import random

for i in range(100):
    a = random.randint(1, 20)
    b = random.randint(1, 20)
    c = random.randint(1, 20)
    if ((a + b + c) % 2) == 0:
        print(str(a) + "," + str(b) + "," + str(c))

I tried this but I am not getting the desired output. I want it in a way that three random numbers are chosen between 1 and 20 such that their sum is always even. Here the programme prints only the outputs that are even it does not select the numbers in such a way. Hope you help me. Thanks!

3 Answers 3


How about checking if the sum first two (a, b) is even or odd, and then accordingly set c?

import random

for i in range(100):
    a = random.randint(1, 20)
    b = random.randint(1, 20)
    if (a + b) % 2 == 0:
      c = random.randint(1, 10) * 2
      c = random.randint(1, 10) * 2 - 1
    if ((a + b + c) % 2) == 0:
        print(str(a) + "," + str(b) + "," + str(c))
  • I think this code will never print the cases where c is 19. Also, the if condition checking (before printing) seems to be redundant. Oct 29, 2020 at 11:59
  • About the if, you are right, but I keep it to show that this is working, and c can be 19, I just tested it (changed the if to if c==19 and it printed 3 outputs).
    – Yuval.R
    Oct 29, 2020 at 12:04
  • Did you get c as 19 and at the same time the sum of a, b, and c added up to even total? Oct 29, 2020 at 12:07
  • 1
    Yep, (BTW: the sum was always even)
    – Yuval.R
    Oct 29, 2020 at 12:09

You could do this:

import random
from itertools import product

# Prepare a list of triplets that add up to an even number
even_triplets = [x for x in product(range(1,21), range(1,21),range(1,21))
                 if (sum(x)%2)==0]

# Now select 100 of those triplets randomly, allowing
# duplicates (allowing same triplet to appear multiple times)

result = random.choices(even_triplets, k=100)
# If you don't want repetitions, un-comment below line instead of above:
# result = random.sample(even_triplets, 100)

# Print the first and last of the selected 100 triplets, just to verify

Note: The way the question is phrased currently is a self-contradiction: it says that a, b, and c are to be selected randomly, and it also says that they should add up to an even number. If the selection of a, b, and c is truly random, then it cannot be subject to the additional constraint of adding up to an even number.

  • note that random doesn't imply uniformly distributed. the way it's described, the marginal distribution of each random variable is indeed uniform, it's just that there's a constraint on the joint distribution excluding certain combinations. to demonstrate that the marginals are uniform you can run, e.g., collections.Counter([x[0] for x in even_triplets]) and see that every value appears the same number of times
    – Sam Mason
    Oct 29, 2020 at 13:15
  • @SamMason - Did you mean to type for x in result rather than for x in even_triplets ? Oct 29, 2020 at 13:24
  • nope. I meant the marginal of the whole distribution not any particular sample
    – Sam Mason
    Oct 29, 2020 at 13:26

for completeness, a less efficient way of generating samples with this distribution would be to use rejection sampling. this works by rejecting values that aren't wanted, in this case where the sum isn't even

from random import randint

def fn():
  while True:
    x = tuple(randint(1, 20) for _ in range(3))
    if sum(x) & 1 == 0:
      return x

which can be used as:

for i in range(100):
    a, b, c = fn()
    print(f'{a}, {b}, {c}')

rejection sampling can be wasteful, but on average we'd only expect to reject one sample for every one we accept so it's not too bad here

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