11-17-14 bellwork-- graph. 11-17-14 solutions intro to systems of equations and graphing mfcr lesson...
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11-17-14 Bellwork-- Graph
11-17-14 Solutions
Intro to Systems of
Equations and Graphing
MFCR Lesson 3-111-17-14
What is a System of Equation?
A SYSTEM OF EQUATIONS is:
A SOLUTION to the SYSTEM OF EQUATIONS is:
A POINT OF INTERSECTION is:
two or more equations with the same variable being compared.
the point that both equations have in common: THE POINT OF INTERSECTION
the point where both lines meet
Write the solution of each system of equation as an
ordered pair.
(4, -3)
(8, -3)
Both systems have only ONE SOLUTION.
Write the solution of each system of equation as an
ordered pair.
(2, -2)
(1, 2)
Write the solution of each system of equation as an
ordered pair.
∅ ∅
Parallel lines do not intersect. Therefore, there is NO SOLUTION!
Write the solution of each system of equation as an
ordered pair.What is different about this graph? There appears to only be one line graphed. We call this coinciding lines.
Because there are more than one line on top of each other, what can we conclude about the solution set?There are infinite many solutions
ℝ
Write the solution of each system of equation as an
ordered pair.
(-3, 0)
Graphing System of Equations
When finding the solution to a system of equation, finding the point of intersection is required.
To do this, the equations must be graphed. Therefore, the equation must be put in SLOPE-INTERCEPT FORM.
𝑦=𝑚𝑥+𝑏
Procedures
Put each equation in Slope-Intercept Form
Identify the slope and y- intercept
m = ____ b = ____
m = ____ b =____
Find the solution set for {𝒚=−𝟏𝟐𝒙+𝟒
𝟑 𝒙−𝟐 𝒚=𝟖
Already in the correct format!
−𝟏𝟐 4
𝟑𝟐 -4
3x – 2y = 8 -3x - 3x
-2y = -3x + 8 -2 -2
Draw each line on the same grid.
Procedures
Identify the slope and y- intercept
m = ____ b = ____
m = ____ b =____
−𝟏𝟐 4
𝟑𝟐 -4
a) What type of lines are there?
b) What type of solutions do these lines have?
c) What is/are the solution(s) located?
Intersecting lines
One solution
( 4, 2 )
Procedures
Put each equation in Slope-Intercept Form
Identify the slope and y- intercept
m = ____ b = ____
m = ____ b =____
Find the solution set for {𝟐 𝒙+𝒚=𝟒𝒙− 𝒚=𝟐
2x + y = 4 - 2x -2x
y = -2x + 4
−𝟐 4 𝟏 -2
x - y = 2 -x -x
-y = -x + 2
y = x - 2
-1( )
Draw each line on the same grid.
Procedures
Identify the slope and y- intercept
m = ____ b = ____
m = ____ b =____−𝟐 4 1 -2
a) What type of lines are there?
b) What type of solutions do these lines have?
c) What is/are the solution(s) located?
Intersecting lines
One solution
( 2, 0)
x − y=2
Procedures
Put each equation in Slope-Intercept Form
Identify the slope and y- intercept
m = ____ b = ____
m = ____ b =____
Find the solution set for { 𝒚=𝟐 𝒙−𝟑𝟐 𝒙−𝒚=−𝟏
Already in the correct format!
𝟐 -3 𝟐 1
2x – y = -1 -2x - 2x
-y = -2x - 1
-1( )
Graph each equation in the graphing
calculator
and answer the following questions. Procedures
Identify the slope and y- intercept
m = ____ b = ____
m = ____ b =____
𝟐 -3 𝟐 1
a) What type of lines are there?
b) What type of solutions are there?
c) What do you notice about the equations when they are in slope intercept form AND do you think this has an effect on the solution?
Parallel lines
NO SOLUTIONS
When the equations are in slope-intercept form, you notice the slopes are the same. When the slopes are the same, the lines will be parallel and have solution.
Procedures 3x
Put each equation in Slope-Intercept Form
Identify the slope and y- intercept
m = ____ b = ____
m = ____ b =____
Find the solution set for { 𝟑 𝒙−𝒚=𝟖𝟐 𝒚=𝟔 𝒙−𝟏𝟔
3x - y = 8 - 3x -3x
-y = -3x + 8
y = 3x - 8𝟑 -8 𝟑 -8
2y = 6x - 16 2 2
y = 3x - 8-1( )
Graph each equation in the graphing
calculator
and answer the following questions. Procedures
Identify the slope and y- intercept
m = ____ b = ____
m = ____ b =____
𝟑 8 𝟑 8
a) What type of lines are there?
b) What type of solutions are there?
c) What do you notice about the equations when they are in slope intercept form AND do you think this has an effect on the solution?
Coinciding lines
Infinite many solutions
When the equations are in slope-intercept form, you notice the equations are the same. When the equations are the same, there are infinite many solutions.
Application of Systems of Equations
When you are given a word problem, remember to do the
following:
Equation in Words
Variables
Equation with Numbers/Variab
les
Equation in Slope-
Intercept Form
1)
2)
Rewrite what the first equation could be.
Rewrite what the second equation could be.
Determine the
what the unknown variables are and
what letter
they will represent
.
Rewrite the first equation algebraically
using the variables chosen.
Rewrite the second
equation algebraically
using the variables chosen.
Rewrite the second
equation in slope-intercept
form and graph.
Rewrite the first equation
in slope-intercept form
and graph.
Finally, find the solution set using the calculator.
The school is selling tickets to a band concert. On the first day of ticket sales, the school sold 3 adult tickets
and 1 student tickets for a total of $28. The school took in $32 on the second day by selling 3 adult tickets and 2 student tickets. Find the price of a
student ticket and an adult ticket.
Equation in Words
Variables
Equation with Numbers/Variab
les
Equation in Slope-
Intercept Form
1)
2)
The school sold 3 adult tickets and 1 student ticket for $28
The school sold 3 adult tickets and 2 student ticks for $32
a = cost of adult tickets(let a = x)
s = cost of
student tickets
(let s = y)
3x + y = 28
3x + 2y = 32
3x + y = 28
- 3x -3x y = -3x + 283x + 2y =
32- 3x -
3x 2y = -3x + 32 2 2
The school is selling tickets to a band concert. On the first day of ticket sales, the school sold 3 adult tickets
and 1 student tickets for a total of $28. The school took in $32 on the second day by selling 3 adult tickets and 2 student tickets. Find the price of a
student ticket and an adult ticket.
Equations in Slope-Intercept Form
Graph of the System 1)
y = -3x + 28
2)
Solution set is (8,
4)
Graph each equation. Where is the solution set located?
Remember what x and y equals when it relates the word problem:
x = ______________ and y = _____________
What does the solution set mean?
The solution is located at (8, 4).
cost of adult tickets
cost of student tickets
Adult tickets cost $8 each and student tickets cost $4 each.
You are getting ready to move and have asked some friends to help. For lunch, you buy the following sandwiches at the local deli for $30: six ham sandwiches and six turkey sandwiches.
Later at night, everyone is hungry again and you buy four ham sandwiches and eight turkey sandwiches for $30.60. What is
the price of each sandwich?
Equation in Words
Variables
Equation with Numbers/Variab
les
Equation in Slope-
Intercept Form
1)
2)
6 ham and 6 turkey for $30
4 ham and 8 turkey for
$30.60
h = ham sandwiche
s(let h = x)
t = tuna sandwiche
s(let t = y)
6x + 6y = 30
4x + 8y = 30.20
6x + 6y = 30- 6x -6x 6y = -6x + 30 6 6 y = -x + 5
4x + 8y = 30.20
-4x -4x 8y = -4x + 30.20 8 8
Equations in Slope-
Intercept FormGraph of the System
1)
y = -x + 5
2)
You are getting ready to move and have asked some friends to help. For lunch, you buy the following sandwiches at the local deli for $30: six ham sandwiches and six turkey sandwiches.
Later at night, everyone is hungry again and you buy four ham sandwiches and eight turkey sandwiches for $30.60. What is
the price of each sandwich?
Solution set is (2,
3)
Graph each equation. Where is the solution set located?
Remember what x and y equals when it relates the word problem:
x = ______________ and y = _____________
What does the solution set mean?
The solution is located at (2, 3).
cost of ham sandwiches
cost of turkey sandwiches
Ham sandwiches cost $2 each and turkey sandwiches cost $3 each.
The concession stand is selling hot dogs and hamburgers during a game. At halftime, they sold a total of 50 hot dogs and
hamburgers and brought in $105.50. How many of each item did they sell if hamburgers sold for $1.50 and hot dogs sold for
$1.25?
Equation in Words
Variables
Equation with Numbers/Variab
les
Equation in Slope-
Intercept Form
1)
2)
50 hotdog and hamburgers
were sold
With selling hotdogs for .50
and hamburgers for
$1, $105.50 was made.
h = hotdogs(let h = x)
b = hamburger
s(let b = y)
x + y = 50
0.5x + y = 75.50
x + y = 50 - x -x y = -x + 50
0.5x + y = 75.5 -0.5x -0.5x y = -0.5x + 75.5