4. Prove that `log_a (bc) .log_b (ca). log_c (ab) = 2 + log_a (bc) + log_b (ca) + log_c (ab)`.

Prove that log_a (ab)+log_b (ab)=log_a (ab).log_b (ab)

Prove that (log a)^2-(log b)^2=log (ab) log(a/b)

Prove that: (log_a(log_ba))/(log_b(log_ab))=-log_ab

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

Prove the following identities: (a) (log_(a) n)/(log_(ab) n) = 1+ log_(a) b" "(b) log_(ab) x = (log_(a) x log_(b) x)/(log_(a) x + log_(b) x) .

Prove the following identities: (a) (log_(a) n)/(log_(ab) n) = 1+ log_(a) b" "(b) log_(ab) x = (log_(a) x log_(b) x)/(log_(a) x + log_(b) x) .

Prove the following identities: (a) (log_(a) n)/(log_(ab) n) = 1+ log_(a) b" "(b) log_(ab) x = (log_(a) x log_(b) x)/(log_(a) x + log_(b) x) .

Prove the following identities: (a) (log_(a) n)/(log_(ab) n) = 1+ log_(a) b" "(b) log_(ab) x = (log_(a) x log_(b) x)/(log_(a) x + log_(b) x) .

The value of log(ab)^(2) - log(ac) + log(bc^(4)) - 3 log (bc) is:

The value of (bc)^log(b/c)*(ca)^log(c/a)*(ab)^log(a/b) is