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nth Term of A.P

Question

If the pth, qth and rth terms of an A.P. be a, b and c respectively, then prove that $a (q - r) + b (r - p) + c (p - q) = 0$ .

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Solution

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Let A be the first term and D the common difference of A.P.
$T_{p} = a = A + (p - 1) D = (A - D) + p D$ $(1)$
$T_{q} = b = A + (q - 1) D = (A - D) + q D$ .. $(2)$
$T_{r} = c = A + (r - 1) D = (A - D) + r D$ .. $(3)$
Here we have got two unknowns A and D which are to be eliminated.
We multiply $(1), (2)$ and $(3)$ by $q - r, r - p$ and $p - q$ respectively and add:
$a (q - r) + b (r - p) + c (p - q)$
$= (A - D) [q - r + r - p + p - q] + D [p (q - r) + q (r - p) + r (p - q)] = 0$ .

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