(i) Using Cayley Hamilton theorem, find π΄
8 β π΄
7 + 5π΄
6 β π΄
5 + π΄
4 β π΄
3 + 6π΄
2 +
π΄ β 2πΌ ππ [
1 2 β2
2 5 β4
3 7 β5
]
Given matrix is "A = \\begin{bmatrix}\n 2 & 1 & 1 \\\\\n 0 & 1 & 0 \\\\\n 1 & 1 & 2\n\\end{bmatrix}"
Then according to Cayley Hamilton theorem,
"|A - \\lambda I| = 0"
So we will have,
"A - \\lambda I = \\begin{bmatrix}\n 2 & 1 & 1 \\\\\n 0 & 1 & 0 \\\\\n 1 & 1 & 2\n\\end{bmatrix} - \\lambda\\begin{bmatrix}\n 1 & 0 & 0 \\\\\n 0 & 1 & 0 \\\\\n 0 & 0 & 1\n\\end{bmatrix}"
"|A - \\lambda I| = \\begin{vmatrix}\n 2-\\lambda & 1 & 1 \\\\\n 0 & 1-\\lambda & 0 \\\\\n 1 & 1 & 2-\\lambda\n\\end{vmatrix} = 0"
Then equation will be
"\\lambda^3 - 5\\lambda ^2+7\\lambda -3=0"
According to Cayley Hamilton theorem,
Every matrix is the root of it's eigen matrix.
then, "A^3 - 5A^2+7A -3=0" (1)
Given equation is "A^8 \u2212 5A^7 + 7A^6 \u2212 3A^5 + A^4 \u2212 5A^3 + 8A^2 \u2212 2A + I"
This equation can be written as,
"A^8 \u2212 5A^7 + 7A^6 \u2212 3A^5 + A^4 \u2212 5A^3 + 8A^2 \u2212 2A + I = (A^3 - 5A^2+7A -3)(A^5+A) + (A^2+A+I)"
From equation (1), above equation will be modified as,
"A^8 \u2212 5A^7 + 7A^6 \u2212 3A^5 + A^4 \u2212 5A^3 + 8A^2 \u2212 2A + I = A^2+A+I"
So putting value of "A^2,A,I"
we will get,
"A^8 \u2212 5A^7 + 7A^6 \u2212 3A^5 + A^4 \u2212 5A^3 + 8A^2 \u2212 2A + I"
"= \\begin{bmatrix}\n 5 & 4 & 4 \\\\\n 0 & 1 & 0 \\\\\n 4 & 4 & 5\n\\end{bmatrix} + \\begin{bmatrix}\n 2 & 1 & 1 \\\\\n 0 & 1 & 0 \\\\\n 1 & 1 & 2\n\\end{bmatrix} + \\begin{bmatrix}\n 1 & 0 & 0 \\\\\n 0 & 1 & 0 \\\\\n 0 & 0 & 1\n\\end{bmatrix} = \\begin{bmatrix}8&5&5\\\\ 0&3&0\\\\ 5&5&8\\end{bmatrix}"
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