" (i) "(log_(a)x)/(log_(ab)x)=1+log_(a)b

The value of (log_(a)(x))/(log_(ab)x)-log_(a)b

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) .

If (log_(a)x)/(log_(ab)x)=4+k+log_(a)b then k=

Prove that log_(ab)(x)=((log_(a)(x))(log_(b)(x)))/(log_(a)(x)+log_(b)(x))

If a,b,c are in GP then 1/(log_(a)x), 1/(log_(b)x), 1/(log_( c)x) are in:

If (1)/(log_(a)x) + (1)/(log_(b)x) = (2)/(log_(c)x) , prove that : c^(2) = ab .