See \cite{hallStevens}. Deals with \(R^{k}\), the Euclidian \(k\) space, which is described in the vector spaces survey.
Considers metric properties such as distances between points. Perpendiculars, parallels, projections.
Relationship between angles at the intersection of a line with parallels or in a triangle (and other polygons). Similarity and congruence of triangles (and other polygons). Angle bisectors, Medians in a triangle intersect at incenter, circumcenter.
Circle; lines, angles, triangles, chords, arcs in circles. Tangents, Intersection of circles. Ellipsoids, spheres.
Polytopes: an object in \(R^n\) whose boundary surfaces are flat. Convex polytopes: polytopes which are also convex sets.
Area/ volume
The notion of area/ volume in case of euclidean spaces corresponds to the box (Lebesgue) measure over the euclidean space. This is described in the vector spaces survey.
Ellipse, circle. Surface area of n-ball: \(\frac{dV_{n}}{dr}\).
The r-radius \(n-1\) hypersphere \(S^{n-1} = \set{x \in R^{n}: \norm{x} = r}\): a n-1 dim manifold. Encloses a n-ball with volume \(V_{n} = \frac{\pi^{\frac{n}{2}}r^{n}}{\Gamma(\frac{n}{2}+1)}\) \why.
Trigonometry
Obvious with the right construction: sin (A+B) = sin A cos B + cos A sin B. cos (A+B) = cos A cos B - sin A sin B. Trigonometry in triangle calculations. \(\sin^{-1} x, \cos^{-1} x\).