The problem of inscribing a square in a semicircle and related problems are discussed. Solutions to the problems are provided. (FL)

The present problem was derived from the knowledge that if the midpoints of the sides of any quadrilateral are connected, a parallelogram would be obtained. The author explores what would happen if similar procedures were applied to pentagons, hexagons, and other geometric forms. (RP)

Presents two equivalent forms of the Pythagorean theorem, and a form for finding the area of a right triangle. (RP)

Excerpts from the April 1950 issue of this journal, focusing on the teaching of geometry, are presented. The concern is its lack of importance in the curriculum. (MNS)

The non-Euclidean taxicab geometry is described and contrasted with Euclidean geometry, with examples teachers could use with students. (MNS)

A math teacher suggests redesigning geometric studies to emphasize career education. (Editor)

A problem concerned with a ball on a billiard table is discussed. A theorem and corollaries regarding the path of the ball are formulated and proved. (MK)