Math 1300: Section 4-1 Review: Systems of Linear Equations in Two Variables

Systems in Two Variables
Graphing
Substitution
Elimination by Addition
Applications

Math 1300 Finite Mathematics
Section 4.1 Review: Systems of Linear Equations in Two
Variables

Jason Aubrey

Department of Mathematics
University of Missouri

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Jason Aubrey Math 1300 Finite Mathematics

Graphing
Substitution
Applications

Definition (Systems of Equations in Two Variables)
Given the linear system

ax + by = h
cx + dy = k

A pair of numbers x = x0 , y = y0 [also written as an ordered
pair (x0 , y0 ) is said to be a solution of the system if each
equation is satisfied by the pair. The set of all such ordered
pairs is called the solution set for the system. To solve a
system is to find its solution set.

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Graphing
Substitution
Applications

Definition (Systems of Equations in Two Variables)
Given the linear system

ax + by = h
cx + dy = k

A pair of numbers x = x0 , y = y0 [also written as an ordered
pair (x0 , y0 ) is said to be a solution of the system if each
equation is satisfied by the pair. The set of all such ordered
pairs is called the solution set for the system. To solve a
system is to find its solution set.

We will consider three methods for solving such systems:
graphing, substitution, and elimination by addition. university-logo


Graphing
Substitution
Applications

Example: Solve the linear system by graphing:

3x − y = 2
x + 2y = 10

10
8
6
4
2

−4 −2 2 4 6 8 10 university-logo
−2


Graphing
Substitution
Applications

Example: Solve the linear system by graphing:

3x − y = 2
x + 2y = 10

10
8
6
(2, 4)
4
2

−4 −2 2 4 6 8 10 university-logo
−2


Graphing
Substitution
Applications

Deﬁnition (Systems of Linear Equations: Basic Terms)
A system of linear equations is consistent if it has one or more
solutions and inconsistent if no solutions exist. Furthermore, a
consistent system is said to be independent if it has exactly
one solution and dependent if it has more than one solution.
Two systems of equations are equivalent if they have the same
solution set.

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Graphing
Substitution
Applications

Theorem (Possible Solutions to a Linear System)
The linear system

ax + by = h
cx + dy = k

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Graphing
Substitution
Applications

The linear system

ax + by = h
cx + dy = k

Must have
Exactly one solution (consistent and independent), or

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Graphing
Substitution
Applications

The linear system

ax + by = h
cx + dy = k

Must have
No solution (inconsistent), or

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Graphing
Substitution
Applications

The linear system

ax + by = h
cx + dy = k

Must have
Inﬁnitely many solutions (consistent and dependent).

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Graphing
Substitution
Applications

The linear system

ax + by = h
cx + dy = k

Must have
Inﬁnitely many solutions (consistent and dependent).
There are no other possibilities.
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Graphing
Substitution
Applications

Example: Graph the equations and ﬁnd the coordinates of any
points where two or more lines intersect. Discuss the nature of
the solution set.

x − 2y = −6
2x + y = 8
x + 2y = −2

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Graphing
Substitution
Applications

6

4

2

−4 −2 0 2 4

−2

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Graphing
Substitution
Applications

6
x − 2y = −6
4

2

−4 −2 0 2 4

−2

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Graphing
Substitution
Applications

6
x − 2y = −6
4 2x + y = 8

2

−4 −2 0 2 4

−2

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Graphing
Substitution
Applications

6
x − 2y = −6
4 2x + y = 8
x + 2y = −2
2

−4 −2 0 2 4

−2

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Graphing
Substitution
Applications

6
(2, 4) x − 2y = −6
4 2x + y = 8
x + 2y = −2
2

−4 −2 0 2 4

−2

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Graphing
Substitution
Applications

6
(2, 4) x − 2y = −6
4 2x + y = 8
(−2, 2)
x + 2y = −2
2

−4 −2 0 2 4

−2

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Graphing
Substitution
Applications

6
(2, 4) x − 2y = −6
4 2x + y = 8
(−2, 2)
x + 2y = −2
2
No point lies on all
three lines. So, no so-
−4 −2 0 2 4 ( 14 , − 4 )
3 3 lution to this system.
−2

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Graphing
Substitution
Applications

Example: Solve the linear system by substitution:

2x + y = 6
x − y = −3

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Graphing
Substitution
Applications


2x + y = 6
x − y = −3

2x + y = 6

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Graphing
Substitution
Applications


2x + y = 6
x − y = −3

2x + y = 6
y = 6 − 2x now substitute:

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Graphing
Substitution
Applications


2x + y = 6
x − y = −3

2x + y = 6
x − y = −3

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Graphing
Substitution
Applications


2x + y = 6
x − y = −3

2x + y = 6
x − y = −3
x − (6 − 2x) = −3

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Graphing
Substitution
Applications


2x + y = 6
x − y = −3

2x + y = 6
x − y = −3
x − (6 − 2x) = −3
3x − 6 = −3

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Graphing
Substitution
Applications


2x + y = 6
x − y = −3

2x + y = 6
x − y = −3
x − (6 − 2x) = −3
3x − 6 = −3
x =1

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Graphing
Substitution
Applications


2x + y = 6
x − y = −3

2x + y = 6
x − y = −3
x − (6 − 2x) = −3
3x − 6 = −3
x =1

Substituting we obtain y = 4. So, the solution is the point (1, 4).
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Graphing
Substitution
Applications

Graphing and substitution work well for systems involving
two variables.

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Graphing
Substitution
Applications

two variables.
However, neither is easily extended to larger systems.

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Graphing
Substitution
Applications

two variables.
Elimination by addition is the most important method of
solution.

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Graphing
Substitution
Applications

two variables.
Elimination by addition is the most important method of
solution.
It readily generalizes to larger systems and forms the basis
for computer-based solution methods.

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Graphing
Substitution
Applications

Theorem (Operations that Produce Equivalent Systems)
A system of linear equations is transformed into an equivalent
system if

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Graphing
Substitution
Applications

system if
(A) Two equations are interchanged.

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Graphing
Substitution
Applications

system if
(B) An equation is multiplied by a nonzero constant.

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Graphing
Substitution
Applications

system if
(B) An equation is multiplied by a nonzero constant.
(C) A constant multiple of one equation is added to another
equation.

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Graphing
Substitution
Applications

Example: Solve the linear system using elimination by addition

3u − 2v = 12
7u + 2v = 8

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Graphing
Substitution
Applications


3u − 2v = 12
7u + 2v = 8

3u − 2v = 12

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Graphing
Substitution
Applications


3u − 2v = 12
7u + 2v = 8

3u − 2v = 12
+7u + 2v = 8

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Graphing
Substitution
Applications


3u − 2v = 12
7u + 2v = 8

3u − 2v = 12
+7u + 2v = 8
10u + 0 = 20

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Graphing
Substitution
Applications


3u − 2v = 12
7u + 2v = 8

3u − 2v = 12
+7u + 2v = 8
10u + 0 = 20
u=2

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Graphing
Substitution
Applications


3u − 2v = 12
7u + 2v = 8

3u − 2v = 12
+7u + 2v = 8
10u + 0 = 20
u=2

Substituting, we obtain v = −3. So the solution is (2,-3)

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Graphing
Substitution
Applications

Example: Solve using elimination by addition.

3x − 2y = 8
2x + 5y = −1

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Graphing
Substitution
Applications


3x − 2y = 8
2x + 5y = −1

We multiply the ﬁrst equation by 5 and the bottom equation by 2
and then add.

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Graphing
Substitution
Applications


3x − 2y = 8
2x + 5y = −1

and then add.
15x − 10y = 40

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Graphing
Substitution
Applications


3x − 2y = 8
2x + 5y = −1

and then add.
15x − 10y = 40
4x + 10y = −2

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Graphing
Substitution
Applications


3x − 2y = 8
2x + 5y = −1

and then add.
15x − 10y = 40
4x + 10y = −2
19x = 38

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Graphing
Substitution
Applications


3x − 2y = 8
2x + 5y = −1

and then add.
15x − 10y = 40
4x + 10y = −2
19x = 38
1
Now we multiply both sides of this last equation by 19 to obtain
x = 2.
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Graphing
Substitution
Applications


3x − 2y = 8
2x + 5y = −1

and then add.
15x − 10y = 40
4x + 10y = −2
19x = 38
1
Now we multiply both sides of this last equation by 19 to obtain
x = 2. Then we substitute back into either of the two original
equations to obtain y = −1. university-logo


Graphing
Substitution
Applications

Example: At $4.80 per bushel, the annual supply for soybeans
in the Midwest is 1.9 billion bushels and the annual demand is
2.0 billion bushels. When the price increases to $5.10 per
bushel, the annual supply increases to 2.1 billion bushels and
the annual demand decreases to 1.8 billion bushels. Assume
that the supply and demand equations are linear.

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Graphing
Substitution
Applications

(a) Find the supply equation.

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Graphing
Substitution
Applications

We wish to ﬁnd an equation of the form p = mq + b where p
represents unit price and q represents quantity demanded.
We have two points (q, p) on the graph of the supply equation:
(1.9, 4.80) and (2.1, 5.10).

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Graphing
Substitution
Applications

(1.9, 4.80) and (2.1, 5.10).
The slope of this line is:

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Graphing
Substitution
Applications

(1.9, 4.80) and (2.1, 5.10).

5.10 − 4.80 0.3 3
m= = =
2.1 − 1.9 0.2 2

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Graphing
Substitution
Applications

Therefore the equation of this line is

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Graphing
Substitution
Applications


3
p − 4.8 = (q − 1.9)
2

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Graphing
Substitution
Applications


3
p − 4.8 = (q − 1.9)
2
3 3
p = q − (1.9) + 4.8
2 2

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Graphing
Substitution
Applications


3
p − 4.8 = (q − 1.9)
2
3 3
p = q − (1.9) + 4.8
2 2
3
p = q + 1.95
2

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Graphing
Substitution
Applications

(b) Find the demand equation.

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Graphing
Substitution
Applications

Again, we want an equation of the form p = mq + b. We have
two points on the graph of the demand equation: (2.0, 4.80)
and (1.8, 5.10).

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Graphing
Substitution
Applications

and (1.8, 5.10).
5.10 − 4.80 0.3 3
m= =− =−
1.8 − 2.0 0.2 2

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Graphing
Substitution
Applications

and (1.8, 5.10).
5.10 − 4.80 0.3 3
m= =− =−
1.8 − 2.0 0.2 2
3
p − 4.80 = − (q − 2.0)
2

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Graphing
Substitution
Applications

and (1.8, 5.10).
5.10 − 4.80 0.3 3
m= =− =−
1.8 − 2.0 0.2 2
3
p − 4.80 = − (q − 2.0)
2
3 3
p = − q + (2.0) + 4.80
2 2
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Graphing
Substitution
Applications

and (1.8, 5.10).
5.10 − 4.80 0.3 3
m= =− =−
1.8 − 2.0 0.2 2
3
p − 4.80 = − (q − 2.0)
2
3 3
p = − q + (2.0) + 4.80
2 2
3
p = − q + 7.80 university-logo
2

Graphing
Substitution
Applications

(c) Find the equilibrium price and quantity.

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Graphing
Substitution
Applications

We set supply equal to demand and solve:

3 3
− q + 7.80 = q + 1.95
2 2

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Graphing
Substitution
Applications


3 3
− q + 7.80 = q + 1.95
2 2
3q = 5.85

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Graphing
Substitution
Applications


3 3
− q + 7.80 = q + 1.95
2 2
3q = 5.85
q = 1.95 billion bushels

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Graphing
Substitution
Applications


3 3
− q + 7.80 = q + 1.95
2 2
3q = 5.85
q = 1.95 billion bushels

Substituting, we ﬁnd p = − 3 (1.95) + 7.80 = $4.88
2

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Graphing
Substitution
Applications

(d) Graph the two equations in the same coordinate system and
identify the equilibrium point, supply curve, and demand curve.

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Graphing
Substitution
Applications

f

6

4

2

0 2 4 6 8 10 12

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Graphing
Substitution
Applications

f

6

4

2

0 2 4 6 8 10 12
g
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Graphing
Substitution
Applications

f

6
(1.95, 4.88)
4

2

0 2 4 6 8 10 12
g
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Graphing
Substitution
Applications

f

Supply Curve
6
(1.95, 4.88)
4

2

0 2 4 6 8 10 12
g
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Graphing
Substitution
Applications

f

Supply Curve
6
(1.95, 4.88)
4

2 Demand Curve

0 2 4 6 8 10 12
g
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Math 1300: Section 4-1 Review: Systems of Linear Equations in Two Variables

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Math 1300: Section 4-1 Review: Systems of Linear Equations in Two Variables