" 5.Prove that "log_(" ab ")x=(log_(a)x*log_(b)x)/(log_(a)x+log_(b)x)

Prove that log_(a)xy=log_(a)x+log_(a)y.

Prove that m^(log_(a)x)=x^(log_(a)m)

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) .

Prove that: log_(a)x xx log_(b)y=log_(b)x xx log_(a)y

Prove that (log_ab x)/(log_a x)=1+log_x b

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

Prove that log_a x+log_(1/a) x=0