If `log_(l)x,log_(m)x` and `log_(n)x` are in arithmetic progression show that , `log n^(2) = log (ln) log_(l)m`

If log_(l)x,log_(m)x,log_(n)x are in arithmetic progression and x!=1, then n^(2) is :

If log_(3)2,log_(3)(2^(x)-5),log_(3)(2^(x)-7/2) are in arithmetic progression, then the value of x is equal to

If log_(l)p, log_(m)p and log_(n)p are in AP, then (ln)^(log_(l)m) = ______.

If (log)_3 2,(log)_3(2^x-5) and (log)_3(2^x-7/2) are in arithmetic progression, determine the value of xdot

If log_(3)2,log_(3)(2^(x)-5) and log_(3)(2^(x)-(7)/(2)) are in arithmetic progression,determine the value of x.

If log_(3)2,log_(3)(2^(x)-5) and log_(3)(2^(x)-(7)/(2)) are in arithmetic progression,determine the value of x.(1991,4M)

If log 3,log(3^(x)-2) and backslash log(3^(x)+4) are in arithmetic progression,the x is equal to a.(8)/(3) b.log3^(8) c.8d. log 2^(3)

If (log)_3 2,(log)_3(2^x-5)a n d(log)_3(2^x-7/2) are in arithmetic progression, determine the value of xdot