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Question
Using properties of determinants, show that `|(x, p, q),(p, x, q),(q, q, x)| = (x - p)(x^2 + px - 2q)^2`
Sum
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Solution
To prove:
`|(x, p, q),(p, x, q),(q, q, x)| = (x - p)(x^2 + px - 2q^2)`
Let Δ = LHS = `|(x, p, q),(p, x, q),(q, q, x)|`
Applying C1 → C1 – C2, we get
`Δ = |(x - p, p, q),(p - x, x, q),(q - q, q, x)|`
Taking (x – p) as common from C1, we get
`Δ = (x - p) |(1, p, q),(-1, x, q),(0, q, x)|`
Now, expanding along R1, we get
Δ = (x – p) [1(x2 – q2) – p(–x – 0) + q(–q – 0)]
= (x – p) (x2 – q2 + px – q2)
= (x – p) (x2 + px – 2q2)
= RHS.
Hence Proved.
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