If the triplets log a, log b, log c and ...

If the triplets `log a, log b, log c and (log a-log 2b), (log 2b-log 3c),(log 3c-log a)` are in arithmetic progression then

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If the triplets log a,log b,log c and (log a-log2b),(log2b-log3c),(log3c-log a) are in arithmetic progression then

a,b,c are sides of a triangle and a,b,c are in GP log a-log2b,log2b-log3c and log3c-log a are in AP then

a, b, c are sides of a triangle and a, b, c are in GP If log a- log 2b, log 2b-log 3c and log 3c-log a are in AP then

a, b, c are sides of a triangle and a, b, c are in GP If log a- log 2b, log 2b-log 3c and log 3c-log a are in AP then

The sides a, b, c of Delta ABC are in G.P, and loga -log 2b, log 2b- log 3c, log 3c- log a are in A.P., then DeltaABC is

a^(log b-log c)*b^(log c-log a)*c^(log a-log b) has a value of :

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