I have the following code trying to solve the problem below:
Thrown n dice m times, calculate the probability of getting at least one 6.
I know that the exact probability of getting at least 1 six when throwing 2 dice is 11/36.
My program below seems to want the probability to be 0.333, which is close, but it should be 11/36 right?
Great if the suggestions can continue on the standard code I have made, but vectorized code is also appreciated.
import random from sys import argv m = int(argv) # performing the experiment with m dice n times n = int(argv) # Throwing m dice n times s = 0 # Counts the number of times m dies shows at least one 6 print '%.g dice are thrown %.g times' % (m, n) for i in xrange(n): list =  # used to clear the list for new die count for q in xrange(m): r = random.randint(1,6)#Picks a random integer on interval [1,6] list.append(r) #appends integer value if len(list) == m: #when list is full, that is when m dice has been thrown for i in xrange(len(list)): #print list if list[i] == 6: #if the list of elements has a six add to the counter s += 1 pass #I want the loop to exit when it finds an element = 6 print 'Number of times one of the n dice show at least one 6: %.g' % s print 'Probability of at least 1 six from %.g dice is = %2.3f' % (m,s/float(n))
I will edit the code and questions if something is unclear.
Sample on output:
Terminal > python one6_ndice.py 2 1000000 2 dice are thrown 1e+06 times Number of times one of the n dice show atleast one 6: 3e+05 Probability of atleast 1 six from 2 dice is = 0.333