Let `agt0,cgt0,b=sqrtac,a,c` and `acne1,Ngt0`.
Prove that `log_aN/log_cN=(log_aN-log_bN)/(log_bN-log_cN)`

Prove that: (log_(a)(log_(b)a))/(log_(b)(log_(a)b))=-log_(a)b

Prove that ((log)_(a)N)/((log)_(ab)N)=1+(log)_(a)b

If a gt 0, c gt 0 , " b " = sqrt(ac) and " ac " ne 1 , N gt 0 , then (log_(a) N - log_(b) N)/(log_(b) N - log_(c) N) =

Prove that log_(4)log_(2){log_(2)(log_(3)81)}]=0

Prove that log_(4)[log_(2){log_(2)(log_(3)81)}]=0

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

if quad 0,c>0,b=sqrt(a)c,a!=1,c!=1,ac!=1a and n>0 then the value of (log_(a)n-log_(b)n)/(log_(b)n-log_(c)n) is equal to

Show that log a+log(1/a)=0

Show that log_(b)a log_(c)b log_(a)c=1

(1+log_(c)a)log_(a)x*log_(b)c=log_(b)x log_(a)x