Sidebilder
PDF
ePub

Book III. the circle, and DB touches it; the rectangle AD.DC is equal to the square of DB.

a 18.3.

b 6.2.

c 47. 1.

d 1. 3. e 12. 1.

£ 3.3.

Either DCA passes through the
centre, or it does not. Let it pass
through the centre E, and join
EB; therefore the angle EBD is a B
right angle. Because the straight
line AC is bisected in E, and pro-
duced to the point D, AD.DC+EC2
=bED2. But EC-EB, therefore
AD.DC+EB2-ED2. Now ED2=c
EB2+BD2, therefore AD.DC+EB2
-EB2+BD2, therefore if EB2 be taken
from each, AD.DC=BD?.

D

E

D

But if DCA do not pass through the centre of the circle ABC, taked the centre E, and draw EF perpendiculare to AC, and join EB, EC, ED. Because the straight line EF, which passes through the centre, cuts the straight line AC, which does not pass through the centre, at right angles, it likewise bisects it; therefore AF is equal to FC. Because the straight line AC is bisected in F, and produced to D, bAD.DC+FC2-FD2. Add FE2 to both, then AD.DC+FC2+ FE2= FD2+FE2. Bute EC2-FC2+FE2, and ED2FD2+ FE2; therefore

B

F

AD.DC+EC2-ED?. Now ED2=EB2+BD2=EC2+BD2; therefore AD.DC+EC2-EC2+BD2; therefore AD.DC= BD2. Wherefore, if from any point, &c. Q. E. D.

COR. If from any point without a circle there be drawn two straight lines cutting it, as AB, AC, the rectangles contained by the whole lines and the parts of them without the circle are equal to each other, BA.AE-CA.AF; for each of these rectangles is equal to the square of the straight line AD which touches the circle.

D

B

PROP. XXXVII. THEOR.

E

IF from a point without a circle there be drawn two straight lines, one of which cuts the circle, and the other meets it; and if the rectangle contained by the whole line, which cuts the circle, and the part of it without the circle, be equal to the square of the line which meets it, the line which meets will touch the circle.

Book III.

Book III.

a 17. 3.

b 18. 3.

c 36. 3.

d 8. 1.

e 16. 3.

Let any point D be taken without the circle ABC, and from it let two straight lines DCA and DB be drawn, of which DCA cuts the circle, and DB meets it; if the rectangle AD.DC be equal to the square of DB, DB touches the circle.

[ocr errors]

E

Draw the straight line DE touching the circle ABC; find the centre F, and join FE, FB, FD; then FED is a right angle; and because DE touches the circle ABC, and DCA cuts it, the rectangle AD.DC is equal to the square of DE; but the rectangle AD.DC is, by hypothesis, equal to the square of DB; therefore the square of DE is equal to the square of DB; therefore the straight line DE is equal to the straight line DB. Because FE is equal to FB, and DE equal to DB, and the base FD common to the two triangles DEF, DBF, the angle DEF is equald to the angle DBF. But DEF is a right angle, therefore also DBF is a right angle. Now FB, if produced, will be a diameter, therefore DB touches the circle, ABC. Wherefore, if from a point, &c. Q. E. D.

F

ELEMENTS OF GEOMETRY.

BOOK IV.

DEFINITIONS.

I.

A RECTILINEAL figure is said to be inscribed in an- Book IV. other rectilineal figure, when all the angles of the inscribed

figure are upon the sides of the figure

in which it is inscribed, each upon

each.

II.

In like manner, a figure is said to be described about another figure, when all

the sides of the circumscribed figure pass through the angular points of the figure about which it is described, each through each.

III.

A rectilineal figure is said to be inscribed in a circle, when all the angles of the inscribed figure are upon the circumference of the circle.

[blocks in formation]

A rectilineal figure is said to be described about a circle, when
each side of the circumscribed figure
touches the circumference of the
circle.

[ocr errors]

V.

In like manner, a circle is said to be in-
scribed in a rectilineal figure, when
the circumference of the circle touches
each side of the figure.

VI.

A circle is said to be described about a
rectilineal figure, when the circumfe-
rence of the circle passes through all
the angular points of the figure about
which it is described.

VII.

A straight line is said to be placed in a circle, when the extremities of it are in the circumference of the circle.

PROP. I. PROB.

IN a given circle to place a straight line equal to a given straight line, not greater than the diameter of the circle.

Let ABC be the given circle, and D the given straight line, not greater than the diameter of the circle.

Draw BC the diameter of the circle ABC; then, if BC be equal to D, the thing required is done; for in the circle ABC a straight line BC is placed equal to D. But if

D

A

B

« ForrigeFortsett »