like this, (using a crafting table made like this l (using the same key as for the trapdoor)) WW <------------------------------------l WW N N N WWW WWW W= Wood N= Nothing
ENHALOHAOLEHALONHOLLAHELLOHALLOHALLHONEHAENHALEHALOHOLEHELOHEALHELLHAENAHHAOHOEHONNOHHENANOLEALONEHAHEHOAHOHEHLLANOLEANLOANLENOLANELEALALOELONEELANENOLAEONNOELOLEAOLLANAELEAONEOLEEONALLALEELLANENENALOONOENOANALAELAENEL
England!
glen can be one using G L N E. pen can be another using N E P. But if you want to know what word you can make using ALL of the letters then I have no clue.
L. N Sankar has written: 'Studies of unsteady viscous flows using a two-equation model of turbulence'
Using all of the letters: online, El Nino.
learn
l o k n n r z: lo no non nor kor or lorn zonk
plant
airline
In Chinese, the letters D, L, N do not exist as individual symbols. They would be written using the corresponding Pinyin sounds, such as "dí" for D, "lí" for L, and "nǚ" for N.
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/nthenP(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 = 1lim 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.