lim_(x rarr0)(e^(3x)-1)/(2x)

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find the the value of lim_(x rarr 0) (e^(3x)-1)/(2x) and lim_(x rarr 0) log(1+4x)/(3x)

The value of lim_(x rarr0)(e^(x)-1)/(x) is-

Using lim_(x rarr 0) (e^(x)-1)/(x)=1, deduce that, lim_(x rarr 0) (a^(x)-1)/(x)=log_(e)a [agt0].

Evaluate : lim_(x rarr0)(a^(2x)-1)/(x)

lim_(x rarr0)((e^(x)-x-1)/(x))

The value of lim_(x rarr 0) ((e^(x)-1)/x)

lim_(x rarr0)((a^(x)-1)/(x))=log_(e)a

lim_(x rarr0)((e^(3x)-e^(2x))/(x))

lim_(x rarr0)(2^(2x)-1)/(x)

Prove quad that quad (i) lim_(x rarr0)(a^(x)-1)/(x)=log_(e)aquad (ii) lim_(x rarr0)(log_(1+x))/(x)=1