Prove that `"log"_(a^(2))a " log"_(b^(2)) b" log_(c^(2))c = (1)/(8)`.

Prove "log"(a^(2))/(bc) + "log"(b^(2))/(ca) + "log"(c^(2))/(ab) = 0 .

Prove log ( a^(2))/(ba) + log((b^(2))/(ab))=0

The value of "log"_(a) b "log"_(b)c "log"_(c ) a is

Prove log_(b)b = 1

solve : "log"_(4) 2^(8x) = 2^("log"_(2)^(8))

Prove log a + log a^(2) + "log" a^(3) +……..+ log a^(n) = (n (n + 1))/(2) log a

Prove that log_(4)2-log_(8)2+log_(6)2..."is"1-log_(e)2.

Prove that "log" 2 + 16 "log" (16)/(15) + 12 "log " (25)/(24) + 7 "log"(81)/(80) = 1 .

If b >1,sint >0,cost >0a n d(log)_b(sint)=x ,t h e n(log)_b(cost) is equal to (a) 1/2(log)_b(1-b^(2x)) (b) 2log(1-b^(x/2)) (log)_bsqrt(1-b^(2x)) (d) sqrt(1-x^2)

There are 3 number a, b and c such that log_(10) a = 5.71, log_(10) b = 6.23 and log_(10) c = 7.89 . Find the number of digits before dicimal in (ab^(2))/c .