Census  Solution
The Problem:
A census taker approaches a house and asks the woman who answers
the door,"How many children do you have, and what are their ages?"
Woman: "I have three children, the product of their ages are 36,
the sum of their ages are equal to the address of the house next
door."
The census taker walks next door, comes back and says, "I need
more information."
The woman replies, "I have to go, my oldest child is sleeping upstairs."
Census taker: "Thank you, I now have everything I need."
What are the ages of each of the three children?
The Solution:
The reason the census taker could not figure out the children's
ages is because, even with knowing the number on the house next
door, there were still two possibilities.
The only way that the product
could be 36 and still leave two possibilities is if the sum equals
13. These possibilities being 9, 2 and 2 and 6, 6 and 1.
When the home owner
stated that her "Oldest" child is sleeping she was giving ths census
taker the fact that there is an "oldest." The children's ages are
therefore 9,2 and 2.
Notes
I sometimes get asked why other possible solutions are not shown. Answer: because there aren't any more! A key element of this puzzle is that the census taker needed more information!
For example, another way to factor 36 is 12, 3 and 1. The sum is 16. If the number next door had been 16, the census taker would not have needed to come back for more information.
Another factoring is 6, 3 and 2. The sum is 11. Once again, the census taker would not have needed to come back if that had been the number next door.
And nor will 4, 3 and 3 work because its sum of 10 is also unique.
Hope that makes sense!
Rod Pierce
