Survey
* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project
Download section 6.1 - TeacherWeb
Document related concepts
Transcript
Warm-Up Exercises 1. Graph the equation –2x + y = 1. ANSWER 2. It takes 3 hours to mow a lawn and 2 hours to trim hedges. You spend 16 hours doing yard work. What are 2 possible numbers of lawns you mowed and hedges you trimmed? ANSWER 2 lawns and 5 hedges, or 4 lawns and 2 hedges Check the intersection point Warm-Up1Exercises EXAMPLE Use the graph to solve the system. Then check your solution algebraically. x + 2y = 7 Equation 1 3x – 2y = 5 Equation 2 SOLUTION The lines appear to intersect at the point (3, 2). CHECK Substitute 3 for x and 2 for y in each equation. x + 2y = 7 ? 3 + 2(2) = 7 7=7 Check the intersection point Warm-Up1Exercises EXAMPLE 3x – 2y = 5 ? 3(3) – 2(2) = 5 5=5 ANSWER Because the ordered pair (3, 2) is a solution of each equation, it is a solution of the system. Use the graph-and-check method Warm-Up2Exercises EXAMPLE Solve the linear system: –x + y = –7 Equation 1 x + 4y = –8 Equation 2 SOLUTION STEP 1 Graph both equations. Use the graph-and-check method Warm-Up2Exercises EXAMPLE STEP 2 Estimate the point of intersection. The two lines appear to intersect at (4, – 3). STEP 3 Check whether (4, –3) is a solution by substituting 4 for x and –3 for y in each of the original equations. Equation 1 –x + y = –7 ? –(4) + (–3) = –7 –7 = –7 Equation 2 x + 4y = –8 ? 4 + 4(–3) = –8 –8 = –8 Use the graph-and-check method Warm-Up2Exercises EXAMPLE ANSWER Because (4, –3) is a solution of each equation, it is a solution of the linear system. Use the graph-and-check method Warm-Up EXAMPLE 2Exercises for Examples 1 and 2 GUIDED PRACTICE Solve the linear system by graphing. Check your solution. 1. –5x + y = 0 5x + y = 10 ANSWER (1, 5) Use the graph-and-check method Warm-Up EXAMPLE 2Exercises for Examples 1 and 2 GUIDED PRACTICE Solve the linear system by graphing. Check your solution. 2. –x + 2y = 3 2x + y = 4 ANSWER (1, 2) Use the graph-and-check method Warm-Up EXAMPLE 2Exercises for Examples 1 and 2 GUIDED PRACTICE Solve the linear system by graphing. Check your solution. 3. x – y = 5 3x + y = 3 ANSWER (2, –3) Warm-Up3Exercises EXAMPLE Standardized Test Practice The parks and recreation department in your town offers a season pass for $90. • As a season pass holder, you pay $4 per session to use the town’s tennis courts. • Without the season pass, you pay $13 per session to use the tennis courts. Warm-Up3Exercises EXAMPLE Standardized Test Practice Which system of equations can be used to find the number x of sessions of tennis after which the total cost y with a season pass, including the cost of the pass, is the same as the total cost without a season pass? A y = 4x y = 13x B y = 4x y = 90 + 13x C y = 13x y = 90 + 4x D y = 90 + 4x y = 90 + 13x Warm-Up3Exercises EXAMPLE Standardized Test Practice SOLUTION Write a system of equations where y is the total cost (in dollars) for x sessions. EQUATION 1 y = 13 x Warm-Up3Exercises EXAMPLE Standardized Test Practice EQUATION 2 y = 90 + 4 x ANSWER The correct answer is C. A B C D Warm-Up Exercises GUIDED PRACTICE for Example 3 4. Solve the linear system in Example 3 to find the number of sessions after which the total cost with a season pass, including the cost of the pass, is the same as the total cost without a season pass. ANSWER 10 sessions Warm-Up Exercises GUIDED PRACTICE for Example 3 5. WHAT IF? In Example 3, suppose a season pass costs $135. After how many sessions is the total cost with a season pass, including the cost of the pass, the same as the total cost without a season pass? ANSWER 15 sessions Solve a multi-step problem Warm-Up4Exercises EXAMPLE RENTAL BUSINESS A business rents in-line skates and bicycles. During one day, the business has a total of 25 rentals and collects $450 for the rentals. Find the number of pairs of skates rented and the number of bicycles rented. Solve a multi-step problem Warm-Up4Exercises EXAMPLE SOLUTION STEP 1 Write a linear system. Let x be the number of pairs of skates rented, and let y be the number of bicycles rented. x + y = 25 Equation for number of rentals 15x + 30y = 450 Equation for money collected from rentals STEP 2 Graph both equations. Solve a multi-step problem Warm-Up4Exercises EXAMPLE STEP 3 Estimate the point of intersection. The two lines appear to intersect at (20, 5). STEP 4 Check whether (20, 5) is a solution. 20 + 5 =? 25 25 = 25 15(20) + 30(5) =? 450 450 = 450 ANSWER The business rented 20 pairs of skates and 5 bicycles. Solve a for multi-step problem Warm-Up EXAMPLE 4Exercises Example 4 GUIDED PRACTICE 6. WHAT IF? In Example 4, suppose the business has a total of 20 rentals and collects $420. Find the number of bicycles rented. ANSWER 8 bicycles Warm-Up Exercises Warm-up: Homework: Page 372 # 3-5 all, #12-26 all, # 31, #33, #35 Daily Homework Quiz Warm-Up Exercises 1. Use the graph to solve the linear system x–y=5 3x + y = 3 ANSWER (2, –3) Daily Homework Quiz Warm-Up Exercises 2. Solve the linear system by graphing. 2x + y = –3 –6x + 3y = 3 ANSWER (–1, –1) Daily Homework Quiz Warm-Up Exercises 3. A pet store sells angel fish for $6 each and clown loaches for $4 each. If the pet store sold 8 fish for $36, how many of each type of fish did it sell? ANSWER 2 angel fish and 6 clown loaches
