Page:Popular Science Monthly Volume 83.djvu/394

Again, to repeat in words slightly different from the foregoing (Fig. 11) considering the ${\displaystyle a}$ units as ${\displaystyle a}$ points (an indefinite number), the square ${\displaystyle ABCD}$ is derived from the line ${\displaystyle AB}$, which for convenience suppose to be one foot in length, by letting ${\displaystyle AB}$ with its a points move through a distance of one foot in a direction perpendicular to itself, that is, perpendicular to the one dimension of ${\displaystyle AB}$, every point of ${\displaystyle AB}$ describes a line, and ${\displaystyle ABCD}$ contains therefore ${\displaystyle a}$ lines and ${\displaystyle a^{2}}$ points.

Fig. 11.

The cube ${\displaystyle ABCD-G}$ is derived from the square ${\displaystyle ABCD}$ which moves one foot in a direction perpendicular to its two dimensions, its ${\displaystyle a}$ lines and ${\displaystyle a^{2}}$ points describing ${\displaystyle a}$ squares and ${\displaystyle a^{2}}$ lines respectively. The cube ${\displaystyle ABCD-G}$ therefore contains ${\displaystyle a}$ squares, ${\displaystyle a^{2}}$ lines and ${\displaystyle a^{3}}$ points.

Similarly, the four-dimensional unit is derived from the cube, ${\displaystyle ABCD-G}$, by letting that cube move one foot in a direction perpendicular to each of its three dimensions, that is, in the direction of the fourth dimension; its ${\displaystyle a}$ squares, ${\displaystyle a^{2}}$ lines, and ${\displaystyle a^{3}}$ points describing respectively ${\displaystyle a}$ cubes, ${\displaystyle a^{2}}$ squares, ${\displaystyle a^{3}}$ lines. The hypercube, therefore, contains ${\displaystyle a}$ cubes, ${\displaystyle a^{2}}$ squares, ${\displaystyle a^{3}}$ lines and ${\displaystyle a^{4}}$ points.

Now, as to the boundaries of the units, ${\displaystyle AB}$ has two bounding points, ${\displaystyle ABCD}$ has four, two each from the initial and the final position of the moving line, ${\displaystyle ABCD-G}$ has eight,—four each from the initial and the final position of the moving square,—and the hypercube^[1] has sixteen,—eight each from the initial and the final position of the moving cube.

Bounding Lines.—Of bounding lines, ${\displaystyle AB}$ has one (or is itself one), ${\displaystyle ABCD}$ has 4, one each from the initial and the final position of the moving line and 2 generated by the 2 bounding points of that line; ${\displaystyle ABCD-G}$ has 12,—4 each from the initial and the final position of the moving square and 4 generated by the 4 bounding points of that square; and the hypercube has 32,—12 each from the initial and the final position of the moving cube and 8 generated by the 8 bounding points of that cube.

Bounding Squares.—Of bounding squares, ${\displaystyle ABCD}$ has one (itself); ${\displaystyle ABCD-G}$ has 6,—one each from the initial and the final position of