Consider the cross-section S_r at height r\geq0 of your 3\times3\times n-tower. Assume you have built the tower up to height r. Some of the 2\times1\times1-sticks filling the first r ...

I think the answers are "yes" to your interesting questions Is there a reason that this occurs? Is there a reason that the factor is the same each time? Is there anything special about the value \sqrt{2}? Here's the start of a discussion, and a conjecture. In the plane, the unit square has area ...

The answer for a 4 \times 4 \times 4, 5\times 5\times 5, and so on cube will continue to be 112. Here's why. Imagine that you take an n \times n \times n cube and, on each face, glue the ...

Since most of the cells are empty, the widths of the arrangement along the three directions are approximately independent and approximately the same as if 10 balls were uniformly randomly ...

The discriminant of f=x^5+2x+2 is 2^4\times 3637, a non-square. I present several method to compute the Galois group, all of them involved some computation. 1. Reduction modulo p Modulo 5 ...

As we shall see it is sufficient to consider T_n-towers, which are completed 2\times2\times n towers, and L_n-towers which are full 2\times2\times n towers with two vertical bricks sticking ...