How do you solve using gaussian elimination or gauss-jordan elimination, #3x - 3y + z = -5#, #-2x+7y= 15#, #3x + 2y + z = 0#?

1 Answer
Alan P.
Jun 1, 2016

#(x,y,z)=(-4,1,10)#

Explanation:

Initial Augmented Matrix:
#[ ( 3.00, -3.00, 1.00, -5.00), ( -2.00, 7.00, 0.00, 15.00), ( 3.00, 2.00, 1.00, 0.00) ]#

Pivot Action #n#
pivot row = n; pivot column = n; pivot entry augmented matrix entry at (n,n)

1. convert pivot n row so pivot entry = 1
2. adjust non-pivot rows so entries in pivot column = 0

Pivot #color(black)(1)#
Pivot Row 1 reduced by dividing all entries by 3.00 so pivot entry = 1
#[ ( 1.00, -1.00, 0.33, -1.67), ( -2.00, 7.00, 0.00, 15.00), ( 3.00, 2.00, 1.00, 0.00) ]#

Non-pivot rows reduced for pivot column
by subtracting appropriate multiple of pivot row 1 from each non-pivot row

#[ ( 1.00, -1.00, 0.33, -1.67), ( 0.00, 5.00, 0.67, 11.67), ( 0.00, 5.00, 0.00, 5.00) ]#

Pivot #color(black)(2)#
Pivot Row 2 reduced by dividing all entries by 5.00 so pivot entry = 1
#[ ( 1.00, -1.00, 0.33, -1.67), ( 0.00, 1.00, 0.13, 2.33), ( 0.00, 5.00, 0.00, 5.00) ]#

Non-pivot rows reduced for pivot column
by subtracting appropriate multiple of pivot row 2 from each non-pivot row

#[ ( 1.00, 0.00, 0.47, 0.67), ( 0.00, 1.00, 0.13, 2.33), ( 0.00, 0.00, -0.67, -6.67) ]#

Pivot #color(black)(3)#
Pivot Row 3 reduced by dividing all entries by -0.67 so pivot entry = 1
#[ ( 1.00, 0.00, 0.47, 0.67), ( 0.00, 1.00, 0.13, 2.33), ( 0.00, 0.00, 1.00, 10.00) ]#

Non-pivot rows reduced for pivot column
by subtracting appropriate multiple of pivot row 3 from each non-pivot row

#[ ( 1.00, 0.00, 0.00, -4.00), ( 0.00, 1.00, 0.00, 1.00), ( 0.00, 0.00, 1.00, 10.00) ]#

Related questions
See all questions in Gaussian Elimination
Impact of this question
1102 views around the world
You can reuse this answer
Creative Commons License