Warm-Up Exercises ANSWER 2 4 3 y x =+ 3 Evaluate for and 1. 5x5x+2y2y 2x = 4.4. y = – Find the...
-
Upload
sheryl-goodwin -
Category
Documents
-
view
214 -
download
1
Transcript of Warm-Up Exercises ANSWER 2 4 3 y x =+ 3 Evaluate for and 1. 5x5x+2y2y 2x = 4.4. y = – Find the...
Warm-Up Exercises
ANSWER 2
ANSWER4
3y x= + 3
Evaluate for and1. 5x + 2y 2x = 4.y = –
Find the slope-intercept form of the equation 2.12.3x + 4y =–
ANSWER 18xC =
Express the cost C of x ball game tickets at a price of $18 per ticket.
3.
Example 1 Solve a System by Graphing
Solve the system by graphing. Then check your solution algebraically.
33x – y =
8x + 2y =
Equation 1
Equation 2
SOLUTION
Graph both equations, as shown. From the graph, you can see the lines appear to intersect at (
).2, 3
Example 1 Solve a System by Graphing
You can check the solution by substituting 2 for x and 3 for y into the original equations.
Equation 1 Equation 2
33x – y = 8x + 2y =
( )2 33 – 3 =? 2 8+ =?( )32
36 – 3 =? 2 8+ =
?6
33 = 88 =
ANSWER ( ).2, 3The solution of the system is
Checkpoint
Solve the system by graphing. Then check your solution.
1. 3y – x= +
9y 2x= +
ANSWER ( )2, 5–
Solve a System by Graphing
Checkpoint
2. x 3y =– 1
x y =+ 1– –
ANSWER ( )1, 0
Solve a System by Graphing
Solve the system by graphing. Then check your solution.
Checkpoint
3. =
2x 3y =– 6
ANSWER ( )6, 2
Solve a System by Graphing
Solve the system by graphing. Then check your solution.
2+ 4yx–
Systems with Many or No SolutionsExample 2
Tell how many solutions the linear system has.
a. 1=y–2x
+ =2y–4x 2–
b.
+ =2yx 1
+ =2yx 4
a.
SOLUTION
Because the graph of each equation is the same, each point on the line is a solution. So, the system has infinitely many solutions.
Example 2
b. Because the graphs of the equations are two parallel lines, the two lines have no point of intersection. So, the system has no solution.
Systems with Many or No Solutions
Write and Use a Linear SystemExample 3
Vacation You are planning a 7-day trip to California. You estimate that it will cost $300 per day in San Diego and $400 per day in Anaheim. Your total budget for the trip is $2400. How many days should you spend in each city?
SOLUTION
You can use a verbal model to write a system of linear equations.
VERBALMODEL
Totalvacation time
Days inSan Diego
Days inAnaheim =+
•Daily
cost inSan Diego
=+Daily
cost inAnaheim
TotalBudget
• Days inAnaheim
Days inSan Diego
+
Write and Use a Linear SystemExample 3
LABELS Days in San Diego x= (days)
Days in Anaheim y= (days)
Total vacation time 7=
(dollars per day)Daily cost in San Diego 300=
(dollars per day)Daily cost in Anaheim 400=
(days)
Total budget 2400= (dollars)
ALGEBRAICMODEL
Equation 1 (total vacation time)
7=x + y
Equation 2 (total budget)2400=300x + 400y
Write and Use a Linear SystemExample 3
Graph both equations only in the first quadrant because the only values that make sense in this situation arepositive values of x and y.
The lines appear to intersect at .( )4, 3
Write and Use a Linear SystemExample 3
CHECK Substitute 4 for x and 3 for y in the original equations.
Equation 2 2400=300x + 400y = +300( )4 400( )3
Equation 1 =x + y 7=4 + 3
ANSWER
The solution is . You should plan to spend 4 days in San Diego and 3 days in Anaheim.
( )4, 3
Tell how many solutions the linear system has.
Checkpoint
ANSWER 0
Write and Use Linear Systems
5. 5=4y–x
+ =4y–x 5–
4. + =3y2x 1
+ =6y4x 3
ANSWER infinitely many solutions
ANSWER 16. 5=5y–x
+ =5yx 5
Tell how many solutions the linear system has.
Checkpoint Write and Use Linear Systems
7. Vacation Your family is planning a 6-day trip to Florida. You estimate that it will cost $450 per day in Tampa and $600 per day in Orlando. Your total budget is $3000. How many days should you spend in each city?
ANSWER
4 days in Tampa and 2 days in Orlando