Billboard) (ans.) Show the results on a histogram. Number of Weeks on the Top-200 Chart (as of 5/10/97) Number of Weeks Frequency 1-20 14 21-40 5 41-60 4 61-80 2 Vocabulary: 14 12 10 8 Frequency 6 4 2 0 1-20 21-40 41-60 Number of Weeks 61-80 PA-6 Enabler 3 (continued) PICTORIAL (symbolic) (continued) 5. Stem and Leaf As of 1997, the following are the ages, in chronological order, at which U.S. Presidents were inaugurated: 57, 61, 57, 57, 58, 57, 61, 54, 68, 51, 49, 64, 50, 48, 65, 52, 56, 46, 54, 49, 50, 47, 55, 55, 54, 42, 51, 56, 55, 51, 54, 51, 60, 62, 43, 55, 46, 61, 52, 69, 64, 46, Use a stem-and leaf plot to help you summarize the data. (ans.) AGES OF US PRESIDENTS WHEN INAUGURATED Stem Leaves 4 2, 3, 6, 6, 7. 8. 9. 9. 5 0, 0, 1, 1, 1, 1, 2, 2, 4, 4, 4, 4, 5, 5, 5, 5, 6, 6, 6, 7, 7, 7, 7, 8, 6 0, 1, 1, 1, 2, 4, 4, 5, 8, 9, Key: 4|2 represents 42 years Vocabulary: ABSTRACT (computational) Not Applicable Vocabulary: PROBLEM SOLVING Keep track of the high and low temperatures where you live each day for a week. Organize the data in several ways and make at least three different types of graphs using this data. (ans. will vary) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Data Analysis and Statistics State Standard/Benchmarks: III.1.HS.4 Grade Level Outcome: PA-6 Collect, organize, and display data. Enabler: 4. Model real-world problems. LEARNING ACTIVITY CONCRETE (conceptualizing) Not Applicable Vocabulary: PICTORIAL (symbolic) Not Applicable Vocabulary: ABSTRACT (computational) Not Applicable Vocabulary: PROBLEM SOLVING Using the information displayed, make a double bar graph and answer the following questions . 1. Which cities gained in population between 1970 and 1988? 2. What conclusion could one make from the information about population trends in this time period? (ans. sample) 1970 Population 7,896,000 2,812,000 3,369,000 1,234,000 1,950,000 697,000 1,514,000 1988 Population 7,353,000 3,533,000 2,978,000 1,698,000 1,648,000 1,070,000 1,036,000 (ans. 1. Los Angeles, Houston, San Diego 2. Sample: Population moved toward the Southwest.) Vocabulary: double bar graph 10,000,000 8,000,000 6,000,000 4,000,000 2,000,000 0 N e Lo w Y s or A k ng el C es hi ca H go ou P hi sto la n de S lph an ia D ie g D o et ro it City New York Los Angeles Chicago Houston Philadelphia San Diego Detroit 1970 Population 1988 Population MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Data Analysis and Statistics State Standard/Benchmarks: III.2.HS.1 Grade Level Outcome: PA-7 Analyze and interpret data. Enabler: 1. Critique data from tables, charts, and graphs. LEARNING ACTIVITY CONCRETE (conceptualizing) To display means to show. The most common ways of displaying numbers are in graphs and tables. Below, a day in the life of a high school freshman is displayed in three different ways. Bar Graph 9 8 7 6 5 4 3 2 1 0 Series2 E at S Tr c an h sp ool or ta ti o H n o S m ch e w oo l A ork ct iv iti R es el ax at io n 8 1.5 7 1 2 2 2.5 S le ep Sleep Eat School Transportation Homework School Activities Relaxation Number of hours Table Activity Pie Chart Relaxation 10% School Activities 8% Sleep 34% Homework 8% Transportation 4% Eat 6% School 30% Vocabulary: interval 1. What is the interval of the scale of this students day? 2. Are the bars on this graph horizontal or vertical? 3. The student could spend more time on homework. Where could the time come from? (ans. 1. 1 hr 2. vertical 3. relaxation time) PA-7 Enabler 1 (continued) PICTORIAL (symbolic) Use the coordinate graph to the right. 1. Is the cost of insurance increasing or decreasing? 2. How much did medical insurance cost in 1980? 3. In what year did the average cost of medical insurance exceed $200/year? 4. True or false? In 1988 medical insurance costs hit a record high of $484 per year. . (ans. 1. increasing 2. $97/year 3. 1983) Vocabulary: PA-7 Enabler 1 (continued) ABSTRACT (computational) (ans. Vocabulary: 1. 2. 3. 4. Between 1950 & 1960 135,000,000 1960 – 1970 approx. 30,000,000 1930 – 1940 approx. 10,000,000) PA-7 Enabler 1 (continued) PROBLEM SOLVING Outlined below is a miniature golf hole. All the angles are right angles. Lengths of sides are given. Suppose this outline were graphed with A at (0,0) and H on the x-axis. (ans. a. B (0,10) C (6,10) D (6,4) E (9,4) G (15,10) H (15, 0) b. (12,10) c. (3,7)) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Data Analysis and Statistics State Standard/Benchmarks: III.2.HS.2 Grade Level Outcome: PA-7 Analyze and interpret data. Enabler: 2. Determine the measures of central tendency. LEARNING ACTIVITY CONCRETE (conceptualizing) A student scores 89, 72, 99, 93, and 81 on five tests. Give the range, median, mean, and mode of this set of numbers. (ans. The range is the difference of the largest and smallest numbers. 99 – 72 = 27. The range is 27. The median is the middle number is the numbers are in numerical order. So order the numbers: 72, 81, 89, 93, 99. The middle number is 89, the median. No number appears more often than the others. Therefore, this set of numbers has no mode. Mean: The mean is the average of the given numbers. First add the five scores and then divide by four. (89 72 99 93 81) 5 mean = 86.8 Vocabulary: range, median, mean, mode PICTORIAL (symbolic) Below are the state sales tax rates charged on restaurant meals in the 50 states. | | | | | | 0 1 2 3 4 5 A. B. C. D. | 6 | 7 percent How many states charge 4% or less? How many states use tax rates that involve a fraction of a percent? Find the mode for the data. Find the mean for the data. (ans. A. 33 states, B. 6 states, C. 4%, D. 3.44%) Vocabulary: PA-7 Enabler 2 (continued) ABSTRACT (computational) The school board reported the average teacher salary was $44,000. The teacher association stated that the most frequent salary earned was $41,000. The Saginaw News stated that the middle salary was $43,000. State which measure of central tendency each group is using. (ans. school board: mean, teacher association: mode, Saginaw News: median) Vocabulary: central tendency PROBLEM SOLVING In ten basketball games, Kim scored 9, 12, 11, 8, 11, 15, 15, 16, 15, and 19 points. To the nearest tenth of a point, find the mean, the median, the mode, and the range. (ans. Vocabulary: Mean: 13.1 Median: 13.5 Mode: 15 Range: 11) MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Data Analysis and Statistics State Standard/Benchmarks: III.2.HS.5 Grade Level Outcome: PA-7 Analyze and interpret data. Enabler: 3. Solve real-world problems. LEARNING ACTIVITY CONCRETE (conceptualizing) Not Applicable Vocabulary: PICTORIAL (symbolic) Graph the following temperatures and find the mode, median, and the range for the average monthly temperatures given in degrees Celsius: -1.5, -2, -1, 5, 24.5, 28, 33.5, 34, 28.5, 18.5, 6, 1.5. (ans.) Mean: 14.58 Median: 12.25 Mode: None Range: 36 Vocabulary: ABSTRACT (computational) Not Applicable Vocabulary: PA-7 Enabler 3 (continued) PROBLEM SOLVING Each student will develop a graph (bar/circle/coordinated) by gathering data from a school related activity. After plotting the graph the student will analyze and interpret the data in the form of writing related questions to be answered by their peers. Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Data Analysis and Statistics State Standard/Benchmarks: III.3.HS.1 Grade Level Outcome: PA-8 Draw conclusions and make predictions. Enabler: 1. Make and test hypotheses. LEARNING ACTIVITY CONCRETE (conceptualizing) Not Applicable Vocabulary: PICTORIAL (symbolic) Not Applicable Vocabulary: ABSTRACT (computational) The science teacher lost five test papers, and of course, mine was one of them. He found a summary of the missing scores which said that the mode of the scores was 90, the median was 85, and the mean was 83. This summary sounds pretty good! How bad could my score be? The grades were whole numbers between 0 and 100. What is the lowest possible score I might have gotten? (ans. 66 Explanation: Mode: 90 7 90 7 85 2 85 1 ?? ?? These scores total 17 above the mean. To make the average of the scores come out to 83, the missing score must be 17 below the mean: 83 – 17 = 66.) Vocabulary: PA-8 Enabler 1 (continued) PROBLEM SOLVING A hypothesis is an educated guess. To find if a hypothesis is true, you must test it. A 5 3 B 6 C 9 10 15 1. Write a hypothesis about the ratio of the perimeters and areas of two similar figures. 2. Make a table with entries for base, height, perimeter, and area and find this information for similar figures A, B, and C. 3. Use the information in your chart for figures B and C to answer the following questions. Write all fractions in lowest terms. a. What is the ratio of the heights? b. What is the ratio of the bases? c. What is the ratio of the perimeters? d. What is the ratio of the areas? 4. Do you need to revise your hypothesis? Do so, if necessary. Test it on figures A and C. 5. Predict the ratio of the perimeters and areas of two triangles if the ratio of their heights is 5/8. (ans. 1. may vary b h p 2. a A 5 3 16 15 B 10 6 32 60 C 15 9 48 135 3. a. 2/3 b. 2/3 c. 2/3 d. 4/9 4. A possible response: Square of heights equal ratio of areas. 5. 5/8, 25/64 Vocabulary: hypotheses, ratio MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Data Analysis and Statistics State Standard/Benchmarks: III.3.HS.2, III.3.HS.5 Grade Level Outcome: PA-8 Draw conclusions and make predictions. Enabler: 2. Design experiments to model and solve problems. LEARNING ACTIVITY CONCRETE (conceptualizing) Not Applicable Vocabulary: PICTORIAL (symbolic) Not Applicable Vocabulary: ABSTRACT (computational) Not Applicable Vocabulary: PROBLEM SOLVING Collect Data The school bookstore plans to stock sweatshirts, hats, and jackets. It is important not to overstock. The store manager asks you to determine the number, color, and size of each item to order. 1. Write a survey questionnaire to find out student interest. Design the questionnaire so that you can estimate the sales by color and size of each item. 2. Who will you survey? Will a random survey suit your purposes or will selecting survey groups from each grade level be a more accurate method of determining your market? 3. Where will you conduct the survey? Will verbal responses be as helpful as written responses? 4. Conduct the survey. Analyze Data 5. Calculate the number of expected sales for each item by color and size. 6. In collecting data, was interest expressed in items not on your list? Do you need to expand your choices and do another survey? Make Decisions 7. Decide if you will order exactly the number of items you have found to be your expected sales. Should you order more? Less? Explain your decision. 8. Contact a supplier to find the wholesale cost of each item. Determine what price you will set for each item. 9. Present your results to the school bookstore or to some other group for a fund-raising project. (ans. will vary) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Number Sense and Numeration State Standard/Benchmarks: IV.1.HS.1 Grade Level Outcome: PA-9 Analyze and apply properties of real numbers. Enabler: 1. Develop an understanding of the properties of real numbers. LEARNING ACTIVITY CONCRETE (conceptualizing) Match each property with its general form. 1. 4+3=3+4 2. 7(2+3)=72+73 3. 4x1/4=1 4. (4+2)+3=4+(2+3) 5. 7+0=7 6. -6+6=0 7. 121=12 8. 2/3=12/18 a. b. c. d. e. f. g. h. Multiplicative Identity Commutative Property of Addition Property of Opposites Distributive Property Additive Identity Property of Reciprocals Associative Property of Addition Means and Extremes Property (ans. 1b, 2d, 3f, 4g, 5e, 6c, 7a, 8h) Vocabulary PICTORIAL (symbolic) Write the math equation that is pictured for each of the properties listed below. 1. ASSOCIATIVE PROPERTY DATE DEPOSIT WITHDRAWAL 24-Oct $150.00 27-Oct $70.00 31-Oct $100.00 1-Nov $40.00 3-Nov $60.00 6-Nov $50.00 (ans. (150+-70)+(100+-40)+-(60+50)=130) 2. COMMUTATIVE PROPERTY (ans. 3 x 5 = 5 x 3) Vocabulary: associative property, commutative property PA-9 Enabler 1 (continued) PICTORIAL (symbolic) 3. DISTRIBUTIVE PROPERTY 8X20 8X3 (ans.) 8 23 = 8(20+3) = (820) + (83) = 160+24 = 184) 23 4. ADDITIVE IDENTITY | -3 | -2 | -1 5. | 0 MULTIPLICATIVE IDENTITY 1= (ans. n 1 = n) (ans. –3 + 0 = -3) PROPERTY OF RECIPROCAL 4X = (ans. 4 1/4 = 1) PROPERTY OF OPPOSITES $5 in wallet -$5 out of wallet = $0 left in wallet (ans. 5 + -5 = 0) MEANS AND EXTREMES PROPERTY A B D C E F (ans. AB AC = ) DE DF Vocabulary: additive identity, property of reciprocal, property of opposites, means and extremes property, distributive property, multiplicative identity PA-9 Enabler 1 (continued) ABSTRACT (computational) Complete: Associative Property: Commutative Property Distributive Property Additive Identify Multiplicative Identity Property of Reciprocal Property of Opposites Means and Extremes Property (4 + 2) + 3 = + (2 + 3) 4+3=+4 7(2 + x) = 7 + 7 7+=7 12 = 12 ¼=1 -6 + = 0 AB = AC DE DF Vocabulary: PROBLEM SOLVING Means and Extremes Property: 1. Suppose six bags of wheat cost 11 silver pieces. How much should 10 bags cost? (ans. 11 P = ; P = 18 1/3) 6 10 Distributive Property: 2. You own a small business that has three employees. You pay one employee $1800 a month, the second $1500 a month, and the third $1300 a month. a. Write an algebraic model that represents how much you pay all three employees in the year. b. Use the model in part a to determine how much you pay your employees in a year. (ans. a. 12(1800 + 1500 + 1300) b. (21600 + 18000 + 15600) = 55200) Commutative & Associative Properties: 1. On November 1, a person has $400 in a savings account. Below are the transactions for the next two weeks. Date Deposit Withdrawal 3-Nov $ 102.00 5-Nov $ 35.00 8-Nov $ 75.00 11-Nov $ 40.00 12-Nov $ 200.00 Using commutative and associative properties, calculate the amount in the account at the end of the day on November 12. (ans. $232.00) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Number Sense and Numeration State Standard/Benchmarks: IV.1HS.4 Grade Level Outcome: PA-9 Analyze and apply properties of real numbers. Enabler: 2. Apply knowledge of properties to real-world problems. LEARNING ACTIVITY CONCRETE (conceptualizing) Not Applicable Vocabulary: PICTORIAL (symbolic) Not Applicable Vocabulary: ABSTRACT (computational) Not Applicable Vocabulary: PROBLEM SOLVING The Smith family drove 230 miles the first day and 185 miles the second day. If they reversed the driving distance by driving 185 miles the first day and 230 miles the second day, what would be the results. Name the appropriate property used to solve the problem. (ans. Commutative Property, 415 miles) There are eight people who received a check for $23.00. What property would allow each person to receive a $20 bill and 3 ones? 8 x 23 = 8(20 + 3) (ans. Distributive Property) Suppose a dozen cookies cost $6.60. How much will 2 cookies cost? Name the property used to solve the problem. (ans. Means and Extremes Property, $1.10) Three friends went to the bulk food store. Sally bought $3.00, Tom bought $2.50, and Pat bought $7.25 worth of candy. They also all bought trail mix. Sally bought $7.25, Tom bought $3.00, and Pat bought $2.50 worth. Was the total dollars spent on candy more than the total spent on trail mix? What property does this show? (ans. Total dollars are the same, 3.00 + 2.50 + 7.25 = 7.25 + 3.00 + 2.50. Shows the commutative property) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Number Sense and Numeration State Standard/Benchmarks: IV.2.HS.1 Grade Level Outcome: PA-10 Analyze the representations and use of numbers. Enabler: 1. Recognize and generate equivalent representations of a number. LEARNING ACTIVITY CONCRETE (conceptualizing) If 1/2 = .5 = 50% and 1/4 = .25 = 25% then 1/2 + 1/4 = __________ or __________ or __________. a. fraction b. decimal c. percent (ans. a. 3/4 b. .75 c. 75%) ******************** Fill in the missing letter with the correct answer. Power of 10 Word Name Written as a decimal 101 __________A 10 102 hundred 100 103 thousand 1000 106 million __________B _____C billion 1,000,000,000 _____D trillion __________E 1015 quadrillion 1,000,000,000,000,000 Answer the following: Decimal Notation 340.67 2.380,000,000 __________B Scientific Notation 3.4067 x 102 __________A 6 x 1013 *********************** (ans. A. ten B. 1,000,000 C. 109 D. 1012 E. 1,000,000,000,000) (ans. A. 2.38 x 109 B. 60 trillion) The square of 25 is 625. Twenty-five is called the square root of 625. Which of the following numbers have square roots that are integers? a. 25 b. 30 c. 144 d. 200 (ans. a, c) Vocabulary: square root, integers PA-10 Enabler 1 (continued) PICTORIAL (symbolic) Given the following information, find the fraction and percent equivalent. Decimal: 0.9 Word name: nine tenths Fraction: ______________ Percent: ______________ Decimal: 0.64 Word name: sixty-four hundredths Fraction: __________________ Percent: ___________________ (ans. a) 9/10, 90% b) 64/100, 64% ****************** Would you rather have $100 a day for 30 days or 2¢ on Day 1, 4¢ on Day 2, 8¢ on Day 3 and so on? (ans. 100 a day for 30 = $3000, daily totaled each day = $10,737,418.24) ******************** Between what two consecutive whole numbers is Vocabulary: ABSTRACT (computational) Find the missing numbers: Fraction Decimal a. 1/2 .5 b. _____ .75 c. 1/100 _____ d. _____ .05 40 (ans. 6 and 7) Percent _____% 75% 1% 5% (ans. a. 50%, b. 75/100 or 3/4, c..01, 5/100 or 1/20) ******************** Solve: 25 + 16 b. 100 44 c. a. (ans. a. 9; b. 12; c. 3, d. 17) Vocabulary: 36 x 4 / 16 d. ( 17 ) PA-10-Enabler 1 (continued) PROBLEM SOLVING The probability of a single birth being a boy is about .52. Convert this number to a percent. (ans. 52%) ******************** The distance from Earth to the Sun is about 150,000,000 km. Write this number in scientific notation. Solution: First, move the decimal point to get a number between 1 ans 10. In this case, the number is 1/5 and this tells you the answer will look like this: 1/5 x 10exponent The exponent of 10 is the number of places you must move the decimal in 1/5 to the right in order to get 150,000,000. You must move it 8 places, so the answer is 1.5 x 108 ******************** The area of a square shaped deck is 196 square feet. How long is each side of the deck? (ans. Vocabulary: exponent 196 = 14 ft.) MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Number Sense and Numeration State Standard/Benchmarks: IV.2.HS.4 Grade Level Outcome: PA-10 Analyze the representations and use of numbers. Enabler: 2. Apply and refine strategies for estimating quantities. LEARNING ACTIVITY CONCRETE (conceptualizing) Drawing pencils are sold in packages of 10. If a teacher needs one pencil for each student in a class of 32, how many boxes must be bought? (ans. 4 boxes) Vocabulary: PICTORIAL (symbolic) The area of a room is 90.25 sq.m. If carpet is sold at $3.00 of sq.m. and you have $300.00, will you be able to carpet the room? Estimate your answer. (ans. yes) Vocabulary: ABSTRACT (computational) If small cans of grapefruit juice are 5 for $1.69, estimate how many cans can be bought for $10.00? (ans. 30 cans) Vocabulary: PROBLEM SOLVING A town’s population, rounded to the nearest hundred, is 800. What is the smallest possible actual population? (ans. 750) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Number Sense and Numeration State Standard/Benchmarks: IV.2.HS.5 Grade Level Outcome: PA-10 Analyze the representations and use of numbers. Enabler: 3. Use knowledge of number systems to solve problems. LEARNING ACTIVITY CONCRETE (conceptualizing) Not Applicable Vocabulary: PICTORIAL (symbolic) Not Applicable Vocabulary: ABSTRACT (computational) Not Applicable Vocabulary: PA-10 Enabler 3 (continued) PROBLEM SOLVING An electron microscope can magnify an object 105 times. The length of a poliomyelitis virus is 1.2 x 10 -8 cm. Multiply this length by 105 to find how many meters long the virus would appear to be when viewed through this microscope. (ans. .12 cm) It rains or snows on about 42% of the days of the year in Seattle, Washington. About how many days per year is this? (ans. 153) The population of the world passed 5.3 billion in 1990. This number is 5,300,000,000 and has too many digits for most calculators. Write it in scientific notation so that it can be entered into a calculator and used. (ans. Since 1 billion = 109, 5.3 billion = 5.3 x 109 So, the number is 5.3 x 109 in scientific notation.) You are making a comic book that is 11.5 cm by 16 cm. Each page of the comic book has a bottom and a top margin of 1.7 cm and a left and right margin of .6 cm. a. What is the perimeter of the page. b. What are the dimensions of the printed portion of the page? (ans. a. 55 cm b. 10.3 cm x 12.6 cm) Write and equation and solve. A 13-meter extension ladder is placed 5 meters away from a building. How high will it reach? (Use h for height.) a. equation b. solution 13 m 5m Vocabulary: (ans. a. 52 + h2 = 132 b. 12) MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Number Sense and Numeration State Standard/Benchmarks: IV.2.HS.1 Grade Level Outcome: PA-11 Compare number relationships. Enabler: 1. Compare and order real numbers. LEARNING ACTIVITY CONCRETE (conceptualizing) Order the following numbers from lowest to greatest. 0 -3 2 1/2 -0.25 (ans. –3 -0.25 0 1/2 2) Vocabulary: PICTORIAL (symbolic) The thermometers pictured at the right show Joanne’s body temperature on three consecutive days of a cold. Put the three numbers into one sentence connected by inequality symbols. (ans. 100.4 > 99.8 > 99.2) Vocabulary: inequality symbols ABSTRACT (computational) Draw a real-number line. Put the following on the real-number line. (ans.) Vocabulary: -1/2 0 7 1 1/4 -2 1/3 -4 PA-11 Enabler 1 (continued) PROBLEM SOLVING Sam and Amy had two equal sized pizzas. Sam cut his pizza into three equal parts. Amy cut her pizza into eight equal parts. Sam ate two of the three pieces of a small pizza. Amy ate five of the eight pieces of the same size. Compare 2/3 and 5/8 to find out who ate more. (ans. 2/3. Sam ate more) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Number Sense and Numeration State Standard/Benchmarks: IV.2.HS.2, IV.3.HS.3 Grade Level Outcome: PA-11 Compare number relationships. Enabler: 2. Express numeric relationships. LEARNING ACTIVITY CONCRETE (conceptualizing) A prime number has only two factors: itself and one. Example: 7 x 1 = 7 A composite number has three or more factors. Determine whether each number is prime or composite. a) 11 b) 12 c) 15 d) 53 (ans. a) prime b) composite c) composite d) prime) A factor is a number that divides another number exactly. Which of the following is a factor of 20? a) 7 b) 15 c) 3 d) 5 (ans. D) The first five multiples of ten are 10, 20, 30, 40, and 50. List the first three multiples of eight. (ans. 8, 16, 24) The ratio of boys to girls in Mr. Smith’s class is 2 to 3. If there are 30 students in the class, how many girls are there? (ans. 18 girls) Rates are usually expressed using the word per. If Tom made $400 in 8 hrs. of work express his rate of income in dollars per hour. (ans. 400/8 = $50 per hr.) Reciprocals are two numbers whose product is one. Six is the reciprocal of one-sixth. Which of the following pairs of numbers are reciprocals? a) 10, 1/10 b) 4/3, 3/4 c) 4, 4/1 (ans. a & b) Vocabulary: prime, composite, factor, multiple, reciprocal, ratio, rate PA-11 Enabler 2 (continued) PICTORIAL (symbolic) Not Applicable Vocabulary: ABSTRACT (computational) List all prime numbers between 30 and 50. (ans. 31, 37, 41, 43, 47) List all composite numbers between 30 and 50. (ans. 32, 33, 34, 35, 36, 38, 39, 40, 42, 44, 45, 46, 48, 49) List the factors of 24 and 60. Then state the greatest common factor. (ans. F24 = 1, 2 ,3, 4, 6, 8, 12, 24, F60 = 1, 2, 3, 4, 5, 6, 10, 12, 15, 20, 30, 60) GCF = 12) Find the least common multiple of 12 and 15. (ans. 60) Determine whether the quotient is a rate or a ratio and then simplfy. 16 yards/2 jumps (ans. rate 8 yd/jump) 28 points/4 quarters (ans. rate 7pt/qt) 2 animals/20 animals (ans. ratio 1/10) 4 feet/10 seconds (ans. rate .4 ft/sec) Find the reciprocals of the following numbers. a. 3 b. 0.5 c. 2 1/2 d. –3 e. 3/5 (ans. a. 1/3 b. 2 c. 2/5 d. –1/3 e. 5/3) Vocabulary: PA-11 Enabler 2 (continued) PROBLEM SOLVING Tell whether the following numbers are prime or composite. a. The number of liters in a kiloliter. b. The number of months in year. c. The number of days in a week. d. The number of sides in a hexagon. e. The number of sides in a pentagon. (ans. a. composite (4), b. composite (12), c. prime (7), d. composite (6), e. prime (5)) A physical education teacher has class sizes of 48, 60, 54, 48, and 36. The teacher wants to form equivalent basketball teams in each of his classes. How many students could be placed on each team, so that they have the same number of participants. (ans. 6) If two out of every five voters intend to vote Republican in a recent survey, how many votes should a Republican candidate expect to receive from 20,000 votes cast. (ans. 8,000) A 1200 mile trip to Panama City took 20 hours. Find the mean speed for the entire trip. (ans. 60 mph) A large cake was bought for a party. First the cake was cut into 20 pieces. These pieces were too large, so each was cut into two smaller pieces. Kris at one of the smaller pieces. What part of the cake did she eat? (ans. 1/40) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Numerical and Algebraic Operations State Standard/Benchmarks: IV.3.HS.5 Grade Level Outcome: PA-11 Compare number relationships. Enabler: 3. Use number relationships to solve real-world problems. LEARNING ACTIVITY CONCRETE (conceptualizing) Not Applicable Vocabulary: PICTORIAL (symbolic) Not Applicable Vocabulary: ABSTRACT (computational) Not Applicable Vocabulary: PROBLEM SOLVING At the end of the 1989-1990 season, hockey player Wayne Gretsky had scored 691 goals in 853 games in his career. At this rate, in what game would he score his 1000th goal? Give several methods for finding the solution and justify your answer in writing. Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Numerical and Algebraic Operations and Analytical Thinking State Standard/Benchmarks: V.1.HS.1 Grade Level Outcome: PA-12 Assess algebraic operations and their properties. Enabler: 1. Present symbolic models for real numbers. LEARNING ACTIVITY CONCRETE (conceptualizing) Each student will be given a package of M & Ms candies. Use the candies to form an algebraic equation based on color. Example: 2r + 3b = 5 Vocabulary: PICTORIAL (symbolic) At Saturday’s Middle School Pizza Party, each student was given a whole small pizza. The students cut and ate what they wanted. At the end of the party these pizzas were left on a table. How much of each pizza did each student eat? Order the amount eaten from greatest to least. (ans. 0, 5/8, 3/4) Vocabulary: ABSTRACT (computational) Nina’s car can reach 60 mph in 30 sec. Luann’s truck can reach 85 mph in 1 minute. Who would receive the handicap (seconds spotted to a slower driver) and how many seconds would it be? (ans. Luann; 12.5 seconds) Vocabulary: PROBLEM SOLVING You have a baby-sitting job. You work after school for three hours on Wednesday, Thursday, and Friday, and nine hours on Saturday. You earn x dollars an hour. a. Write an expression that represents your weekly earnings. b. Suppose you earn $3.25 an hour. How much money would you earn? (ans. a. 3(3x) + 9x or 18x Vocabulary: b. $58.50) MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Numerical and Algebraic Operations and Analytical Thinking State Standard/Benchmarks: V.1.HS.2 Grade Level Outcome: PA-12 Assess algebraic operations and their properties. Enabler: 2. Compute with real numbers. LEARNING ACTIVITY CONCRETE (conceptualizing) Draw a number line to find each sum. a. -4 + 3 b. 6 + (-2) c. 2 + (-7) (ans. ) Vocabulary: PICTORIAL (symbolic) Use +/;- counters to model 4 + (-2). (ans. ) Vocabulary: ABSTRACT (computational) Solve: 1) -15 + -3 2) 68 + -25 3) -3 – (-7) 4) –5 – 6 5) 8(-6) 6) -21(-8) 7) -6/-2 8) 28 ÷ (-4) Vocabulary: (ans. (-18) (43) (4) (-11) (-48) (168) (3) (-7) ) )))) PA-12 Enabler 2 (continued) PROBLEM SOLVING Finding a Temperature The thermometers at the right show the temperatures (in degrees Celsius) at 1 p.m., 2 p.m., and 3 p.m. a. Use the thermometers to approximate the temperatures. b. Write an addition equation that relates the temperatures at 1 p.m. and 2 p.m. c. Write an equation that relates the temperatures at 2 p.m. and 3 p.m. (ans. a. 1 p.m. the temperature is 20C. 2 p.m. the temperature is 10C. 3 p.m. the temperature is 15C. b. From 1 p.m. to 2 p.m. the temperature dropped 10 degrees. This can be represented by adding –10 degrees to the 1 p.m. temperature. 1 p.m. temperature + temperature drop of 10 = 2 p.m. temperature 20 + (-10) = 10 c. From 2 p.m. to 3 p.m. the temperature rose 5 degrees. This can be represented by adding 5 degrees to the 2 p.m. temperature. 2 p.m. temperature + temperature rise of 5 = 3 p.m. temperature. 10 + 5 = 15 Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Numerical and Algebraic Operations and Analytical Thinking State Standard/Benchmarks: V.1.HS.2 Grade Level Outcome: PA-12 Assess algebraic operations and their properties. Enabler: 3. Evaluate numerical and algebraic expressions. LEARNING ACTIVITY CONCRETE (conceptualizing) Numerical expressions use only numbers. Example: 3 + 5 Algebraic expressions use number and/or variables. Example: 3x + 5 Tell whether each is a numerical expression or an algebraic expression. a. b + 6 b. 9x c. 80 ÷ 8 (ans. a. algebraic b. algebraic c. numerical Vocabulary: PICTORIAL (symbolic) Just as we use models to stand for integers, we can use models for variable expressions. Use rectangles for variables. Expression Model 2x 3x + 3 Choose a variable and write a variable expression for each model. a. + b. - c. ÷ (ans. a. 2x + 2 b. 3 – x c. 3x ÷ 2, student may use any variable) Vocabulary: variable, expression ABSTRACT (computational) Evaluate for x = 16. 1) x + 7 2) 20 – x 3) 3x 4) x/8 (ans. 1. 23 2. 4 3. 48 4. 2) Vocabulary: PA-12 Enabler 3 (continued) PROBLEM SOLVING Jeans sell for $25 and T-shirts sell for $12. a. Write a numerical expression for the selling price of two pairs of jeans and four T-shirts. b. Write a algebraic expression for the selling price of j pairs of jeans and t T-shirts. (ans. a. (2 x 25) + (4 x 12) b. 25j + 12 t) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Numerical and Algebraic Operations and Analytical Thinking State Standard/Benchmarks: V.1.HS.3 Grade Level Outcome: PA-12 Assess algebraic operations and their properties. Enabler: 4. Describe the properties of operations and give examples of their use. LEARNING ACTIVITY CONCRETE (conceptualizing) State which property is show below. 1. A + B = B + A 2. A(BC) = (AB)C 3. A(B + C) = AB + BC (ans. 1. commutative property of addition 2. associative property of multiplication 3. distributive property) List the correct order of operations. A÷4+2x6 Vocabulary: (ans. PICTORIAL (symbolic) State which property is shown below. 1. A = A 2. (5 + x) + y = 5 + (x + y) 3. 2 = 2 + 2 Division, multiplication, addition) (ans. 1. commutative property of multiplication 2. associative property of addition 3. distributive property) Vocabulary: ABSTRACT (computational) Match each equation with the property illustrated. 1. x + y = y + x 2. (6x)y = 6(xy) 3. (6 + 5) + x = 6 + (5 + x) 4. ab = ba a. b. c. d. commutative property of addition commutative property of multiplication associative property of addition associative property of multiplication. (ans. 1. a 2. d 3. c 4. b ) Vocabulary: PA-12 Enabler 4 (continued) PROBLEM SOLVING ACME PLUMBING 918-467-9823 25 + 4 x 30 25 + 120 From the desk of: Toni & John 25 + 4 x 30 29 x 30 $870.00 $145 John and Toni White called a plumber to repair a leaking pipe in the kitchen of their home. The plumber charges a service charge of $25 plus $30 an hour. The two bills shown above show how the plumber and the Whites computed the cost for four hours of work. Who computed the cost correctly? Justify your answer. (ans. Following correct order of operations: multiply before addition Acme Plumbing Co. is correct.) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Numerical and Algebraic Operations and Analytical Thinking State Standard/Benchmarks: V.1.HS.4 Grade Level Outcome: PA-12 Assess algebraic operations and their properties. Enabler: 5. Apply operations with real-numbers to real-world problems. LEARNING ACTIVITY CONCRETE (conceptualizing) Not Applicable Vocabulary: PICTORIAL (symbolic) Not Applicable Vocabulary: ABSTRACT (computational) Not Applicable Vocabulary: PROBLEM SOLVING Solve: You go to the mall to shop for school clothes. You purchase two pairs of jeans for $25 each, three shirts for $20 each, and two pairs of shoes for $25 each. Write an expression that represents your total cost. How much money did you spend? (ans. 2($25) + 3($20) + 2($25) = $160) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Numerical and Algebraic Operations and Analytical Thinking State Standard/Benchmarks: V.2.HS.1 Grade Level Outcome: PA-13 Formulate and solve linear equations and inequalities. Enabler: 1. Translate words into algebraic expressions. LEARNING ACTIVITY CONCRETE (conceptualizing) Translate into algebraic expressions: 1. eight less than five times a number 2. six divided by a number 3. a number multiplied by four 4. the sum of x and y (ans. 5n – 8 6/x 4y x + y) Vocabulary: PICTORIAL (symbolic) Not Applicable Vocabulary: ABSTRACT (computational) Give three possible English expressions for the algebraic expression: 1. x + 10 2. 2 – y (ans. 1. 10 more than a number a number plus 10 a number increased by 10 2. 2 less a number 2 decreased by a number 2 minus a number) Vocabulary: PROBLEM SOLVING 1. Sylvia earned $45 by washing cars. How much money will she have when she earns d dollars more? (ans. (45 + d) dollars) 2. Karl has saved x dollars. Carlos has saved three times a much. How much has Carlos saved? (ans. 3x dollars) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Numerical and Algebraic Operations and Analytical Thinking State Standard/Benchmarks: V.2.HS.3 Grade Level Outcome: PA-13 Formulate and solve linear equations and inequalities. Enabler: 2. Solve linear equations and inequalities. LEARNING ACTIVITY CONCRETE (conceptualizing) Tom bought a shirt for $25, two pairs of pants costing x dollars each, and a pair of shoes selling for y dollars. Write an equation that represents Tom’s total cost. Use c for the cost. (ans. c = 2x + y + 25) Vocabulary: linear equations, inequalities PICTORIAL (symbolic) Analyze the graph and give the cost of an eleven ounce first class letter. The costs of mailing a first-class letter in 1990 are in the table below. At right the pairs of numbers – the weight and cost are graphed. (ans. $2.25) Vocabulary: ABSTRACT (computational) Solve each equation: a. x + 4 = -10 b. 2x + 40 = 120 c. 8x – 10 = 6x + 30 d. 2(3x + 4) = 4x + 4 (ans. a. x = -14; b. x = 40; c. x = 20; d. x = -2) Vocabulary: PA-13 Enabler 2 (continued) PROBLEM SOLVING The cost for mailing a first class letter in 1990 was found by using the formula c = 20W + 5, where c is the cost in cents and w is weight in ounces. The post office round weights up! If a letter weighed 8.7 ounces, what would the cost be? (ans. (20 x 9) + 5 = $1.85) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Numerical and Algebraic Operations and Analytical Thinking State Standard/Benchmarks: V.2.HS.5 Grade Level Outcome: PA-13 Formulate and solve linear equations and inequalities. Enabler: 3. Solve real-world problems. LEARNING ACTIVITY CONCRETE (conceptualizing) Today there are 400 packages of duplicating paper at a school. Each week about 12 packages are used. Using L for packages left and w for weeks, write an equation representing the use of paper. (ans. L = 400 – 12w) Vocabulary: PICTORIAL (symbolic) Under a lease plan, a new car costs $1,000 down plus $200 per month. Write an equation for the amount paid after n months. Use P for the amount paid. (ans. P = 1000 + 200 n) Vocabulary: ABSTRACT (computational) In PIN, the measure of angle N is 4x + 36 The measure of angle P is 10x. If the measure of angle N equals the measure of angle P, find the measures of all three angles. (Hint: write an equation to find the solution.) (ans. 4x + 36 = 10x N = 60 P = 60 I = 60) Vocabulary: PROBLEM SOLVING Peggy is spending money while Vanna is saving it. At present, Peggy has $65 but spends $2 more than her allowance each week. Vanna has $40 but saves $3 a week. Solving what equation will give the exact time when the two will have them same amount? Use w to represent weeks. (ans. 65 – 2w = 40 + 3w) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Probability and Discrete Mathematics State Standard/Benchmarks: VI.1.HS.1, VI.2.HS.2, VI.1.HS.4 Grade Level Outcome: PA-14 Investigate probability. Enabler: 1. Describe chance situations using language of probability. LEARNING ACTIVITY CONCRETE (conceptualizing) You roll a die once. a. How many possible outcomes are there? b. What are your chances of rolling a 5? c. What is the probability of rolling a 5? (ans. a. 6 (1, 2, 3, 4, 5, 6) b. 1/6 c. 1/6) Vocabulary: PICTORIAL (symbolic) An ice cream stand offers two flavors of ice cream, two topping options, and two container options. How many possible combinations of flavors, containers, and toppings are there? Assume all possibilities will have toppings. Make a tree diagram to show all of the possible combinations (outcomes) in the sample space. Flavor Container cup Topping rainbow chocolate Outcome chocolate cup with rainbow sprinkles chocolate cup with chocolate sprinkles rainbow chocolate chocolate cone with rainbow sprinkles chocolate cone with chocolate sprinkles rainbow chocolate vanilla cup with rainbow sprinkles vanilla cup with chocolate sprinkles rainbow chocolate vanilla cone with rainbow sprinkles vanilla cone with chocolate sprinkles chocolate cone cup vanilla cone FLAVORS TOPPINGS (sprinkles) Vocabulary: CONTAINERS PA-14 Enabler 1 (continued) ABSTRACT (computational) Estimate the probabilities for these problems. One thousand golf balls, some white, some green, and some yellow, are put into a barrel. As they are drawn out, their colors are tallied. Using the tally shown, find the probability that the next ball will be this color? 1. green 2. white 3. yellow 4. white or yellow 5. yellow or green 6. green or white Green White Yellow Tally ||||| ||||| ||||| ||||| ||||| ||||| ||||| ||||| ||||| 7. Of the 1000 golf balls described above, about how many are white? 8. Of the 1000 golf balls described above, about how many are yellow? (ans. 1. .32 2. .46 3. .22 4. .68 5. .54 6 .78 7. 460 8. 220) Vocabulary: PROBLEM SOLVING A factory turns out 5000 digital calculators a day. To control quality, a daily random sample of 200 is taken and tested. Of these 6 are found defective. a. Find the probability that a randomly chosen calculator will be defective. b. How many calculators in a day’s output are likely to be defective? (ans. a. 6/200 = .03 b. 150) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Probability and Discrete Mathematics State Standard/Benchmarks: VI.1.HS.3 Grade Level Outcome: PA-14 Investigate probability. Enabler: 2. Illustrate the difference between dependent and independent events. LEARNING ACTIVITY CONCRETE (conceptualizing) Are events A and B dependent or independent? 1. A coin is tossed twice. a. Heads come up on the first toss. b. Heads come up on the second toss. 2. A bag contains 1 red marble and 2 blue marbles. A marble is drawn and not replaced. a. The first marble is red. b. The second marble is blue. (ans. a. independent; b. dependent) Vocabulary: probabilty PICTORIAL (symbolic) A coin is tossed and a die is rolled. List the 12 possible outcomes. (ans. H-1, H-2, H-3, H-4, H-5, H-6 T-1, T-2, T-3, T-4, T-5, T-6) Vocabulary: ABSTRACT (computational) A bag contains two red and three blue marbles. A marble is drawn and is not replaced. A second marble is drawn. Find the probability of these events. a. The first marble is red, and the second one is blue. b. Both marbles are red. c. Both marbles are blue. (ans. a. 3/10 b. 1/10 c. 3/10) Vocabulary: PA-14 Enabler 2 (continued) PROBLEM SOLVING Suppose you are playing a Scrabble game, and these 8 tiles are left. If you choose two tiles at random, what is the probability you will choose a Q, then another Q? S V U Q T O F Q (ans. Since choosing one Q changes the number of times and the number of Qs that are left to choose from, the two choices are dependent events. P(Q, then Q) = P(Q) x P(Q, given Q) number of Qs number of tiles 2 8 1 x 7 = 1/28 number of Qs left after the first pick number of tiles left after the first pick So, the probability that you choose a Q, then another Q is 1/28, 030357…., or about 3.6%.) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Probability and Discrete Mathematics State Standard/Benchmarks: VI.1.HS.5 Grade Level Outcome: PA-14 Investigate probability. Enabler: 3. Use concepts of probability to solve real-world problems. LEARNING ACTIVITY CONCRETE (conceptualizing) Toss a dime, a nickel, and a penny once. Record the eight possible outcomes. (ans. HHH, HTH, HHT, THH, TTT, THT, TTH, HTT) Vocabulary: PICTORIAL (symbolic) Perform an experiment to determine the probability that a thumb-tack will land up when dropped. (ans. One student found eight thumbtacks. He decided to drop all of them ten times, for a total of 80 dropped tacks. Here are the results. Experiment UP On Edge 1 5 3 2 3 5 3 3 5 4 4 4 5 5 3 6 7 1 7 1 7 8 5 3 9 5 3 10 4 4 Adding the numbers that landed up, a total of 42 tacks landed up. The tacks in the other 38 tosses landed on edge. The relative frequency of a tack landing up was 42/80. We might pick that number as the probability. However, 42/80 = .525, which is closer to .5. We might take the probability to be 1/2.) Vocabulary: relative frequency ABSTRACT (computational) In a survey of a neighborhood, 60% of those surveyed expressed a need for greater police protection. a. If 100 were surveyed, how many said they needed more police protection? b. If 500 people were surveyed, how many said they needed more police protection? c. If 5 people were surveyed, how many said they need more police protection? (ans. a. 60 people; b. 300 people; c. 3 people) Vocabulary: PA-14 Enabler 3 (continued) PROBLEM SOLVING Consider the following: A tire company tests 50 tires to see how long they last under typical road conditions. The results are shown below: Mileage until worn out 10,000-14,999 15,000-19,999 20,000-24,999 25,000-29,999 30,000-34,999 35,000-39,999 40,000 or more Number of tires 1 3 6 15 14 7 4 a. What is the relative frequency of a tire lasting less than 25,000 miles? b. What is the relative frequency of a tire lasting more than 10,000 miles? (ans. a. 10/50 = 1/5; b. 1) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Probability and Discrete Mathematics State Standard/Benchmarks: VI.2.MS.3 Grade Level Outcome: PA-15 Examine discrete mathematics. Enabler: 1. Solve network problems. LEARNING ACTIVITY CONCRETE (conceptualizing) After school, Vilma plans to go to the music store and then to the pool. She can take any of 3 routes from school to the music store and then take either of two routes from the store to the pool. In how many ways can Vilma go from school to the pool? (ans. 6) Vocabulary: PICTORIAL (symbolic) How many different ways can you travel from one city to another? a. Ames to Plainview b. Carthage to Dutton c. Cathage toWeston d. Ames to Dutton (ans. a. 6 ways; b. 6 ways; c. 16 ways; d. 12 ways) Vocabulary: ABSTRACT (computational) Not Applicable Vocabulary: PROBLEM SOLVING Contact a travel agency to find all the possible pathways from MBS International Airport to Orlando, Florida. Draw a network that show the pathways. Which one would you prefer and why? (ans. will vary) Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Probability and Discrete Mathematics State Standard/Benchmarks: VI.2.HS.5 Grade Level Outcome: PA-15 Examine discrete mathematics. Enabler: 2. Describe and analyze efficient algorithms to accomplish a task or solve a problem in a variety of contexts. LEARNING ACTIVITY CONCRETE (conceptualizing) Not Applicable Vocabulary: PICTORIAL (symbolic) Not Applicable Vocabulary: ABSTRACT (computational) Not Applicable Vocabulary: PROBLEM SOLVING Consider the vowels A, E, I, O, and U. Make two-letter monograms with these vowels like AO, UE, II, How many two-letter monograms are there? (Hint: Make an organized list. AA AE AI AO AU EA EE EI EO EU Vocabulary: efficient algotithms IA IE II IO IU OA OE OI OO OU UA UE UI UO UU MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Probability and Discrete Mathematics State Standard/Benchmarks: VI.2.HS.6 Grade Level Outcome: PA-15 Examine discrete mathematics. Enabler: 3. Solve real-world problems. LEARNING ACTIVITY CONCRETE (conceptualizing) Not Applicable Vocabulary: PICTORIAL (symbolic) Not Applicable Vocabulary: ABSTRACT (computational) Not Applicable Vocabulary: PROBLEM SOLVING In Wilson Hall, a person may enter through entrances A, B, C, or D. When leaving, they may use either exit C or D. How many different ways could a person enter and exit Wilson Hall? C A (ans. 8) D Vocabulary: B MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Technology State Standard/Benchmarks: Grade Level Outcome: PA-16 Use, transfer, and apply appropriate technology. Enabler: 1. Use scientific calculators to perform basic functions and solve real-world problems. LEARNING ACTIVITY CONCRETE (conceptualizing) Write the problem that matches the key sequence. (ans.) 25 5987 + 6545 3.73 + 46.298 437 + -1764 (3.2 x 103) (4.5 x 105) 57 5 Vocabulary: PICTORIAL (symbolic) Do the following key sequence on your calculator. (ans. 6 x 17.95 + 5 x 17.95 = 197.45) Vocabulary: ABSTRACT (computational) Write the key sequence for the following problems. -676 ÷ 13 8.8128 ÷ 2.04 Vocabulary: PA-16 Enabler 1 (continued) PROBLEM SOLVING Use this information and your calculator. Jeffrey is saving money each week to buy presents for his family. He wants to save $150. How much must he save each week if he saves for the given amount of time? (ans.) a. 3 weeks a. $50 b. 5 weeks b. $30 c. 8 weeks c. $18.75 d. 12 weeks d. $12.50 e. 20 weeks e. $7.50 Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Technology State Standard/Benchmarks: Grade Level Outcome: PA-16 Use, transfer, and apply appropriate technology Enabler: 2. Use computer spreadsheets to solve real-world problems. LEARNING ACTIVITY CONCRETE (conceptualizing) Here is a sample spreadsheet for a school store. A 1 2 3 4 5 6 7 8 9 10 11 12 Item Gym Shorts Shirts Sweatshirts Tablets Pencils Folders B C January Sales D Unit Price Number Sold Total Sales $ $ $ $ $ $ 6.00 8.00 12.00 0.60 0.10 0.50 15 24 32 38 123 21 Monthly Sales 1. What is a spreadsheet? 2. What is displayed in the given cell locations of the spreadsheet? a) C5 b) A10 c) B8? 3. Give the heading for row 7. (ans. 1. Table made up of columns and rows. 2. a)15 b) folders c) .60 3. Sweatshirts) Vocabulary: PA-16 Enabler 2 (continued) PICTORIAL (symbolic) 1 2 3 4 5 6 7 Name John Paul George James Student Test 1 Grades Test 2 86 55 97 23 Av erage 78 80 94 18 =(b11+c11)/2) 1. Write the formula that calculates John’s test average, and name the cell in which the formula is entered. 2. What formula should be entered in cell B7 to calculate the group’s average on Test 1? 3. a. In which cell will the formula used to calculate the group’s average on Test 2 be entered? b. What formula should be entered here? (ans. 1. =(b3+c3)/2 in cell d3 2. =(b3+b4+b5+b6)/4 3. a. c7 b. =(c3+c4+c5+c6)/4) Vocabulary: ABSTRACT (computational) A B 1 X 2 2 4 3 3 9 4 5 25 C D E 8 27 125 16 81 625 32 243 3125 (ans. a. x2 b. x3 c. x4 d. x5) Give a heading for each column. B C D E Vocabulary: PROBLEM SOLVING Create a spreadsheet that lists times and costs for a phone call to Nigeria if the cost is $1.19 for the first minute and 79¢ for each additional minute. a. What is the formula that should be placed in Bs and copied into the rest of the B column? b. What will it cost for a 27 minute phone call? (ans. a. (A2 – 1).79 + 1.19 Vocabulary: 1 2 3 4 b. $21.73) A Minutes 1 2 3 B Cost 1.19 1.98 2.77 MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Employability/Career Skills State Standard/Benchmarks: Grade Level Outcome: PA-17 Explore careers. Enabler: 1. Explore professions. LEARNING ACTIVITY CONCRETE (conceptualizing) The teacher brings in the following career professionals and the students will describe/write three ways that two of the following professions use mathematics. 1. Accountant 2. Banker 3. Sales 4. Artist 5. Architect 6. Mathematician Vocabulary: PICTORIAL (symbolic) Not Applicable Vocabulary: ABSTRACT (computational) Students will research and write a one page paper on one of the following occupations: 1. Accountant 2. Banker 3. Sales 4. Artist 5. Architect 6. Mathematician Vocabulary: PROBLEM SOLVING Students will set up and interview a business person. Include applications of mathematics in this occupation. Vocabulary: MATHEMATICS ACTIVITIES Pre-Algebra Framework/Strands: Employability/Career Skills State Standard/Benchmarks: Grade Level Outcome: PA-18 Demonstrate employability skills. Enabler: 1. Work cooperatively with all team members. LEARNING ACTIVITY CONCRETE (conceptualizing) Working in teams, students will keep track for five days of time spent in the following activities: 1. Sleeping 2. Eating 3. School 4. Leisure time 5. Homework/study time 6. Extra curricular (i.e., sports, practice times) Vocabulary: PICTORIAL (symbolic) Organize above information in a chart and graph all team members results. (ans. will vary) Vocabulary: ABSTRACT (computational) Not Applicable Vocabulary: PROBLEM SOLVING Students will open a bank account and maintain it for one semester. Vocabulary:
