Math, asked by kirtidarsanbehera, 4 months ago

3x+4y+5z=130
10x+2y+2z=85

Answers

Answered by nehac7101
30

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Answered by saradaditi
0

Solve the system of linear equations using matrices.

x

y

+

z

=

8

2

x

+

3

y

z

=

2

3

x

2

y

9

z

=

9

SOLUTION

First, we write the augmented matrix.

1

1

1

2

3

1

3

2

9

|

8

2

9

Next, we perform row operations to obtain row-echelon form.

2

R

1

+

R

2

=

R

2

1

1

1

0

5

3

3

2

9

|

8

18

9

3

R

1

+

R

3

=

R

3

1

1

1

0

5

3

0

1

12

|

8

18

15

The easiest way to obtain a 1 in row 2 of column 1 is to interchange \displaystyle {R}_{2}R

2

and \displaystyle {R}_{3}R

3

.

Interchange

R

2

and

R

3

1

1

1

8

0

1

12

15

0

5

3

18

Then

5

R

2

+

R

3

=

R

3

1

1

1

0

1

12

0

0

57

|

8

15

57

1

57

R

3

=

R

3

1

1

1

0

1

12

0

0

1

|

8

15

1

The last matrix represents the equivalent system.

x

y

+

z

=

8

y

12

z

=

15

z

=

1

Using back-substitution, we obtain the solution as \displaystyle \left(4,-3,1\right)(4,−3,1).

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