Newbetuts

Packing of parallelograms with sides $1$ and $\sqrt{2}$ and angle $45^{\circ}$ in a rectangular container

Fractional oblongs in unit square via the Paulhus packing technique

Can the Fibonacci lattice be extended to dimensions higher than 3?

Density of randomly packing a box

Packing regular tetrahedra of edge length 1 with a vertex at the origin in a unit sphere

Side length of the smallest square that can be dissected into $n$ squares with integer sides

A question on circles

How to pack a sphere with cubes?

Packing squares into a circle

How minimally can I cut a cake sector-wise to fit it into a slightly undersized square tin?

Pack rectangular objects of different sizes in a fixed size rectangle

Packing an infinite sequence of disks

Can the squares with side $1/n$ be packed into a $1 \times \zeta(2)$ rectangle?

Minimum number of integer-sided squares needed to tile an $m$ by $n$ rectangle.

Does sticking LEGO bricks together make them easier or harder to pack away into a box of fixed volume?

How densely can the :...: polyomino fill the plane?

New posts in packing-problem

Stacking circles with $r=\frac{1}{p}$ inside a circle with $r = 1$

Smallest square containing sectors of disc

Circle Packing Algorithm

Tiling the unit square with right triangles

Packing of parallelograms with sides $1$ and $\sqrt{2}$ and angle $45^{\circ}$ in a rectangular container

Fractional oblongs in unit square via the Paulhus packing technique

Can the Fibonacci lattice be extended to dimensions higher than 3?

Density of randomly packing a box

Packing regular tetrahedra of edge length 1 with a vertex at the origin in a unit sphere

Side length of the smallest square that can be dissected into $n$ squares with integer sides

A question on circles

How to pack a sphere with cubes?

Packing squares into a circle

How minimally can I cut a cake sector-wise to fit it into a slightly undersized square tin?

Pack rectangular objects of different sizes in a fixed size rectangle

Packing an infinite sequence of disks

Can the squares with side $1/n$ be packed into a $1 \times \zeta(2)$ rectangle?

Minimum number of integer-sided squares needed to tile an $m$ by $n$ rectangle.

Does sticking LEGO bricks together make them easier or harder to pack away into a box of fixed volume?

How densely can the :...: polyomino fill the plane?