If m,a,b gt0 ; a!=1; b!=1; then loga (m)...

If `m,a,b gt0 ; a!=1; b!=1`; then `log_a (m) =(log_b (m))/(log_b (a))`

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If m;a;b>0;a!=1;b!=1; then log_(a)(m)=(log_(b)(m))/(log_(b)(a))

STATEMENT -1 : If f(x) = log_(x^(2)) (log x) , " then" f'( e) = 1/e STATEMENT -2 : If a gt 0 , b gt 0 and a ne b then log_(a) b = (log b)/(log a)

STATEMENT -1 : If f(x) = log_(x^(2)) (log x) , " then" f'( e) = 1/e STATEMENT -2 : If a gt 0 , b gt 0 and a ne b then log_(a) b = (log b)/(log a)

(a^(log_b x))^2-5x^(log_b a)+6=0

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m;n;a>0;a!=1;log_(a)((m)/(n))=log_(a)m-log_(a)n

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