Mock AIME 6 2006-2007 Problems

Problem 1

Let $T$ be the sum of all positive integers of the form $2^r\cdot3^s$ , where $r$ and $s$ are nonnegative integers that do not exceed $4$ . Find the remainder when $T$ is divided by $1000$ .

Solution

Problem 2

Draw in the diagonals of a regular octagon. What is the sum of all distinct angle measures, in degrees, formed by the intersections of the diagonals in the interior of the octagon?

Solution

Problem 3

Alvin, Simon, and Theodore are running around a $1000$ -meter circular track starting at different positions. Alvin is running in the opposite direction of Simon and Theodore. He is also the fastest, running twice as fast as Simon and three times as fast as Theodore. If Alvin meets Simon for the first time after running $312$ meters, and Simon meets Theodore for the first time after running $2526$ meters, how far apart along the track (shorter distance) did Alvin and Theodore meet?