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Question
Answer the following question:
Find minor and cofactor of elements of the determinant:
`|(1, -1, 2),(3, 0, -2),(1, 0, 3)|`
Solution
Here, `|("a"_11, "a"_12, "a"_13),("a"_21, "a"_22, "a"_23),("a"_31, "a"_32, "a"_33)| = |(1, -1, 2),(3, 0, -2),(1, 0, 3)|`
M11 = `|(0, -2),(0, 3)|` = 0 − 0 = 0
∴ C11 = (– 1)1+1 M11 = 1(0) = 0
M12 = `|(3, -2),(1, 3)|` = 9 + 2 = 11
∴ C12 = (– 1)1+2 M12 = (– 1)(11) = −11
M13 = `|(3, 0),(1, 0)|` = 0 – 0 = 0
∴ C13 = (– 1)1+3 M13 = 1(0) = 0
M21 = `|(-1, 2),(0, 3)|` = −3 − 0 = −3
∴ C21 = (–1)2+1 M21 = (–1)(−3) = 3
M22 = `|(1, 2),(1, 3)|` = 3 – 2 = 1
∴ C22 = (–1)2+2 M22 = 1(1) = 1
M23 = `|(1, -1),(1, 0)|` = 0 + 1 = 1
∴ C23 = (–1)2+3 M23 = (–1)(1) = –1
M31 = `|(-1, 2),(0, -2)|` = 2 – 0 = 2
∴ C31 = (–1)3+1 M31 = 1(2) = 2
M32 = `|(1, 2),(3, -2)|` = –2 − 6 = −8
∴ C32 = (–1)3+2 M32 = (–1)(−8) = 8
M33 = `|(1, -1),(3, 0)|` = 0 + 3 = 3
∴ C33 = (–1)3+3 M33 = 1(3) = 3
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