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प्रश्न
If a , b , c are respectively the pth, qth and rth terms of a G . P show that (q – r) log a + (r – p) log b + (p – q) log c = 0
उत्तर
Let A be first term and R be the common ratio of the G.P.
Given a = pth term of the G.P
General term of a G. P with first term A and common ratio R is tn = ARn – 1
∴ a = tp = ARP – 1
log a = log ARp-1
= log A + log Rp-1
= log A + (p – 1) log R
b = qth term of the G.P
b = tq = ARq-1
log b = log ARq-1
= log A + log Rq-1
= log A + (q – r)log R
c = rth term of the G.P
c = tr = ARr-1
log c = log ARr-1
= log A + log Rr-1
= log A + (r – 1) log R
(q – r) log a + (r – p) log b + (p – q) log c
= (q – r) [log A + (p – 1) log R] + (r – p) [ log A + (q – 1) log R] + (P – q) [log A + (r – 1) log R]
= (q – r) log A + (q – r) (p – 1) log R + (r – p) log A + (r – p) (q – 1) log R + (P – q) log A + (p – q) (r – 1) log R
= [q – r + r – p + p – q] log A + [(q – r) (p – 1) + (r – p) (q – 1) + (p – q)(r – 1)] log R
= 0 × log A + [pq – q – rp + r + rq – r – pq + p + pr – p – rq + q] log R
= 0 × log R
= 0
∴ (q – r) log a + (r – p) log b + (p – q) log c = 0
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