AbstractThis paper discusses tetrahedra with rational edges forming an arithmetic progression, focussing specifically on whether they can have rational volume or rational face areas. Several infinite families are found which have rational volume, a face can have rational area only if its edges are themselves in arithmetic progression, and a tetrahedron can have at most one such rational face area
A Heron triangle is one that has all integer side lengths and integer area, which takes its name fro...
AbstractA rational cuboid is a rectangular parallelepiped whose edges and face diagonals all have ra...
If one has three sticks (lengths), when can you make a triangle with the sticks? As long as any two...
This paper discusses tetrahedra with rational edges forming an arithmetic progression, focussing spe...
AbstractThis paper discusses tetrahedra with rational edges forming an arithmetic progression, focus...
Rational tetrahedra are tetrahedra with rational edges. Heron tetrahedra are tetrahedra with integer...
AbstractThis paper discusses tetrahedra with rational edges forming a geometric progression, focussi...
This paper discusses rational edged tetrahedra, in 3, 4 and n dimensions, with rational volume. The ...
AbstractBuchholz [R.H. Buchholz, Perfect pyramids, Bull. Austral. Math. Soc. 45 (1991) 353–368] bega...
A natural extension of Heron's 2000 year old formula for the area of a triangle to the volume of a t...
A natural extension of Heron's 2000 year old formula for the area of a triangle to the volume of a t...
We study the connection of Heronian triangles with the problem of the existence of rational cuboids....
Triangles with integer length sides and integer area are known as Heron triangles. Taking rescaling ...
AbstractWe generalise the notion of Heron triangles to rational-sided, cyclic n-gons with rational a...
A rational n-tiling of the unit square is a collection of n triangles with rational side length whos...
A Heron triangle is one that has all integer side lengths and integer area, which takes its name fro...
AbstractA rational cuboid is a rectangular parallelepiped whose edges and face diagonals all have ra...
If one has three sticks (lengths), when can you make a triangle with the sticks? As long as any two...
This paper discusses tetrahedra with rational edges forming an arithmetic progression, focussing spe...
AbstractThis paper discusses tetrahedra with rational edges forming an arithmetic progression, focus...
Rational tetrahedra are tetrahedra with rational edges. Heron tetrahedra are tetrahedra with integer...
AbstractThis paper discusses tetrahedra with rational edges forming a geometric progression, focussi...
This paper discusses rational edged tetrahedra, in 3, 4 and n dimensions, with rational volume. The ...
AbstractBuchholz [R.H. Buchholz, Perfect pyramids, Bull. Austral. Math. Soc. 45 (1991) 353–368] bega...
A natural extension of Heron's 2000 year old formula for the area of a triangle to the volume of a t...
A natural extension of Heron's 2000 year old formula for the area of a triangle to the volume of a t...
We study the connection of Heronian triangles with the problem of the existence of rational cuboids....
Triangles with integer length sides and integer area are known as Heron triangles. Taking rescaling ...
AbstractWe generalise the notion of Heron triangles to rational-sided, cyclic n-gons with rational a...
A rational n-tiling of the unit square is a collection of n triangles with rational side length whos...
A Heron triangle is one that has all integer side lengths and integer area, which takes its name fro...
AbstractA rational cuboid is a rectangular parallelepiped whose edges and face diagonals all have ra...
If one has three sticks (lengths), when can you make a triangle with the sticks? As long as any two...
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