Solving the problem of packing equal and unequal circles in a circular container

The problem of the densest packing of n equal circles in a square has been solved for n < 10 in [4, 61; and some solutions have been proposed for n > 10. In this paper we give some better packings for n = 10, 11, 13 and 14.

## D r ~b a k , Noway Some literature on this subject already exists. In a paper by H. S. M. Coxeter, A n upper bound of equal nonoverlapping spheres that can touch another of the same size in Proceedings of Symposia in Pure Mathematics, Vol. 7, 1963, we find a list of references which contains 30

## Abstract The Social Problem Solving Inventory‐Revised Scale (SPSI‐R) has been shown to be a reliable and valid self‐report measure of social problem‐solving abilities. In busy medical and rehabilitation settings, a brief and efficient screening version with psychometric properties similar to the

The two-dimensional large-displacement non-linear sloshing analysis of liquids in circular rigid containers is revisited. The updating of the free surface position is carried out using an adaptive technique for repositioning the computational nodes on the free surface avoiding the use of remeshing a