27354 is a number whose sum of digits about its centre point is the same, here 9. See Bespoken for Sequences entry. This number also has the property that the middle digit is equal to the arithmetic digital root of 5. There are 270 five digit numbers with this property (in the range up to 40,000). They can be found as follows (permalink):

INPUT

L=[]

for n in [10..40000]:

  D=n.digits()

  left,right=0,0

  if len(D)%2==0:

    for i in range(len(D)/2):

      left+=D[i]

      right+=D[i+len(D)/2]

    if left==right:

      L.append(n)

  if len(D)%2==1:

    for i in range((len(D)-1)/2):

      left+=D[i]

      right+=D[i+(len(D)+1)/2]

    if left==right:

      L.append(n)

M=[]

for n in L:

  middle=0

  if len(str(n))==5:

    D=n.digits()

    middle=D[2]

  if middle != 0:

    b=10

    if sum(n.digits(b))%(b-1)!=0:

      dr=sum(n.digits())%(b-1)

    else:

      dr=9

    if middle==dr:

      M.append(n)

print(M)

print(len(M))

OUTPUT

[18109, 18118, 18127, 18136, 18145, 18154, 18163, 18172, 18181, 18190, 18209, 18218, 18227, 18236, 18245, 18254, 18263, 18272, 18281, 18290, 18309, 18318, 18327, 18336, 18345, 18354, 18363, 18372, 18381, 18390, 18409, 18418, 18427, 18436, 18445, 18454, 18463, 18472, 18481, 18490, 18509, 18518, 18527, 18536, 18545, 18554, 18563, 18572, 18581, 18590, 18609, 18618, 18627, 18636, 18645, 18654, 18663, 18672, 18681, 18690, 18709, 18718, 18727, 18736, 18745, 18754, 18763, 18772, 18781, 18790, 18809, 18818, 18827, 18836, 18845, 18854, 18863, 18872, 18881, 18890, 18909, 18918, 18927, 18936, 18945, 18954, 18963, 18972, 18981, 18990, 27109, 27118, 27127, 27136, 27145, 27154, 27163, 27172, 27181, 27190, 27209, 27218, 27227, 27236, 27245, 27254, 27263, 27272, 27281, 27290, 27309, 27318, 27327, 27336, 27345, 27354, 27363, 27372, 27381, 27390, 27409, 27418, 27427, 27436, 27445, 27454, 27463, 27472, 27481, 27490, 27509, 27518, 27527, 27536, 27545, 27554, 27563, 27572, 27581, 27590, 27609, 27618, 27627, 27636, 27645, 27654, 27663, 27672, 27681, 27690, 27709, 27718, 27727, 27736, 27745, 27754, 27763, 27772, 27781, 27790, 27809, 27818, 27827, 27836, 27845, 27854, 27863, 27872, 27881, 27890, 27909, 27918, 27927, 27936, 27945, 27954, 27963, 27972, 27981, 27990, 36109, 36118, 36127, 36136, 36145, 36154, 36163, 36172, 36181, 36190, 36209, 36218, 36227, 36236, 36245, 36254, 36263, 36272, 36281, 36290, 36309, 36318, 36327, 36336, 36345, 36354, 36363, 36372, 36381, 36390, 36409, 36418, 36427, 36436, 36445, 36454, 36463, 36472, 36481, 36490, 36509, 36518, 36527, 36536, 36545, 36554, 36563, 36572, 36581, 36590, 36609, 36618, 36627, 36636, 36645, 36654, 36663, 36672, 36681, 36690, 36709, 36718, 36727, 36736, 36745, 36754, 36763, 36772, 36781, 36790, 36809, 36818, 36827, 36836, 36845, 36854, 36863, 36872, 36881, 36890, 36909, 36918, 36927, 36936, 36945, 36954, 36963, 36972, 36981, 36990]

270

27354 is a happy, Curzon, self, untouchable, congruent, abundant, Zumkeller and pseudoperfect number.

27354 quickly stabilises to a boat, a block and a blinker after a little over 45 generations of Conway's Game of Life.