# Python combining sets and ranges of numbers from separate functions

``````def return_separate_numbers():
N = (int(input('how many draws? '))* 5)#change number to select number of draws
mains = []
for line in open('euromillion_2012.txt').readlines():# ask for value of N = draws to analyse
datafile = (line.strip().split('\t')[0].split(','))
for n in datafile:
mains.append(int(n))
mains = mains[:N]
separate_nums=[]
X = 0
while X <5:
N1 = mains[X::5]
separate_nums= separate_nums + N1
X = X + 1
return separate_nums

def divide_ranges():
N = (int(input('how many draws? '))* 5)#change number to select number of draws
#N = int(num_to_draws.get())
#N = (N * 5)
mains = []
for line in open('euromillion_2012.txt').readlines():# ask for value of N = draws to analyse
datafile = (line.strip().split('\t')[0].split(','))
for n in datafile:
mains.append(int(n))
mains = mains[:N]
return mains

# {{{ http://code.activestate.com/recipes/511478/ (r1)
import math
import functools
'''

Perform calculations on sets of numbers to return 25th, 50th and 75th centile.
Subract 25th from 75th centile to return interquartile range.
Add and subtract interquartile range from 50th ( median) centile to return
a range , correcting numbers below 1 to 1. This gives the range excluding
outliers
'''
# needs some thought to call percentile looping through the five sets instead of
# five identical routines as written here
def percentile():
mains = divide_ranges()
mode = ''
X = 0

while X < 5:

ranges = ''
N1 = mains[X::5]
N1.sort()

percent  = 0.50 # median
percent1 = 0.25 # 25th centile
percent2 = 0.75 # 75th centile
key = lambda x:x
header = ('  \t       ', '25th ', '\t50th ', '\t75th \t', 'range', '\n')
"""
Find the percentile of a list of values.

@parameter N - is a list of values. Note N MUST BE already sorted.
@parameter percent - a float value from 0.0 to 1.0.
@parameter key - optional key function to compute value from each element of N.

@return - the percentile of the values
"""

# median calculation
k = (len(N1)-1) * percent
f = math.floor(k)
c = math.ceil(k)
if f == c:
return key(N1[int(k)])
d0 = key(N1[int(f)]) * (c-k)
d1 = key(N1[int(c)]) * (k-f)
fifty = int(d0+d1)
# 25th percentile calculation
k1 = (len(N1)-1) * percent1
f1 = math.floor(k1)
c1 = math.ceil(k1)
if f1 == c1:
return key(N1[int(k1)])
d2 = key(N1[int(f1)]) * (c1-k1)
d3 = key(N1[int(c1)]) * (k1-f1)
twentyfive = int(d2+d3)
# 75th percentile calculation
k2 = (len(N1)-1) * percent2
f2 = math.floor(k2)
c2 = math.ceil(k2)
if f2 == c2:
return key(N1[int(k2)])
d4 = key(N1[int(f2)]) * (c2-k2)
d5 = key(N1[int(c2)]) * (k2-f2)

seventyfive =int(d4+d5)
# range calculation
upper= fifty+ int(seventyfive - twentyfive)# median plus interquartile difference
lower = fifty -int(seventyfive-twentyfive) # median plus interquartile difference
if lower < 1: # lower range cannot be below 1
lower = 1
else:
lower = lower

if upper > 50: # upper cannot exceed 50
upper = 50
else:
upper = upper

result=("%s%s%s \u200B %s\t%s\t%s\t%s%s%s%s" % ('position ',X + 1,':',twentyfive,fifty,seventyfive,lower, '-',upper, '\n'))
print(result)

X= X + 1
``````

I have a continuous battle to understand lists. My skull does not seem to be able to get the 'aha' moment. In this instance I am simply using a lottery number file to exercise upon in the format 1,2,3,4,5 tab 8,9 as the source. With the first routine I want to return numbers at position 1 in a set, position two etc to position 5 - at the moment it returns five sets concatenated into one. With the second routine with percentile I want to get a range for the separate sets of numbers. And then, which is not here I want to combine the sets of numbers with its range to form a final set of numbers. Is anyone willing to help please. Also the percentile routine only accepts even numbers. Any idea what I have done to create this problem? I am sure when I copied and modified the original, it accepted odd and even numbers. Thank you

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There's too much code here, and no easy-to-understand statement of the problem. Please cut it down to the minimal necessary, and then add exactly what you are currently seeing, and exactly what you want to see. –  Daniel Roseman Feb 1 '13 at 13:36
Fair enough. I shall attempt to resubmit something more comprehensible and clear. Sorry for this. –  user1478335 Feb 1 '13 at 14:25
From the long piece of code I get two outputs: –  user1478335 Feb 1 '13 at 17:13
From the long piece of code I get two outputs:if I say that I want to work with eight numbers from the first I get ([8 numbers from position 0],...[8 from position 5]). From the second I get the output of lower and upper range values in the format 1,19 new line etc for five ranges. I want to combine the numbers and their range.Numbering the returned numbers as L1 to L5, I am trying to use M = zip((range(lower,upper)) ,(L1,L2,L3,L4,L5)). Return gives me zip object at ID. With print I get five returned zip objects. How to combine the two outputs and get a sensible result? –  user1478335 Feb 1 '13 at 17:28