Survey
* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project
* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project
Name: ________________________ Class: ___________________ Date: __________ ID: A Final - Review Set I - Pre-Algebra - 7th Grade 12. −48 = −3y Find the sum. 1. 23 + (−37) + 4 13. 2. What is the value of 5 − x − (−y) when x = 7 and y = −2? 14. 19z + 5 = −14 15. 7(12 − r) = −84 Find the product or quotient. 3. −5(14) 4. 5 t = 14 31 16. 7y + 11 − 12y = −19 8 ÊÁÁÁ 3 ˆ˜˜˜ ÷ − 11 ÁÁË 4 ˜˜¯ Perform the indicated operation. 17. 15.12 ÷ (−2.8) The following temperatures were taken during a week in December in Nome, Alaska. What is the mean temperature to the nearest degree? Write and solve an equation. 18. A bookstore offers three books in a set for $21.75. Each book costs the same amount. How much does each book cost? 5. −5°F, − 8°F, − 13°F, − 16°F, − 8°F, 11°F, 0°F Evaluate the expression using mental math. Name the property or properties used. All three sides of the triangle have equal length. What is the perimeter? 6. (−15 • 5) • (−20) Write an equivalent variable expression. 7. (2 − 12c)(−1) 19. Simplify the expression. Solve the inequality. 8. 5(n − 1) − 3n + 6 20. 5 > 18m4 14m9 9. − • 7 24 a −2 21. You are selling magazine subscriptions for a school fundraiser. If you sell at least 75 subscriptions in 2 weeks you win a prize. You sold 26 subscriptions in one week. What is the mean number of subscriptions you have to sell per day to sell at least 75 total? Solve the equation using mental math. 10. 64 = −8a Solve the equation. Check your solution. 11. −2 = w − 19 1 Name: ________________________ ID: A Write the fraction in simplest form. Plot the points listed below in the same coordinate plane. Describe any pattern you see in the graph. 33. 22. (−3,−4), (−2,−2), (−1, 0), (0, 2), (1, 4), (2, 6) 34. One serving of rice pilaf has 220 calories, including 35 calories from fat. One serving of soup has 70 calories, including 15 calories from fat. Write the calories from fat as a fraction of the total calories for each food. Which food has a greater fraction of calories from fat? For the given expression, identify the terms, like terms, coefficients, and constant terms. Then simplify the expression. 23. x + 5 − 9 − 7x Solve the inequality. Then graph the solution. Find the least common multiple of the monomials. 24. n − 4 ≤ 0 35. 35x2, 21x 25. w − 4(w + 5) < −8 26. Find the product or quotient. Write your answer using exponents. 9c − 8 ≤ 3c + 16 36. 5n 7 • 6n Evaluate the expression when y = 24 and z = 8. 27. 32a 2 36a 3 Find the product or quotient. Write your answer using exponents. y z Evaluate the power. 37. 2x 4 • 6x 7 21x 3 28. 1.54 38. Write the decimal 0.375 as a fraction in simplest form. Evaluate the expression. È ˘ 29. 40 ÷ ÍÍÍÎ (14 + 6) • 2 ˙˙˙˚ Order the numbers from least to greatest. 39. 2 Evaluate the expression when r = 5 and s = 8. 3 11 5 , , 2.32, , 2.25, 2 10 5 2 30. (r + 2)2 − s 40. A quarter's width is about Order the integers from least to greatest. is about 31. −56,−102, 98,−58, 114 32. 11 inch. How much wider is a quarter? 16 Find the sum or difference. Find the greatest common factor of the monomials. 12a2, 15 inch. A dime's width 16 41. 18ab 2 5v 4v + 3 5 Name: ________________________ ID: A 51. The scale drawing of a rectangular park has a scale factor of 1 cm to 74 m. The drawing is 11 cm by 18 cm. What are the actual dimensions of the park? 1 miles of a 5 mile trail. How 10 much farther must you hike? 42. You have hiked 2 Solve the equation. A box contains 9 tiles that together spell the word "TENNESSEE." You draw at random one tile from the box. Find the probability of the event. 1 5 11 43. x− = 4 6 12 Solve the equation or inequality by first clearing the fractions or decimals. 52. Drawing an E 2 5 17 − k≥ 3 2 30 53. You are asked to enter a 4-character password for a video game. The password must begin with a letter and end with 3 digits. How many different passwords are possible if you can repeat digits? 44. 45. −11 = 8.22w − 63.608 Use the fact that ∆TOP ≅ ∆LID to complete the statement. Write the rate as a unit rate. 46. 54. ∠T ≅ ___ ? 448 cycles 5 days Find all the factors of the number. Solve the proportion. 47. 55. 84 48 x = 36 6 Write the prime factorization of the number. 56. 84 t−3 5 48. = 12 8 Find the new amount. Use the fact that ∆NYC ∼ ∆LAX . 57. Decrease 650 by 21%. Use the given information to find the new amount. 58. Food bill: $38 Sales tax: 5% 49. Find NC and LA. Tell whether the ordered pair is a solution of the equation 12x + 3y = 21. 50. A 20 foot flagpole stands beside a building. The flagpole casts a shadow that is 25 feet long. At the same time, the building casts a shadow that is 60 feet long. How tall is the building? 59. (2,−15) 3 Name: ________________________ ID: A Write the coordinates of two points on the line. Then find the slope of the line. Write the fraction as a percent. 68. 7 18 Write the decimal as a percent. 69. 2.07 60. Use the percent equation to answer the question. Graph the relation. Then tell whether the relation is a function. 70. What number is 0.7% of 60? 61. x y –4 –1 –2 0 0 1 2 2 Find values of m and b for which the system below has the given number of solutions. 4 3 y = 4x + 10 Graph the linear equation. y = mx + b 62. y = 8 71. None Name the x- and y-intercepts. Then sketch a quick graph of the line. 72. Infinitely many 63. 2x + y = 4 Tell whether each ordered pair is a solution of the system of linear inequalities. Find the slope and the y-intercept of the graph of the equation. Then graph the equation. ÊÁ 0, 2 ˆ˜ ; Ë ¯ 73. 1 64. y =− x 4 y < 3x + 6 Graph and check to solve the linear system. 65. y ≤ x+2 Graph the inequality on the given coordinate grid. 5x − 2y = 4 74. 4x + 2y > 3 −x + 4y = −8 Write the percent as a decimal and as a fraction. 66. 8% Use a proportion to answer the question. 67. 44 is what percent of 80? 4 Name: ________________________ 75. 5x − y ≤ ID: A 1 2 5 ID: A Final - Review Set I - Pre-Algebra - 7th Grade Answer Section 1. −10 2. −4 3. −70 7 4. −7 11 5. −6°F 6. 1500; commutative and associative properties of multipication 7. −2 + 12c 8. 2n + 1 3m13 2 −8 17 16 434 −1 24 6 −5.4 $7.25 96 units a > −10 at least 7 subscriptions per day Sample answer: The points rise from left to right and lie on a line. 9. − 10. 11. 12. 13. 14. 15. 16. 17. 18. 19. 20. 21. 22. 23. terms: x, 5,−9,−7x; like terms, x and−7x, 5 and−9; coefficients, 1 and−7; constant terms, 5 and−9;−6x−4 24. n ≤ 4; 25. w > −4; 1 ID: A 26. c ≤ 4; 27. 28. 29. 30. 31. 32. 33. 34. 35. 36. 37. 38. 39. 40. 41. 42. 43. 44. 45. 46. 3 5.0625 1 41 −102,−58,−56, 98, 114 6a 8 9a 35 245 15 330 = ; = ; the soup 220 1540 70 1540 105x2y3 30n8 4x 8 7 3 8 11 3 5 2, , 2.25, 2 , 2.32, 5 10 2 1 inch 4 37v 15 9 2 miles 10 7 1 k≤ 25 6.4 89.6 cycles 1 day 47. 8 1 2 NC = 4; LA = 15 48 feet 814 m by 1332 m 4 9 26,000 ∠L 1, 2, 3, 4, 6, 7, 12, 14, 21, 28, 42, 84 22 • 3 • 7 48. 10 49. 50. 51. 52. 53. 54. 55. 56. 2 ID: A 57. 58. 59. 60. 61. 513.5 $39.90 no Sample answer: (0, 0), (1,−1);−1 yes: Every input is paired with exactly one output. 62. Answer: 63. x-intercept, 2; y-intercept, 4; 1 64. slope,− ; y-intercept, 0; 4 65. (0,−2) 3 ID: A 66. 0.08; 2 25 67. 55% 68. 69. 70. 71. 72. 73. 74. 38. 8% 207% 0.42 m = 4, b = any number other than 10 m = 4, b = 10 solution Answer: 75. Answer: 4