Euclidean geometry

The very nature of Euclidean geometry seems to change with such software.

A universe described by Euclidean geometry probably isn't, for example.

His sharp mind, which allowed him to learn Euclidean geometry at age 5.

Euclidean geometry is barely a memory, but people still know how to read.

Space, in this construction, still has the ordinary Euclidean geometry.

The most familiar examples are the straight lines in Euclidean geometry.

It can be described as a generalization of Euclidean geometry.

In Euclidean geometry, the six quadrilaterals above are all different.

A line in Euclidean geometry is a model of the real number line.

We know from high school that Euclidean geometry is a model of these axioms.

As in Euclidean geometry, the shortest distance between two points is a straight line.

Previously, Euclidean geometry had stated that parallel lines never meet.

But that does not mean that Euclidean geometry is of no use.

This concept is important, for example, in Euclidean geometry.

This is substantial as few people would consider Euclidean geometry a trivial theory.

Classically, these were problems of Euclidean geometry, although now it has been expanded.

These definitions are designed to be consistent with the underlying Euclidean geometry.

All modern thinking about the foundations of Euclidean geometry.

Euclidean geometry is modelled by our notion of a "flat plane."

In Euclidean geometry, this distance can be measured by tracking a straight line between two points.

In Euclidean geometry, any three non-collinear points determine a plane.

As well as group theory, he is also interested in Euclidean geometry.

One might fault the plan's reliance on Euclidean geometry as less than fully up to date.

The rules of Euclidean geometry only apply accurately to flat surfaces.

Euclidean geometry has two fundamental types of measurements: angle and distance.