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from these equals take away all the int. s, all the ext. s= 4 rt. S.

PROP. XXXII. THEOR. 33. 1 Eu.

The straight lines which join the extremities of two equal and parallel straight lines towards the same parts, are also themselves equal and parallel.

Let AB, CD, be and || str. lines, joined towards the same parts by the str. lines AC, BD: then shall AC and BD be = and to each

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PROP. XXXIII. THEOR. 34. 1 Eu.

The opposite sides and angles of parallelograms are equal to one another, and the diameter bisects them, that is, divides them into two equal parts.

N.B.-A parallelogram is a four-sided figure, of which the opposite sides are parallel; and the diameter is the straight line joining two of its opposite angles.

Let ACDB be a

the opp. sides and

m

", of which BC is a diam.
s of the figure are = to

one another; and BC bisects the figure.

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Prop. 4.

Prop. 26.

Prop. 28.

Prop. 28

in ▲s ABC, CBD,

../s ABC, BCA =

Zs BCD, CBD, ea. to ea. and adjacent side BC common to both As,

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JAB, AC

Prop. 25.

= CD, BD, ea. to ea.

and ::

ABC

Ax. 2.

Prop. 4.

=/ BCD,

▲ CBD = ▲ ACB,

..whole ABD whole ACD;

and it has been proved

▲ BAC = ▲ BDC.

..the opp. sides ands of

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.. diam. BC divides them ACDB into two

= parts.

Wherefore the opposite sides and angles, &c.

PROP. XXXIV. THEOR. 35. 1 Eu.

Parallelograms upon the same base, and between the same parallels, are equal to one another.

Let the C ms

ABCD, EBCF, be upon the same base BC, and between the same ||s, AF, BC; then Om ABCD = "EBCF.

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2. If the sides AD, EF, be not terminated

in the same point (figs. 2 and 3),

Prop. 33.

Ax. 6.

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Take the

ext. FDC int. EAB,

base EB = base FC,

EAB from the trapezium ABCF;

and from the same trapezium take the Ax. 3. FDC; then the remainders are =; that is,

m

ABCD =

EBCF.

Wherefore parallelograms, &c.

COR.-Triangles upon the same base, and between the same parallels, are equal to one another. For if the diameters AC, FB, be drawn (figs. 2 and 3), the As ABC, FBC,

Ax. 7.

Hyp. Prop. 33.

Ax. 1.

Prop. 32.
Def.

Prop. 34.

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Parallelograms upon equal bases, and between the same parallels, are equal to one another.

Let ABCD, EFGH, be

ms

upon = bases

BC, FG, and between the same ||s, AH, BG;
ABCDEFGH.

then

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Join BE, CH,

BC=
= FG,

EH = FG,

BC= EH;

str. lines EB, HC,

join the extremities of = and || str. lines, they are themselves

=

and : that is,

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since they are on the same base BC and be

tween the same ||s.

For the same reason,

EFGH =

7 EBCH,

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