**SUPPLEMENTARY** CHORDS . 168 . Two chords MC , MC ' in an ellipse are

called **supplementary** chords , if they be drawn from any point of the ellipse to the

extremities of a diameter CC " ( Fig . 101 ) . Two **supplementary** chords are

parallel ...

**Author**: Briot (M., Charles)

**Publisher:**

**ISBN:** STANFORD:36105002072465

**Category:** Geometry, Analytic

**Page:** 581

**View:** 196

*( 1 ) Produce CB , then , Ex . 15 , Zrl = Zw , and , $ 59 , Zr = Zw ; . . Ax . 1 , Zr = Zpl ;
similarly , Zt = Zt ' ; hence , substituting in ( 1 ) , Zv + Z rol + Ls + LU ' = 2 rt . & ; i .
Zv + Zrl is *

**supplementary**to Ls + < t ' ; but , $ 110 , ZE is

**supplementary**to ...

**Author**: William James Milne

**Publisher:**

**ISBN:** UOM:39015030241916

**Category:** Geometry

**Page:** 313

**View:** 399

*Two lines drawn from any point on the curve to the extremities of a diameter , are
called supplementary chords . 195. Supplementary chords in the equilateral
hyperbola . In the equilateral hyperbola a = b , and we have inm ' = 1 , or 1 m =>
m т ...*

**Author**: Elias Loomis

**Publisher:**

**ISBN:** IOWA:31858046843011

**Category:** Geometry, Analytic

**Page:** 261

**View:** 775

*( 4 ) The intersections of these ordinates determine - the required supplementary
projections . 150 . When S . is made to incline to both coördinate planes — a
position least calculated to insure simplicity of construction — the projections of
the ...*

**Author**: Solomon Woolf

**Publisher:**

**ISBN:** WISC:89097066153

**Category:** Geometry, Descriptive

**Page:** 152

**View:** 686

*BOOK V PAGE 173 Area and Equivalence . Summary : . . Supplementary
Exercises . . . . . . . . . . . . . . . . . . . . . . . . . 202 . 204 BOOK VI Regular Polygons and
Measurement of the Circle . Maxima and Minima . . . . . . Symmetry . . . . . . . .
Summary .*

**Author**: William James Milne

**Publisher:**

**ISBN:** STANFORD:36105049278364

**Category:** Geometry

**Page:** 384

**View:** 457

*In Keisha's drawing above, identify /Fand /Gas supplementary, complementary,
or vertical. supplementary 5. ... Name an angle that is supplementary to ACD . or
ACB DCR 18 Spectrum Geometry Chapter 2 Grade 6 Problem Solving: ...*

**Author**: Spectrum

**Publisher:** Carson-Dellosa Publishing

**ISBN:** 9781483804811

**Category:** Juvenile Nonfiction

**Page:** 96

**View:** 987

*Congruent Figures Olaus Magnus Friedrich Erdman Henrici. between ab and
one of the angles between a ' b , then these two angles are either equal or
*

**supplementary**. For we may consider b as a transversal by which the two parallels a and ...

**Author**: Olaus Magnus Friedrich Erdman Henrici

**Publisher:**

**ISBN:** UCD:31175002195397

**Category:** Congruences (Geometry)

**Page:** 188

**View:** 526

*10.21 Use the diagram below to prove the following statement: if a trapezoid has
supplementary opposite angles, then it is isosceles. R and S are both
supplements of T; T and U are both supplements of R. Temporarily assume the
opposite of ...*

**Author**: W. Michael Kelley

**Publisher:** Penguin

**ISBN:** 9781615646982

**Category:** Mathematics

**Page:** 592

**View:** 806

*NMRock 2005-2006 RockMath.com Proofs Geometry I, Standard 3.0: Logical. 8.
Fact2.0 For the above proof, state reason 4.: a) Given b) Supplementary Angles c
) Construction d) Substitution e) Alternate Interior Angles 9. Fact2.0 For the ...*

**Author**: Nathaniel Max Rock

**Publisher:** Team Rock Press

**ISBN:** 9780974939254

**Category:** Education

**Page:** 332

**View:** 851

**Supplementary** Angles . — Two angles whose sum is a straight angle are called

**supplementary** angles , each being the supplement of the other . COROLLARY 1

. When one line meets another between its end - points , the adjacent angles ...

**Author**: Joseph Anthony Gillet

**Publisher:**

**ISBN:** UCBK:C057954682

**Category:** Geometry

**Page:** 436

**View:** 779

*We know that opposite angles of a cyclic quadrilateral are supplementary. Just
that vocabulary word should make a connection with a structure in the drawing:
angles BCE and BCD are a linear pair and thus supplementary. We are
supposed ...*

**Author**: Michael McDaniel

**Publisher:** Universal-Publishers

**ISBN:** 9781627340281

**Category:** Geometrical constructions

**Page:** 150

**View:** 281

*For the supplemental angles . The half of the entire circumference , and which
contains four right angles , will be the measure of the original and supplementary
angles , making together two right angles . For application of the rule , take firstly
...*

**Author**: Rolla Rouse

**Publisher:**

**ISBN:** OXFORD:590857143

**Category:**

**Page:**

**View:** 718

*CONVERSELY : If two adjacent angles are supplementary , their exterior sides
are in the same straignt line . Let the adjacent angles OCA and OCB be
supplementary . To prove that AC and CB are in the same straight line . Proof .
Suppose CF ...*

**Author**: George Albert Wentworth

**Publisher:**

**ISBN:** NYPL:33433069096430

**Category:** Geometry, Plane

**Page:** 256

**View:** 241

*En . Let the alternate angles EBC , BCH be equal ; E B 4 C it is required to prove
that the corresponding angles ABF , BCH are equal , and the interior angles on
the same side FBC , BCH are *

**supplementary**. Because EBC = BCH ( Hyp . ) ...

**Author**: James Maurice Wilson

**Publisher:**

**ISBN:** BL:A0025226214

**Category:**

**Page:**

**View:** 778

**GEOMETRY** AND EUCLID . Euclid . The First Two Books explained to Beginners

. By C . P . Mason , B . A . 2nd Edition . Fcap 8vo . 2s . 6d . The Enunciations and

Figures to Euclid ' s Elements . By Rev . J . Brasse , D . D . New Edition . Fcap .

**Author**: John Hunter (of Uxbridge.)

**Publisher:**

**ISBN:** OXFORD:590515132

**Category:**

**Page:**

**View:** 330

*CONVERSELY : If two adjacent angles are supplementary , their exterior sides
are in the same straight line . L A с B Let the adjacent angles OCA and OCB be
supplementary , To prove that AC and CB are in the same straight line . Proof .*

**Author**: George Albert Wentworth

**Publisher:**

**ISBN:** HARVARD:32044097045884

**Category:** Geometry

**Page:** 473

**View:** 822

*( a ) Draw two supplementary adjacent angles . ( 6 ) Draw two supplementary *

angles which are not adja cent , but yet have the same vertex . ( c ) Can you draw

two supplementary angles , ( 1 ) when both are acute ? ( 2 ) when both are

obtuse ?

**Author**: Arthur A. Dodd

**Publisher:**

**ISBN:** UOM:39015064334975

**Category:** Geometry

**Page:** 406

**View:** 194

*Discover whether it is possible for the angles to have their sides perpendicular
and yet not be equal . Theorem . Angles whose corresponding sides are
perpendicular to each other are either equal or *

**supplementary**. Data : AB perpendicular to ...

**Author**: William James Milne

**Publisher:**

**ISBN:** HARVARD:HW22J3

**Category:** Geometry, Plane

**Page:** 242

**View:** 567