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Question
Solve the following equations by inversion method:
x + y = 4, 2x - y = 5
Solution
x + y = 4, 2x - y = 5
The given equations can be written in the matrix form as:
`[(1,1),(2,-1)] [("x"),("y")] = [(4),(5)]`
This is of the form AX = B,
Where A = `[(1,1),(2,-1)]`, X = `[("x"),("y")]` and B = `[(4),(5)]`
To determine X, we have to find A−1.
|A| = `|(1,1),(2,-1)|` = −1 − 2 = −3 ≠ 0
∴ A−1 exists.
Consider AA−1 = I
∴ `[(1,1),(2,-1)] "A"^(-1) = [(1,0),(0,1)]`
Applying R2 `->` R2 − 2R1, we get
`[(1,1),(0,-3)] "A"^(-1) = [(1,0),(-2,1)]`
Applying `"R"_2 -> |-1/3|"R"_2`, we get
`[(1,1),(0,1)] "A"^(-1) = [(1,0),(2/3,-1/3)]`
Applying R1 `->` R1 − R2, we get
`[(1,0),(0,1)] "A"^(-1) = [(1/3,1/3),(2/3,-1/3)]`
∴ A−1 = `1/3 [(1,1),(2,-1)]`
Pre-multiplying AX = B by A−1, we get
A−1(AX) = A−1B
∴ (A−1A)X = A−1B
∴ IX = A−1B
∴ X = A−1B
∴ X = `1/3[(1,1),(2,-1)] = [(4),(5)]`
∴ `[("x"),("y")] = 1/3[(4 + 5),(8 - 5)]`
= `1/3[(9),(3)]`
= `[(3),(1)]`
∴ By equality of matrices, we get
x = 3, y = 1
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