Dear Parents and Students: All students entering Algebra I or Algebra I Honors in September are required to complete this assignment. This assignment is comprised of two components: a review of essential math skills and a project. There are ten topics included in the skills component which will prepare students with stronger math skills for the upcoming school year. If you need assistance with any of the topics included in this assignment, we strongly recommend that you to use the following resource: http://www.khanacademy.org/. If you would like additional practice with any topic in this assignment visit: http://www.math-drills.com. Below are the POLICIES of the summer assignment: The summer assignment is due the first day of class. On the first day of class, teachers will collect the summer assignment. Any student who does not have the assignment will be given one by the teacher. Late projects will lose 0 points each day. Summer assignments will be graded as a quiz. This quiz grade will consist of 0% completion and 80% accuracy. Completion is defined as having all work shown in the space provided to receive full credit, and a parent/guardian signature. Any student who registers as a new attendee of Teaneck High School after August 5 th will have an extra week to complete the summer assignment. Summer assignments are available on the district website and available in the THS guidance office. HAVE A GREAT SUMMER!
Coordinate Plane. Use the coordinate plane on the right to answer each question. a. Name the point in Quadrant III. b. Name the point on the x axis. c. Name the y coordinate of Point D. d. Name point A as an ordered pair. Linear Equations. A linear equation is the equation of a. Linear equations have: No operations other than addition, subtraction, and multiplication of a variable by a number. Variables may not be multiplied together or appear in the denominator. No variables with exponents other than. Lines as their graphs! Examples Non Examples y = x + 7 x + 4y = 8 5x 3 y = 7 y = x + 5 x = 9 x + x y = y = x y = x Determine whether each equation is a linear equation. Write yes or no. 3. xy 5 y = 6 4. 3 x + y = 5. y = x + 4 6. x y = 5 3 + 5
Slope The slope is the constant rate of change of a line. rise run It is the. You can use the formula m = y y. 7. Find the slope of the line that passes through (, ) and ( 4,). x x 8. Evaluate for the following values: a = 3, b= 3, c = 4, d=7 9. Draw a line with a slope of 0. Draw a line with a slope of. Graph the line through (0,) with a slope of. 3
Graphing Linear Equations To graph a linear equation you can use a table of values or the slope and y-intercept. To draw the line using the slope and y-intercept, first plot the y-intercept on the y-axis then use the slope to draw the line. Remember: Slope Intercept form is: y-intercept. y = m x + b, where m represents the slope and b represents the Graph the following linear equations.. y = x 3 3. y = 3 x + 4. y = x + 3 5. y = x 6. y = 7. x = 3 4
Writing Linear Equations To write the equation of a line given the graph: Step : Determine the slope Step : Determine the y intercept Step 3: Write Step 4: Replace with the slope and with the y- intercept Example: Step : The slope is. Step : The y-intercept is 4. Step 3: y = m x + b Step 4: y = x + 4 Write an equation for each line. 8. 9. 0.. 5
. 3. 4. Is the point ( 3, ) on the line y = 3 x +? Show work. To write equations given the slope and a point Step : Write Step : Replace with the slope Step 3: Replace and, then solve for Step 4: Write the equation Example: Slope (m) = point: (,6) Step : Step : Step 3: Step 4: Write an equation of the line that passes through each point with the given slope. 5. (4, ), m = 6. (3, 7), m = 3 7. ( 3, 5), m = 8. ( 3, 0), m = 3 5 6
To write equations given points on the line Step : Calculate the slope Step : Write Step 3: Replace with the slope Step 4: Replace and, then solve for Step 5: Write the equation Note: You can use either point. Example: Points: (,8) and (,6) Step : Slope = Step : Step 3: Step 4: Step 5: Write an equation of the line that passes through each pair of points. 9. (5, ) and (8, ) 30. (6, 0) and (0, 4) 3. (5, ) and ( 7, 4) 3. ( 3, ) and (6,5) 33. The cost for 7 dance lessons is $8. The cost for lessons is $. Write a linear equation to find the total cost C for L lessons. Then use the equation to find the cost of 4 lessons. 7
Systems of Equations A solution of a system of equations is an ordered pair of numbers that satisfies both equations. Circle the correct answer for each question. 34. The solution to a system of linear equations is given by which feature of the equations graph A. their slopes B. their y intercepts C. the coordinates of their intersection D. their point slope form 35. A set of two equations with the same graph has how many solutions? A. no solution B. one solution C. two solutions D. infinitely many solutions 36. Is (, ) a solution to the system { x + 3 y = 7 x 4 y = 6? Show work. 37. Is (, 4) a solution to the system { y = x 4x y = 4? Show work. 38. Solve the system by graphing: y = 3x + y = x + 8
Functions: A function is a relation in which each input has exactly one output. Determine whether each relation is a function. Write YES or NO on the line provided. Determine whether each relation is a function and then graph each equation. 44. x = 4 Function? Circle YES or NO 45. y = x + Function? Circle YES or NO 9
Integer Operations Multiplying and Dividing Integers: Same Signs (+ and +, and ) = Positive Result Different Signs (+ and, and +) = Negative Result Adding Integers: Positive + Positive = Positive Negative + Negative = Negative Positive + Negative = Keep sign of larger * number Negative + Positive = Keep sign of larger * number * larger means the number with the greater absolute value. Subtracting Integers: Subtract an integer by adding its opposite. Ex: 5 ( 7) = 5 + 7 = May be known as Keep, Change, Change. 46. Which of the following is NOT equal to? a) b) c) Simplify/Evaluate. 47. 48. 3 49. 4 5 50. 5 Evaluate. 3 5. 4 3 3 5. 0 53. 54. 55. 4 ( 5 ) 56. 4 ( 5) 57. 0 58. ( ) 59. 60. 8 0 6. 7 0 6. ( ) 63. ( 8) 64. 5 ( 6 ) 0
Order of Operations Commonly referred to as PEMDAS, the order of operations are a set of rules for the order in which we perform operations when evaluating mathematical expressions. These rules are important and must be followed in order to ensure the correct answer. P Parentheses: this includes any type of grouping symbols. Always evaluate what is inside the grouping symbols first, still following the other steps in the order of operations (EMDAS). E Exponents: evaluate any numbers with exponents. M/D Multiply or divide: in the order the operations occur from left to right. A/S Add or subtract: in the order the operations occur from left to right. 65. [4(3 + 8)] 66. 6 ( 6+8) 67. 7 ( 4 8) 68. 8 + + 4 69. [7 + 6(3 5)]
Adding and Subtracting Fractions a. To add or subtract fractions with common denominators, add or subtract the numerators and write the answer over the common denominator. If possible, simplify the answer. Example : 7 8 + 5 8 = 7+5 8 = 8 = 3 = b. To add or subtract fractions with uncommon denominators you need to first rewrite the fractions with common denominators. Then you can add or subtract as explained above. Example : 7 0 = 7 5 0 4 0 = 3 0 70. 5 4 + 9 9 75. 9 6 3 6 7. + 5 76. 3 7. 3 + 4 9 77. 4 73. + 3 3 4 + 6 78. 3 5 8 74. + 6 8 79. 7 3 4 0
Multiplying Fractions To Multiply Fractions, multiply the numerators first and then multiply the denominators. Simplify if possible. 7 Example : Multiply times = 4 7 4 5 9 5 9 = 7 5 35 4 9 = 36 80. 7 3 85. 7 7 5 3 8. 8 4 4 3 86. 9 4 7 4 8. 8 9 3 87. 3 8 8 9 83. 9 0 6 8 84. 7 5 Dividing Fractions To divide by a fraction, multiply by its reciprocal. Simplify if possible. * Remember a reciprocal is the inverse of the fraction. This means the numerator and denominator values change places. 3 9 Example: = 4 3 9 4 0 = 3 4 0 0 9 = 3 0 4 9 = 30 5 36 = 6 3 88. 4 4 89. 5 3 4 90. 5 3 5 5 9. 8 4 9. 5 5 5 93. 5 8 4 4 94. 7 5 3 95. 3 8 3
Performance Task Introduction: You and your family are moving, because your current home is old and too small. The good news is that you are moving two blocks away from your current home, and your new home has an upstairs which consists of two bedrooms (one for you and one for your sibling), a spare room (that can be anything you want), and two closets. Your family has decided that you will be in charge of decorating the entire second floor. The Task: Your task is to decorate and furnish the second floor all by yourself! You get to select the paint, wallpaper, carpet, tile, and furniture, and get to pick the colors, the designs/styles, and products that you and your sibling like best. You have a limited budget of $,500.00 and your family wants to know how much each item will cost so you will need to keep track of everything you buy. You have been given a huge responsibility, but you can handle it. Remember to measure the dimensions of each room to figure out how much paint, carpet, etc. you will need and avoid purchasing unnecessary materials. To complete this task, follow the steps listed below:. Develop a proposal for the second floor of your house. Begin by writing a paragraph explaining your design plan to your family.. Create a floor plan drawing and list the dimensions of each room to show your family. 3. Calculate the perimeter and the area for each room (include this information on the floor plan). Remember, when doing calculations you will need to take into consideration any doors or windows. Make sure you keep these dimensions on hand, because you will need them when figuring the amount of supplies you will need. 4. Choose products that you like best, but remember you are on a limited budget. You will need to do the following to each room: Carpet or tile the floor Paint or wallpaper the walls and ceiling Choose furniture and accessories for decorating the rooms. Then make a table listing the products you will purchase to decorate the second floor. Be sure to include the room name, room dimensions (including area and perimeter), the product description (paint, tile, carpet, accessories, etc.), as well as pricing and the store from which you will purchase the material. 5. Neatly assemble your proposal, floor plan, calculations, and the table listed above. 4
You will be able to obtain information for this project from the following resources: Carpet and Tile: smartinternetguide.com carpetcorner.com Paint: benjaminmoore.com sherwinwilliams.com Furniture: yahooshopping.com pier.com Have fun! 5