Chapter 1: Expressions, Equations, and Functions Lesson 1.1 Variables and Expressions Write a verbal expression for each algebraic expression. 23f 5m 2 + 2c 3 4n 1 7 Write an algebraic expression for each verbal expression. the difference of 10 and u 15 decreased by twice a number two fifths the cube of a number Lesson 1.2 Order of Operations Evaluate each expression. 6 2 + 3 7-9 2[5 2 + (36 6)] (2 5)10 + 4 3 2 5 Evaluate each expression if a = 12, b = 9, and c = 4. b 2 + 2a - c 2 2(a b) 2 5c The length of a rectangle is 3n + 2 and its width is n - 1. The perimeter of the rectangle is twice the sum of its length and its width. Write an expression that represents the Find the perimeter of the rectangle when perimeter of the rectangle. n = 4 inches.
Lesson 1.3 Properties of Numbers Evaluate each expression. Name the property used in each step. 2 + 6(9-3 2 ) - 2 5(14 39 3) + 4 ¼ Lesson 1.4 The Distributive Property Use the Distributive Property to rewrite each expression. Then evaluate. 9(7 + 8) 7 110 9 499 (9 p)3 16(3b 0.25) (c 4)d Simplify each expression. If not possible, write simpified. w + 14w 6w 4(6p + 2q 2q) 3a 2 + 6a + 2b 2 The Ross family recently dined at an Italian restaurant. Each of the four family members ordered a pasta dish that cost $11.50, a drink that cost $1.50, and dessert that cost $2.75. Write an expression that could be used to calculate the cost of the Ross dinner before adding tax and a tip. What was the cost of dining out for the Ross family?
Lesson 1.6 Relations Use the relation to answer the following problems: {(4,3), (-2,4), (3, -2), (-2, 1)} Create a table: Create a mapping: Create a graph: domain: range: Describe what is happening in each graph. The graph below represents the height of The graph below represents the questions a tsunami as it travels across an ocean. answered by a student taking an exam. Lesson 1.7 Functions Determine whether each relation is a function. x y 1 5 4 3 7 6 1 2 {(1, 4), (2, 2), (3, 6), ( 6, 3), ( 3, 6)} x = -2 y = 2 If f(x) = 2x 6 and g(x) = x 2x 2, find each value. f(2) g(-1) f(7) 9 g(3y) f(h + 9) g(1/3)
Lesson 1.8 Interpreting Graphs of Functions Identify the function graphed as linear or nonlinear. Then estimate and interpret the intercepts of the graph, any symmetry, where the function is positive, negative, increasing, decreasing, the x-coordinate of any relative extrema, and the end behavior of the graph.
Chapter 2: Linear Equations Lesson 2.1 Writing Equations Translate each sentence into an equation. Fifty-three plus four times b The sum of five times h and is as much as 21. twice g is equal to 23. One fourth the sum of r and ten is identical to r minus 4. Translate each sentence into a formula. Degrees Kelvin K equals 273 The total cost C of gas is plus degrees Celsius C. the price p per gallon times the number of gallons g. The sum S of the measures of the angles of a polygon is equal to 180 times the difference of the number of sides n and 2. Translate each equation into a sentence. r (4 + p) = 3r 2(m n) = x 2 ½t + 2 = t Lesson 2.2 Solving One-Step Equations Solve each equation. Check your solution. d 8 = 17-16 = m + 71 f + (-3) = -9 180 = -15m y 9 = 8 g 27 = 2 9 Write an equation for each sentence. Then solve the equation. Negative nine times a 2.7 times a number equals Five sixths of a number is number equals 117. 8.37. 5 9. The day after a hurricane, the barometric pressure in a coastal town has risen to 29.7 inches of mercury, which is 2.9 inches of mercury higher than the pressure when the eye of the hurricane passed over. Write an addition equation to represent the situation. What was the barometric pressure when the eye passed over?
Lesson 2.3 Solving Multi-Step Equations Solve each equation. Check your solution. -12n 19 = 77 2.5g + 0.45 = 0.95 x 5 + 6 = 2 r+13 12 = 1 d 4 + 3 = 15 8-3 8 k = -4 Write an equation and solve each problem. Seven less than four times a Find two consecutive even number equals 13. What is integers whose sum is 126. the number? Find three consecutive odd integers whose sum is 117. Lesson 2.4 Solving Equations with the Variable on Each Side Solve each equation. Check your solution. 5x 3 = 13 3x 6 + 2(3j 2) = 4(1 + j) 3(d 8) 5 = 9(d + 2) + 1 1.4f + 1.1 = 8.3 - f 5 2 t 4 = 3 + 3 2 t 1 3 (n + 1) = 1 (3n - 5) 6
Lesson 2.5 Solving Equations with Absolute Value Evaluate each expression if x = -1, y = 3, and z = -4 16-2z + 1 x y + 4-3y + z - x Solve each equation. Then graph the solution set. 2z 9 = 1 3 2r = 7 Write an equation involving absolute value for each graph. Lesson 2.6 Ratios and Proportions Determine whether each pair of ratios are equivalent. Write yes or no. 12, 108 11 99 7.6, 3.9 1.8 0.9 3, 15 11 66 Solve each proportion. If necessary, round to the nearest hundredth. v = 34 46 23 3 = 2 12 y + 6 x 1 7 = x 2 6
Lesson 2.7 Percent of Change Find the percent of change. Round to the nearest whole percent. Determine if the percent is an increase or decrease. original: 18 new: 10 original: 200 new: 320 original: 98.6 new: 64 Find the total price of each item. blocks: $25 tax: 6.5% crib: $400 discount: 30% rattle: $5 discount: 20%, tax: 7% Lesson 2.8 Literal Equations and Dimensional Analysis Solve each equation or formula for the variable indicated. d = rt, for r 6w y = 2z, for w 3b 4 = c, for b 2 Lesson 2.9 Weighted Averages Two trains leave Raleigh at the same time, one traveling north, and the other south. The first train travels at 50 miles per hour and the second at 60 miles per hour. In how many hours will the trains be 275 miles apart? First Train Second Train r t d = rt A pineapple drink contains 15% pineapple juice. How much pure pineapple juice should be added to 8 quarts of the pineapple drink to obtain a mixture containing 50% pineapple juice? Pineapple Drink Pineapple Juice Mixture Number of Quarts Percent Total
Chapter 5: Linear Inequalities Lesson 5.1 Solving Inequalities by Addition and Subtraction Solve each inequality, and graph the solution on the number line. n 2.5-5 3x + 8 > 4x ½ c ¾ Define a variable, write an inequality, and solve each problem. The sum of a number and 17 is no less than 26. Twice a number minus 4 is less than three times the number. Twelve is at most a number decreased by 7. Lesson 5.2 Solving Inequalities by Multiplication and Division Solve each inequality. Check your solution. 13p > 39-13h 52 2 3 n > -12-5 9 t < 25 0.1x -4 3 > -15y Define a variable, write an inequality, and solve each problem. Negative three times a number is at least 57. Two thirds of a number is no more than 10. Negative three fifths of a number is less than 6.
Lesson 5.3 Solving Multi-Step Inequalities Solve each inequality. Check your solution. 5 t 5 9 3f 10 > 7 5n 3(n 6) 0 5 Define a variable, write an inequality, and solve each problem. A number is less than one fourth the sum of three times the number and four. Two times the sum of a number and four is no more than three times the sum of the number and seven decreased by four. The area of a triangular garden can be no more than 120 square feet. The base of the triangle is 16 feet. What is the height of the triangle? Lesson 5.4 Solving Compound Inequalities Graph the solution set of each compound inequality. -4 n 1 x > 0 or x < 3 g < -3 or g 4 Write a compound inequality for each graph. Solve each compound inequality. Then graph the solution set. k 3 < 7 or k + 5 8 5 < 3h + 2 11 2c 4 > 6 and 3c + 1 < 13
Lesson 5.5 Inequalities Involving Absolute Value Solve each inequality. Then graph the solution set. 2z 9 1 3 2r > 7 Write an open sentence involving absolute value for each graph.
Chapter 3: Linear Functions Lesson 3.1 Graphing Linear Equations Determine whether each equation is a linear equation. Write yes or no. If yes, write in standard form. 3x 2y = 5 4xy + 2y = 9 8x 3y = 6 4x Determine the x-intercept and y-intercept of each equation. 4x 3y = 12 x 2y = 10 3x y = 6 Graph each equation by using the intercepts. ½x y = 2 5x 2y = 10 1.5x + 3y = 9 Lesson 3.2 Solving Linear Equations by Graphing A bus is driving at 60 miles per hour toward a bus station that is 250 miles away. The function d = 250 50t represents the distance d from the bus station the bus is t hours after it has started driving. Graph the function: Find the zero of the function: Describe what this value means in the context of the situation.
Lesson 3.3 Rate of Change and Slope Find the slope of the line through each pair of points. (6, 3) and (7, -4) (5, 9) and (3, 9) (-2, 5) and (-2, 6) Find the value of r so the line that passes through each pair of points has the given slope. (-2, r) and (6,7) m = ½ (-7, 2) and (-8, r) m = -5 Lesson 3.4 Direct Variation Graph each equation. y = -2x y = 6 x 5 y = -x Suppose y varies directly as x. Write a direct variation equation that relates x and y. Then solve. If y = 7.5 when x = 0.5, If y = 80 when x = 32, find y when x = 0.3. find x when y = 100.
Lesson 3.5 Arithmetic Sequences as Linear Functions Determine whether each sequence is an arithmetic sequence. Write yes or no. 21, 13, 5, -3, 1, 4, 9, 16, -5, 12, 29, 46, Find the next three terms of each arithmetic sequence. 82, 76, 70, 64, -10, -3, 4, 11, -4, -10, -16, -22, Write an equation for the nth term of each arithmetic sequence. Then graph the first five terms of the sequence. 9, 13, 17, 21, -5, -2, 1, 4, 19, 31, 43, 55, Lesson 3.6 Proportional and Nonproportional Relationships Times (seconds) 1 2 3 4 5 Number of Flashes 2 4 6 8 10 Write an equation in function notation for the relation. How many times will the firefly flash in 20 seconds? Write an equation in function notation for each relation.
Chapter 4: Equations of Linear Functions Lesson 4.1 Graphing Equations Write an equation of a line in slope-intercept form with the given slope and y- intercept. slope: ¼ y-intercept: 3 slope: 0 y-intercept: -7 slope: -1 y-intercept: 0 Write an equation in slope-intercept form for each graph shown. Graph each equation. y = -½x + 2 3y = 2x 6 6x + 3y = 6 Carla has already written 10 pages of a novel. She plans to write 15 additional pages per month until she is finished. Write an equation to find the total number of pages P written after any number of months, m. Graph the equation. Find the total number of pages written after 5 months.
Lesson 4.2 Writing Equations in Slope-Intercept Form Write an equation of the line that passes through the given point and has the given slope. (-5, 4), slope: -3 (6, 0), slope: 1/2 Write an equation of the line that passes through each pair of points. (-2, -3) and (4, 5) (-3, 0) and (1, -6) Lesson 4.3 Writing Equations in Point-Slope Form Write an equation in point-slope form for the line that passes through each point with the given slope. (2, 2), m = -3 (-3, -4), m = 1 (3, -8), m = ½ Write each equation in standard form. y 11 = 3(x 2) y 5 = 3/2(x + 4) y + 4 = 1.5(x + 2) Write each equation in slope-intercept form. y + 2 = 4(x + 2) y + 1 = -7(x + 1) y ¼ = -2(x ¼)
Lesson 4.4 Parallel and Perpendicular Lines Write an equation in slope-intercept form for the line that passes through the given point and is parallel to the graph of the given equation. (3, 2), y = x + 5 (-2, 5), y = -4x + 2 (3, 1), 2x + 5y = 7 Write an equation in slope-intercept form for the line that passes through the given point and is perpendicular to the graph of the given equation. (-4, -3), 4x + y = 7 (10, 5), 5x + 4y = 8 (4, -5), 2x 5y = 10 Lesson 4.5 Scatter Plots and Lines of Fit Determine whether each graph shows a positive correlation, a negative correlation, or no correlation. If there is a positive or negative correlation, describe its meaning in the situation. The table shows the average and maximum longevity of various animals in captivity. Draw a scatter plot and determine the correlation. Longevity (years) Avg. 12 25 15 8 35 40 41 20 Max. 47 50 40 20 70 77 61 54 Draw a line of fit for the scatter plot. Write the slope-intercept form of the equation for the line of fit. Predict the maximum longevity for an animal with an average longevity of 33 years.
Lesson 4.7 Inverse Linear Functions Find the inverse of each relation. {( 2, 1), ( 5, 0), ( 8, 1), ( 11, 2)} {(5, 11), (1, 6), ( 3, 1), ( 7, 4)} Graph the inverse of each function. x y x y x y Find the inverse of each equation in f -1 (x) notation. f(x) = 9x + 12 f(x) = 3x 1 6 f(x) = 6 5 x 3 Find the inverse of each equation in f -1 (x) notation. 4x + 6y = 24-3y + 5x = 18 2x 3 = 4x + 5y
Chapter 6: Systems of Linear Equations Lesson 6.1 Graphing Systems of Equations Graph each system and determine the number of solutions that it has. If there is a solution, name it. 3x y = -2, 3x y = 0 y = 2x 3, 4x = 2y + 6 x + 2y = 3, 3x y = -5 Nick plans to start a dog-treat business. He figures it will cost $20 in operating costs plus $0.50 to product each treat. He plans to sell the treats for $1.50. Graph the system of y = 0.5x + 20 and How many treats does Nick need to sell y = 1.5x to represent the situation. per week to break even? Use substitution to solve each system of equations. y = 6x x + 2y = 13 2x + 3y = -20-2x 3y = -18 x = 2y + 7 x = y + 4 Tickets to a movie cost $7.25 for adults and $5.50 for students. A group of friends purchased 8 tickets for $52.75. Write a system of equations to represent How many adults tickets and student the situation. tickets were purchased?
Lesson 6.3 Elimination Using Addition and Subtraction Use elimination to solve each system of equations x y = 1 x + y = -9 4x + y = 23 3x y = 12 2x + 5y = -3 2x + 2y = 6 The sum of two numbers is 41 and their difference is 5. What are the numbers? One number added to three times another number is 24. Five times the first number added to three times the other number is 36. Find the numbers. 5x 2y = -10 3x + 6y = 66 Lesson 6.4 Elimination Using Multiplication 2x 4y = -22 3x + 3y = 30 0.5x + 0.5y = -2 x 0.25y = 6 Eight times a number plus five times another number is -13. The sum of the two numbers is 1. What are the numbers? Two times a number plus three times another number equals 4. Three times the first number plus four times the other number is 7. Find the numbers.