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Transcript
Algebra 1 Unit 4 Solve Systems of Linear Equations Unit 4 Test Review Mathematician: ________________________________ Period:___________ Target 4.1: Solve a system of linear equations graphically/numerically Directions: Graph the system of linear equations. After solving the system, what is the sum of the x- and y- coordinates of the solution? 1) ì5x + y = -1 í î y = -x + 3 2) ì y + 4 = -x í î-24 + 6 y = 10x 3) Solution: ______________ Solution: ______________ Sum: ______________ Sum: ______________ 4) Describe the types of solutions that a system of linear equations can have. ì3y = 9x + 6 í î-3x - 3y = 24 Solution: ______________ Sum: ______________ 5) Describe the graph of a system of linear equations if the solution is “no solution.” Directions: Given that one of the lines in the system of linear equations is -3x - y = 5 , choose the equation that would give the indicated solution. 6) Infinitely many solutions 7) One solution A) y = -3x -1 A) y = 4x + 2 B) y = 2x +10 B) y = -3x -5 C) y = -3x -5 C) y = -3x + 2 Directions: Choose the appropriate graph(s) to answer Questions 8-10. Choose all that apply. (c) Two solutions (d) Infinitely many solutions (e) Not enough information (a) Zero solutions (b) Exactly one solution 8) A B C D E Line 1: y-intercept of 7 and decreasing Line 2: y-intercept of -6 and decreasing 9) A B C D E Line 3: positive and contains point (-1, 3) Line 4: 1 y=- x+7 4 10) A B C D E Line 5: slope of -2 and contains point (2, 4) Line 6: y = -2x + 4 Target 4.2: Solve a system of linear equations by substitution 11) Which equation would you use as the substitute in the following system of linear equations? 12) Which equation would you use as the substitute in the following system of linear equations? Equation 1: 3x - 7y = 21 Equation 1: 2x - y = 3 Equation 2 : x = 2x -1 Equation 2 : x + 6 y = 12 Directions: Solve the following systems by substitution. 13) ì y = -3x - 9 í î-x - 3y = 11 Solution: ______________ 14) ì-4x + 4 y = 0 í î x - 3y = 8 Solution: ______________ 15) ì y = 2x + 8 í îy = x +4 Solution: ______________ Directions: Solve the system of linear equations by substitution. After solving the system, what is the product of the x- and y- coordinates of the solution? 16) ì-6x + y = 21 í î-x + 5y = 18 Solution: ______________ Product: ______________ 17) ì-7x + y = 10 í î8x = 1- 3y Solution: ______________ Product: ______________ 18) ì3y + x = 6 í î2 y + 4x = -16 Solution: ______________ Product: ______________ Target 4.3: Solve a system of linear equations by elimination Directions: Solve the following systems by elimination. ì4x - y = 6 19) í îx + y = 9 20) ì8x - 5y = 11 í îx + y = 3 Solution: ______________ Solution: ______________ Directions: Solve the system. Then select the x-coordinate of the solution. 21) ì5x = -14 + 2 y í î-4x - 5y = -2 A) 0 B) 22) -2 C) -4 ì3x + 2 y = 3 í î-x - 5y = -1 A) 1 B) 0 C) -1 Directions: Solve the system. Then find the sum of the x- and y-coordinates of the solution. 23) ì-3x = -8 + 2 y í î-5y = 1+ 4x Solution: ______________ A) 11 B) -30 ì8 = 20x - 8 y í î10x = -8 + 2 y 24) Solution: ______________ C) 1 A) -8 B) 12 C) 4 Target 4.4: Write and solve a system of linear equations that models real-world situations Directions: Define your variables, write, and solve a system of linear equations that model the given situation. 25) The school that Carlos goes to is selling tickets to the annual talent show. On the first day of ticket sales the school sold 6 adult tickets and 5 student tickets for a total of $96.40. The school took in $133.60 by selling 12 adult tickets and 2 student tickets on the second day. What is the price of one adult ticket and one student ticket? a) Define your variables. b) Write and solve the linear system. 26) Nicole and Janice each improved their yards by planting hostas and geraniums. They bought their supplies from the same store. Nicole spent $117.60 on 12 hostas and 12 geraniums. Janice spent $77.80 on 6 hostas and 11 geraniums. If Janice wanted to buy one more hosta and one more geranium, how much would she spend? a) Define your variables. b) Write and solve the linear system. 27) Michelle went to the store to buy wrapping paper for the upcoming holiday season. She bought a total of 12 rolls of green and purple wrapping paper for $36.75. If green wrapping paper costs $3.50 and purple wrapping paper costs $2.75, how many of each role of wrapping paper did she buy? a) Define your variables. b) Write and solve the linear system. Directions: Define your variables, write, and solve a system of linear equations that model the given situation. 28) Ted and Lily are selling cookie dough for a school fundraiser. Customers can buy packages of sugar cookie dough and packages of chocolate chip cookie dough. Ted sold 5 packages of sugar cookie dough and 7 packages of chocolate chip cookie dough for $178. Lily sold 3 packages of sugar cookie dough and 7 packages of chocolate chip cookie dough for $160. If you were to buy 1 of each package of cookie dough, how much would you spend? a) Define your variables. b) Write and solve the linear system. 29) Six Flags is a popular field trip destination for many schools. This year the senior class at McHenry High School and Crystal Lake South High School both planned trips there. MCHS rented and filled 3 vans and 4 busses with 239 students. CLSHS rented and filled 4 vans and 4 busses with 248 students. Each van and bus carried the same number of students. How many total students total can one van and one bus hold? a) Define your variables. b) Write and solve the linear system. 30) The sum of two numbers is 13 and their difference is 1. Write a system of linear equations to find the two numbers. Unit 4 Test Review Solutions 1) Solution: (-1,4) Sum: 3 2) Solution: (-3,-1) Sum: -4 3) Solution: (-2.5,-5.5) Sum: -8 4) A system of linear equations can have three types of solutions: 0 solutions (parallel lines), 1 solution (lines intersect), or infinitely many solutions (same line) 5) Answers may vary 6) C 7) A 8) A and B 9) B 10) 11) Equation 2 12) Answers may vary 13) (-2,-3) 14) (-4,-4) 15) (-4,0) 16) Solution: (-3,3) Product: -9 17) Solution: (-1,3) Product: -3 18) Solution: (-6,4) Product: -24 19) (3,6) 20) (2,1) 21) B) -2 ==== (-2,2) 22) A) 1 ==== (1,0) 23) Solution: (6,-5) C)1 24) Solution: (-2,-6) A) -8 25) a) A = price of one adult ticket, T = price of one student ticket ì6A + 5T = 96.40 b) System = í ===== One adult ticket is $9.90 and one student ticket is $7.40 î12A+ 2T = 133.60 26) a) H = price of one hosta, G = price of one geranium ì12H +12G = 117.60 b) System = í ===== (6 , 3.80) === $9.80 î6H +11G = 77.80 27) a) G = number of rolls of green wrapping paper, P = number of rolls of purple wrapping paper ì3.5G + 2.75P = 36.75 b) System = í ===== (5,7) ==== 5 rolls of green, 7 rolls of purple îG + P = 12 28) a) S = price of 1 package of sugar cookie dough, C = price of 1 package of chocolate chip cookie dough ì5S + 7C = 178 b) System = í ===== (9,19) ==== $28 î3S + 7C = 160 29) a) V = number of students a van can hold, B = number of students a bus can hold ì3V + 4B = 239 b) System = í ===== (9,53) ==== 1 van and 1 bus can hold 62 students total î4V + 4B = 248 30) 6 and 7