The number 
is special. It has odd number of proper divisors: 
. Furthermore, if you take any of its proper divisors, say 
, it too has odd number of proper divisors: 
. The numbers 
and 
, have similar property as .
is special. It has odd number of proper divisors: . Furthermore, if you take any of its proper divisors, say , it too has odd number of proper divisors: . The numbers and , have similar property as . Given a limit n, find how many integers 
, have similar property as 210, namely, the integers should have odd number of proper divisors and all its proper divisors have odd number of proper divisors, as well.
, have similar property as 210, namely, the integers should have odd number of proper divisors and all its proper divisors have odd number of proper divisors, as well. The number 
, does not qualify because it has even proper divisors, 8 in total 
. The number 
also doesn't qualify because although it has 
proper divisors, some of its divisor, like 
, have even number of proper divisors.
, does not qualify because it has even proper divisors, 8 in total . The number also doesn't qualify because although it has proper divisors, some of its divisor, like , have even number of proper divisors. NOTE: A proper divisor of a number, is a divisor which is less than the number. Exception to this rule is the number 1, which is considered a proper divisor of itself.
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