Answer to Question #256860 in Linear Algebra for sagun poudel

Question #256860

Solve the system of equations 2x + y + 5z = 18 5x + 3y – 2z = 2 x – 6y + 2z = 1 using Gauss elimination method with partial pivoting. Show all the steps.

Expert's answer

"\\begin{pmatrix}\n 2 & 1 & 5 \\\\\n 5 & 3 & -2 \\\\\n 1 & -6 & 2 \\\\\n\\end{pmatrix}\\begin{pmatrix}\n x \\\\\n y \\\\\n z\\\\\n\\end{pmatrix}=\\begin{pmatrix}\n 18 \\\\\n 2 \\\\\n 1 \\\\\n\\end{pmatrix}"

Augmented matrix

"\\begin{pmatrix}\n 2 & 1 & 5 & & 18 \\\\\n 5 & 3 & -2 & & 2 \\\\\n 1 & -6 & 2 & & 1 \\\\\n\\end{pmatrix}"

"R_1\\leftrightarrow R_2"

"\\begin{pmatrix}\n 5 & 3 & -2 & & 2 \\\\\n 2 & 1 &5 & & 18 \\\\\n 1 & -6 & 2 & & 1 \\\\\n\\end{pmatrix}"

"R_2=R_2-2R_1\/5"

"\\begin{pmatrix}\n 5 & 3 & -2 & & 2 \\\\\n 0 & -1\/5 & 29\/5 & & 86\/5\\\\\n 1 & -6 & 2 & & 1 \\\\\n\\end{pmatrix}"

"R_3=R_3-R_1\/5"

"\\begin{pmatrix}\n 5 & 3 & -2 & & 2 \\\\\n 0 & -1\/5 & 29\/5 & & 86\/5\\\\\n 0 & -33\/5 & 12\/5 & & 3\/5 \\\\\n\\end{pmatrix}"

"R_3=R_3-33R_2"

"\\begin{pmatrix}\n 5 & 3 & -2 & & 2 \\\\\n 0 & -1\/5 & 29\/5 & & 86\/5\\\\\n 0 & 0 & -189 & & -567 \\\\\n\\end{pmatrix}"

Back Substitute

"5x+3y-2z=2"

"-\\dfrac{1}{5}y+\\dfrac{29}{5}z=\\dfrac{86}{5}"

"-189z=-567"

"5x+3y-2(3)=2"

"-y+29(3)=86"

"z=3"

"5x+3(1)-6=2"

"y=1"

"z=3"

"x=1"

"y=1"

"z=3"

"(1,1,3)"

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Answer to Question #256860 in Linear Algebra for sagun poudel

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