Which three go together? Why do they go together?

Mai and Andre found some connecting cubes and took turns building towers made of single cubes stacked on top of each other. 

• Mai went first and built a tower 2 cubes tall.
• Andre went second and built a tower 4 cubes tall.
• Mai went third and built a tower 8 cubes tall.
• They each tried to build a tower that was double the height of the previous tower.

1. How many cubes would be needed to build the 7th tower? Explain your reasoning.
2. The number of cubes needed to build the 25th tower is very, very large. Write an expression to represent this number without computing its value.
3. The 28th tower would require even more cubes than the 25th tower. How many times as many cubes are needed to build the 28th tower as are needed for the 25th tower?

Imagine a tall tower that is different from any other tower. One day this tower is only half as tall as it was the day before!

• On the second day, the tower is of its original height.
• On the third day, the tower is of its original height.

1. What fraction of the original height is the tower after 6 days?
2. What fraction of the original height is the tower after 28 days? Write an expression to describe this without computing its value.
3. Will the tower ever disappear completely? If so, after how many days?