4.4 system of linear equations 2

Systems of Linear Equations With Three Variables

To solve for three unknowns, we need three pieces of
numerical information about the unknowns,

numerical information about the unknowns, i.e. three
sequations.

sequations. The standard method for solving systems of
linear equations is the elimination method.

We use elimination method to extract a system of two
equations with two unknowns from the system of
three equations.

three equations. Solve the system of 2 equations and plug
the answers back to get the third answer.

This is also the general method for solving a system of N
equations with N unknowns.

equations with N unknowns. We use elimination method to
extract a system of (N – 1) equations with (N – 1) unknowns.
from the system of N equations.

from the system of N equations. Then we extract a system of
(N – 2) equations with (N – 2) unknowns from the (N – 1)
equations.

equations. Continue this process until we get to and solve a
system of 2 equations.

equations. Continue this process until we get to and solve a
system of 2 equations. Then plug the answers back to get
the other answers.

Example A. We bought the following items:
2 hamburgers, 3 orders of fries and 3 sodas cost $13.
1 hamburger, 2 orders of fries and 2 sodas cost $8.
3 hamburgers, 2 fries, 3 sodas cost $13.
Find the price of each item.

Let x = cost of a hamburger, y = cost of an order of fries,
z = cost of a soda.

z = cost of a soda.
2x + 3y + 3z = 13 E1

z = cost of a soda.
2x + 3y + 3z = 13 E1
x + 2y + 2z = 8 E2

z = cost of a soda.

{
2x + 3y + 3z = 13 E1
x + 2y + 2z = 8 E2
3x + 2y + 3z = 13 E3

z = cost of a soda.

{
2x + 3y + 3z = 13 E1
x + 2y + 2z = 8 E2
3x + 2y + 3z = 13 E3
Select x to eliminate since there is 1x in E2.

z = cost of a soda.

{
2x + 3y + 3z = 13 E1
x + 2y + 2z = 8 E2
3x + 2y + 3z = 13 E3
–2*E 2 + E1:

z = cost of a soda.

{
2x + 3y + 3z = 13 E1
x + 2y + 2z = 8 E2
3x + 2y + 3z = 13 E3
–2*E 2 + E1:
–2x – 4y – 4z = -16

z = cost of a soda.

{
2x + 3y + 3z = 13 E1
x + 2y + 2z = 8 E2
3x + 2y + 3z = 13 E3
–2*E 2 + E1:
–2x – 4y – 4z = -16
+) 2x + 3y + 3z = 13

z = cost of a soda.

{
2x + 3y + 3z = 13 E1
x + 2y + 2z = 8 E2
3x + 2y + 3z = 13 E3
–2*E 2 + E1:
–2x – 4y – 4z = -16
+) 2x + 3y + 3z = 13
0– y – z =–3

z = cost of a soda.

{
2x + 3y + 3z = 13 E1
x + 2y + 2z = 8 E2
3x + 2y + 3z = 13 E3
–2*E 2 + E1: –3*E 2 + E3:
–2x – 4y – 4z = -16
+) 2x + 3y + 3z = 13
0– y – z =–3

z = cost of a soda.

{
2x + 3y + 3z = 13 E1
x + 2y + 2z = 8 E2
3x + 2y + 3z = 13 E3
–2*E 2 + E1: –3*E 2 + E3:
–2x – 4y – 4z = -16 –3x – 6y – 6z = –24
+) 2x + 3y + 3z = 13
0– y – z =–3

z = cost of a soda.

{
2x + 3y + 3z = 13 E1
x + 2y + 2z = 8 E2
3x + 2y + 3z = 13 E3
–2*E 2 + E1: –3*E 2 + E3:
–2x – 4y – 4z = -16 –3x – 6y – 6z = –24
+) 2x + 3y + 3z = 13 +) 3x + 2y + 3z = 13
0– y – z =–3

z = cost of a soda.

{
2x + 3y + 3z = 13 E1
x + 2y + 2z = 8 E2
3x + 2y + 3z = 13 E3
–2*E 2 + E1: –3*E 2 + E3:
–2x – 4y – 4z = -16 –3x – 6y – 6z = –24
+) 2x + 3y + 3z = 13 +) 3x + 2y + 3z = 13
0– y – z =–3 0 – 4y – 3z = –11

z = cost of a soda.

{
2x + 3y + 3z = 13 E1
x + 2y + 2z = 8 E2
3x + 2y + 3z = 13 E3
–2*E 2 + E1: –3*E 2 + E3:
–2x – 4y – 4z = -16 –3x – 6y – 6z = –24
+) 2x + 3y + 3z = 13 +) 3x + 2y + 3z = 13
0– y – z =–3 0 – 4y – 3z = –11
Group these two equations into a system.

Hence, we've reduced the original system to two equations
with two unknowns:
–y–z =–3
{–4y – 3z = –11

with two unknowns:
–y–z =–3 (-1)
{–4y – 3z = –11

with two unknowns:
E4
{ –y–z =–3
–4y – 3z = –11
(-1)
{ y +z = 3
4y + 3z = 11 E5

with two unknowns:
E4
{ –y–z =–3
–4y – 3z = –11
(-1)
{ y +z = 3
4y + 3z = 11 E5
To eliminate z we –3*E 4 + E5:

with two unknowns:
E4
{ –y–z =–3
–4y – 3z = –11
(-1)
{ y +z = 3
4y + 3z = 11 E5
–3y – 3z = –9

with two unknowns:
E4
{ –y–z =–3
–4y – 3z = –11
(-1)
{ y +z = 3
4y + 3z = 11 E5
–3y – 3z = –9
+) 4y + 3z = 11

with two unknowns:
E4
{ –y–z =–3
–4y – 3z = –11
(-1)
{ y +z = 3
4y + 3z = 11 E5
–3y – 3z = –9
+) 4y + 3z = 11
y+0 = 2
y= 2

with two unknowns:
E4
{ –y–z =–3
–4y – 3z = –11
(-1)
{ y +z = 3
4y + 3z = 11 E5
–3y – 3z = –9
+) 4y + 3z = 11
y+0 = 2
y= 2
To get z, set 2 for y in E4:

with two unknowns:
E4
{ –y–z =–3
–4y – 3z = –11
(-1)
{ y +z = 3
4y + 3z = 11 E5
–3y – 3z = –9
+) 4y + 3z = 11
y+0 = 2
y= 2
2+z=3

with two unknowns:
E4
{ –y–z =–3
–4y – 3z = –11
(-1)
{ y +z = 3
4y + 3z = 11 E5
–3y – 3z = –9
+) 4y + 3z = 11
y+0 = 2
y= 2
2+z=3 z=1

with two unknowns:
E4
{ –y–z =–3
–4y – 3z = –11
(-1)
{ y +z = 3
4y + 3z = 11 E5
–3y – 3z = –9
+) 4y + 3z = 11
y+0 = 2
y= 2
2+z=3 z=1
For x, set 2 for y , set 1 for z in E2: x + 2y + 2z = 8

with two unknowns:
E4
{ –y–z =–3
–4y – 3z = –11
(-1)
{ y +z = 3
4y + 3z = 11 E5
–3y – 3z = –9
+) 4y + 3z = 11
y+0 = 2
y= 2
2+z=3 z=1
x + 2(2) + 2(1) = 8

with two unknowns:
E4
{ –y–z =–3
–4y – 3z = –11
(-1)
{ y +z = 3
4y + 3z = 11 E5
–3y – 3z = –9
+) 4y + 3z = 11
y+0 = 2
y= 2
2+z=3 z=1
x + 2(2) + 2(1) = 8
x+6 =8

with two unknowns:
E4
{ –y–z =–3
–4y – 3z = –11
(-1)
{ y +z = 3
4y + 3z = 11 E5
–3y – 3z = –9
+) 4y + 3z = 11
y+0 = 2
y= 2
2+z=3 z=1
x + 2(2) + 2(1) = 8
x+6 =8
x=2

with two unknowns:
E4
{ –y–z =–3
–4y – 3z = –11
(-1)
{ y +z = 3
4y + 3z = 11 E5
–3y – 3z = –9
+) 4y + 3z = 11
y+0 = 2
y= 2
2+z=3 z=1
x + 2(2) + 2(1) = 8
x+6 =8
x=2
Hence the solution is (2, 2, 1).

4.4 system of linear equations 2

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