Book, Paragraph

 1  IV, 8  |     beyond any ratio. For let Z be void, equal in magnitude
 2  IV, 8  |       that time any substance Z which exceeds air in thickness
 3  IV, 8  |       time H. For if the body Z be as much thinner than
 4  IV, 8  |        A, if it moves through Z, will traverse it in a time
 5  IV, 8  |     then, there is no body in Z, A will traverse Z still
 6  IV, 8  |    body in Z, A will traverse Z still more quickly. But
 7  IV, 8  | supposed that its traverse of Z when Z was void occupied
 8  IV, 8  |   that its traverse of Z when Z was void occupied the time
 9  IV, 8  |      So that it will traverse Z in an equal time whether
10  IV, 8  |      in an equal time whether Z be full or void. But this
11  VI, 1  | similarly when its motion was Z. Now a thing that is in
12  VI, 1  | motion is the three D, E, and Z, and if it is not in motion
13 VII, 1  |     let E be the motion of A, Z of B, and H and O respectively
14 VII, 5  |   half the motive power A and Z half the weight B: then
15 VII, 5  |      same time. But if E move Z a distance G in a time D,
16 VII, 5  |  follow that E can move twice Z half the distance G in the
17 VIII, 8 |   line E is equal to the line Z, that A proceeds in continuous
18 VIII, 8 |       A from the extremity of Z to H: then, says the argument,
19 VIII, 8 |  motion from the extremity of Z: for the fact of A’s having
20 VIII, 10|      It follows that the time Z is not infinite. Now we
21 VIII, 10|     time, let us say the time Z in moving D. Now if I take