If ("log"(a)x)/("log"(ab)x) = 4 + k + "l...

If `("log"_(a)x)/("log"_(ab)x) = 4 + k + "log"_(a)b, "then" k=`

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

If "log"_(a) ab = x, then the value of "log"_(b)ab, is

If "log"_(a) ab = x, then the value of "log"_(b)ab, is

Prove that : (viii) (log_(a)x)/(log_(ab)x) = 1+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 logx= ((log_(a)x)/(log_(a)x))^(k) , then k =______

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