Question #8e58a

1 Answer
sente
Nov 26, 2016

lim_(n->oo)(1+1/n)^(2n)=e^2

Explanation:

Using the limit definition of e:

One way to define e is as e:=lim_(n->oo)(1+1/n)^n

Using this definition, we have

lim_(n->oo)(1+1/n)^(2n) = lim_(n->oo)((1+1/n)^n)^2

=(lim_(n->oo)(1+1/n)^n)^2

(The above step follows from f(x)=x^2 being continuous)

=e^2

Using logarithms and L'Hopital's rule

lim_(n->oo)(1+1/n)^(2n) = lim_(n->oo)e^(ln((1+1/n)^(2n)))

=lim_(n->oo)e^(2nln(1+1/n))

=e^(lim_(n->oo)2nln(1+1/n))

(The above step follows from f(x) = e^x being continuous)

lim_(n->oo)2nln(1+1/n) = lim_(n->oo)(2ln(1+1/n))/(1/n)

=lim_(n->oo)(d/(dn)2ln(1+1/n))/(d/(dn)1/n)

*(The above step follows from L'Hopital's rule. While it does not technically apply to discrete sequences, we could consider the continuous analog and apply L'Hopital's rule to get the same result.)

=lim_(n->oo)(2/(1+1/n)(-1/n^2))/(-1/n^2)

=lim_(n->oo)2/(1+1/n)

=2/(1+0)

=2

:. lim_(n->oo)(1+1/n)^(2n) = e^(lim_(n->oo)2nln(1+1/n))

=e^2

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