Answer to Question #258813 in Linear Algebra for Bere

Question #258813

Let W={(X,Y,Z)|x+y+z=0}

A, give a basis for W

B, what is the dimension of W

Expert's answer

Part A

"x+y+z=0\\>"

"\\implies\\>x=-y-z"

"\\begin{pmatrix}\n -y&-z \\\\\n y \\\\\nz\n\\end{pmatrix}" ="y\\begin{pmatrix}\n -1 \\\\\n 1 \\\\\n0\n\\end{pmatrix}" +"z\\begin{pmatrix}\n -1 \\\\\n 0\\\\\n1\n\\end{pmatrix}"

rref of "\\begin{pmatrix}\n -1 & -1 \\\\\n 1 & 0\\\\\n0&1\n\\end{pmatrix}" ="\\begin{pmatrix}\n 1& 0 \\\\\n 0 & 1\\\\\n0&0\n\\end{pmatrix}"

Basis are ["\\begin{pmatrix}\n -1 \\\\\n 1\\\\\n0\n\\end{pmatrix}" , "\\begin{pmatrix}\n -1 \\\\\n 0\\\\\n1\n\\end{pmatrix}" ]

Part 2

Number of linearly independent columns in "W" is 2

"\\therefore" The dimension of W =2

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Answer to Question #258813 in Linear Algebra for Bere

Let W={(X,Y,Z)|x+y+z=0}

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