Book, Paragraph

 1  IV, 4 |            but equal to it; for the extremities of things which touch are
 2  IV, 4 |       because it surrounds, for the extremities of what contains and of
 3  IV, 4 |           The extension between the extremities is thought to be something,
 4  IV, 11|          and end, but rather as the extremities of a line form a number,
 5   V, 3 |            be in contact when their extremities are together.~That which
 6   V, 3 |   continuity is impossible if these extremities are two. This definition
 7   V, 3 |           imply continuity: for the extremities of things may be "together"
 8   V, 3 |            in coming to be: for the extremities must necessarily come into
 9   V, 4 |            continuity only when the extremities of the two things are one.
10   V, 4 |             Now some things have no extremities at all: and the extremities
11   V, 4 |         extremities at all: and the extremities of others differ specifically
12  VI, 1 |         being "continuous" if their extremities are one, "in contact" if
13  VI, 1 |          one, "in contact" if their extremities are together, and "in succession"
14  VI, 1 |          point indivisible. For the extremities of two points can neither
15  VI, 1 |           an indivisible, since the extremities of things that are continuous
16  VI, 2 |          infinite in respect of its extremities, length is also infinite
17  VI, 2 |          infinite in respect of its extremities: if time is infinite in
18  VI, 2 | divisibility or in respect of their extremities. So while a thing in a finite
19 VII, 2 |            find that the respective extremities of that which causes and
20 VII, 2 |         evident that the respective extremities of that which causes and
21 VII, 2 |         therefore, that between the extremities of the moved and the movent