This browser is totally bloody useless for mathematical display but...
The probability function of the binomial distribution is P(X = r) = (nCr)*p^r*(1-p)^(n-r) where nCr =n!/[r!(n-r)!]
Let n -> infinity while np = L, a constant, so that p = L/n
then
P(X = r) = lim as n -> infinity of n*(n-1)*...*(n-k+1)/r! * (L/n)^r * (1 - L/n)^(n-r)
= lim as n -> infinity of {n^r - O[(n)^(k-1)]}/r! * (L^r/n^r) * (1 - L/n)^(n-r)
= lim as n -> infinity of 1/r! * (L^r) * (1 - L/n)^(n-r) (cancelling out n^r and removing O(n)^(r-1) as being insignificantly smaller than the denominator, n^r)
= lim as n -> infinity of (L^r) / r! * (1 - L/n)^(n-r)
Now lim n -> infinity of (1 - L/n)^n = e^(-L)
and lim n -> infinity of (1 - L/n)^r = lim (1 - 0)^r = 1
lim as n -> infinity of (1 - L/n)^(n-r) = e^(-L)
So P(X = r) = L^r * e^(-L)/r! which is the probability function of the Poisson distribution with parameter L.