A solution to this problem will appear along with next month’s problem.

Answer is: 8

STRATEGY: Make a table.
Consider the first few houses on a street, then the house Mr. Sullivan might live in, and then the first few houses that come after that.
Beginning of Street Mr. Sullivan End of Street.

Beginning of Street	Mr. Sullivan	End of Street
1 + 2 + 3 = 6	4	5 + 6 = 11…… Too big
1 + 2 + 3 + 4 = 10	5	6 + 7 = 13…… Too big
1 + 2 + 3 + 4 + 5 = 15	6	7 + 8 = 15…… Equal sums

Therefore, there are 8 houses on Bay Street.

FOLLOW-UP: Suppose the product of the house numbers before Mr. Sullivan's is the same as that of the house numbers after his. How many houses are on Bay Street? [10]

Answer is: 15

STRATEGY: Work backwards.
To have the smallest number of hamsters, David must have only one hamster
in the fourth cage (we assume all hamsters are whole). If there is one in the
fourth cage, there are two in the third, four in the second, and eight in the first.
The smallest number of hamsters David can have is 8 + 4 + 2 + 1, or 15.