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प्रश्न
If a, b, c are pth, qth and rth terms respectively of a G.P., then prove that
`|(log a, p, 1),(log b, q, 1),(log c, r, 1)| = 0`
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उत्तर
Suppose A is the first term and R is the common ratio of the G.P.
Then, a = ARp – 1 ...(i)
b = ARq – 1 ...(ii)
c = ARr – 1 ...(iii)
From (i), (ii) and (iii)
log a = log A + (p – 1) log R
log b = log A + (q – 1) log R
log c = log A + (r – 1) log R
∴ `|(loga, p, 1),(logb, q, 1),(logc, r, 1)| = |(log A + (p - 1) log R, p, 1),(log A + (q - 1) log R, q, 1),(log A + (r - 1) log R, r, 1)|`
= `|(log A + (p - 1) log R, p - 1, 1),(log A + (q - 1) log R, q - 1, 1),(log A + (r - 1) log R, r - 1, 1)|` ...[Applying C2 → C2 – C3]
= `|(0, p - 1, 1),(0, q - 1, 1),(0, r - 1, 1)|` ...[Applying C1 → C1 – logA C3 – logR C2]
⇒ `|(loga, p, 1),(logb, q, 1),(logc, r, 1)| = 0`
Hence Proved.
