Question

If A = `[(4,5),(2,1)]`, show that `"A"^-1 = 1/6("A" - 5"I")`.

Answer 1

|A| = `|(4,5),(2,1)|` = 4 − 10 = − 6 ≠ 0

∴ A⁻¹ exists.

Consider AA⁻¹ = I

∴ `[(4,5),(2,1)] "A"^-1 = [(1,0),(0,1)]`

By `(1/4)"R"_1`, we get,

`[(1,5/4),(2,1)] "A"^-1 = [(1/4,0),(0,1)]`

By R₂ − 2R₁ we get,

`[(1,5/4),(0,-3/2)] "A"^-1 = [(1/4,0),(-1/2,1)]`

By `(- 2/3)"R"_2,` we get,

`[(1,5/4),(0,1)] "A"^-1 = [(1/4,0),(1/3,-2/3)]`

By `"R"_1 - 5/4  "R"_2,` we get,

`[(1,0),(0,1)] "A"^-1 = [(-1/6,5/6),(1/3,-2/3)]`

∴ A^−1 = `1/6[(-1,5),(2,-4)]`    ....(1)

`1/6("A" - 5"I") = 1/6{[(4,5),(2,1)] - 5 [(1,0),(0,1)]}`

`= 1/6 {[(4,5),(2,1)] - [(5,0),(0,5)]}`

`= 1/6 [(-1,5),(2,-4)]`     ....(2)

From (1) and (2), we get `"A"^-1 = 1/6 ("A" - "5I")`