" (iii) "lim(x rarr e)(log x-1)/(x-e)=(1...

" (iii) "lim_(x rarr e)(log x-1)/(x-e)=(1)/(e)

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Lim_(x rarre)(log x-1)/(x-e)=

lim_ (x rarr e) (ln x-1) / (xe)

Prove that: lim_(x rarr e) (log-1)/(x-e)=(1)/(e)

Evaluate: (lim)_(x rarr e)(log x-1)/(x-e)

lim_(x rarr e^+)(lnx)^(1/(x-e)) is

lim_(xrarre) (log_(e)x-1)/(|x-e|) is

lim_(xrarre) (log_(e)x-1)/(|x-e|) is

lim_(x rarr0)(log_(e)(1+x))/(x)

the value of lim_(x rarr e)(log x-1)/(x-e) equals to

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