when to stop when number is not a happy number

A happy number is defined by the following process. Starting with any positive integer, replace the number by the sum of the squares of its digits, and repeat the process until the number equals 1.

But when number is not a happy number it loops endlessly in a cycle which does not include 1.

i have coded happy number problem in python but the problem is when a number is not happy , then how could i stop the iterating cycle. since it will not end with 1 and will keep on repeating itself.

``````def happynumber(number):

while(number!=1):
numberstr = str(number) #converting a number to string
index=0
sum=0
while(index!=len(numberstr)):
sum = sum + int(numberstr[index])*int(numberstr[index])
index = index+1
print sum

number = sum
return number
``````
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Could you show us what you did? –  Pierre GM Oct 1 '12 at 14:52
You have to think of a way to detect the cycle and break it. That should be enough of a hint for homework. ;) –  Douglas B. Staple Oct 1 '12 at 14:54
Is there a limit to how long the sequence will go before it either repeats or gets to 1? (I would guess not, in which case it's a hard problem.) –  Andrew Jaffe Oct 1 '12 at 14:54
@AndrewJaffe, I expect there's a definite limit. There's no way the sequence can grow forever - once you get past a certain size, the sum of squares of digits of x is always smaller than x itself. So for any starting number, the sequence will surely start to loop after a finite number of steps. –  Kevin Oct 1 '12 at 14:58
yes it does repeat itself but it would be different for different number –  naveen yadav Oct 1 '12 at 14:58
show 1 more comment

You can detect unhappy numbers with a constant amount of memory. According to Wikipedia, for any positive integer starting point, the sequence will terminate at one, or loop forever at `4, 16, 37, 58, 89, 145, 42, 20, 4`. Since no other loops exist, it is easy to test for unhappiness.

``````def isHappy(x):
while True:
if x == 1:
return True
if x == 4:
return False
x = nextNumberInSequence(x)
``````
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You would have to keep a record of all the numbers you have produced so far in the sequence, and if one of them comes up a second time you know you have a loop which will never reach 1. A set is probably a good choice for a place to store the numbers.

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... or a multiple of 10 of an already stored number... –  Pierre GM Oct 1 '12 at 14:56
I think this is the best answer for teaching purposes because it's the most general, and the least dependent upon particular properties of happy numbers. –  DSM Oct 1 '12 at 15:16
@PierreGM: if at step `i` you get a power of 10 times the value at step `j`, then step `i+1` will be equal to step `j+1`, which is another number from earlier in the sequence. So there's no need to catch that case specially, you can just wait one more step and find the cycle then. –  Steve Jessop Oct 1 '12 at 15:36