Mikhail, a great mathematics teacher, used to always give hard and complex sequences to his sons. After much thought, the brilliant mathematician thought that his sequences were a little too hard. So, he made another one that was easier. He showed it to his sons later that day:
6, 10, 4, 9, 6, 11
Then he asked what would be the next number in this sequence. Because there were many possibilities, the sons were stumped. So, Mikhail said, "This sequence cannot continue once you have the next number." After hearing this, the sons figured out the answer. What was the last number?
(In reply to
A wonderful puzzle (Solution) by Penny)
The 6th number (11) maps better to the number of letters in "Giza Pyramid," but you have cracked it IMHO.

Posted by Richard
on 20040613 17:50:12 