## Euclidian Geometry |

### From inside the book

Results 6-10 of 36

Page 65

... bisecting AB at right △ s ; .. the line bisecting AB at rights

... bisecting AB at right △ s ; .. the line bisecting AB at rights

**passes**through F ; .. the lines bisecting at right 4 s the sides of the △ ABC meet in the point F. C. G. 5 PROBLEM ( e ) . Find the locus of a SUPPLEMENT TO BOOK I. 65. Page 96

...

...

**passes**through the centre . For through the middle point of the chord only one straight line can be drawn to it ; and that through the centre is to it . COR . The middle point of a chord bisecting another at right angles is the centre ... Page 99

... squares on QS , SC , ( 1.35 ) but square on QR = square on QS ; · . · QR = QS ; .. square on RA - square on SC ; . , RA = SC ; ... AB = CD . DEFINITION . A chord of a circle which

... squares on QS , SC , ( 1.35 ) but square on QR = square on QS ; · . · QR = QS ; .. square on RA - square on SC ; . , RA = SC ; ... AB = CD . DEFINITION . A chord of a circle which

**passes**through 7-2 CHORDS . 99 Conversely: ... Page 100

Francis Cuthbertson (M.A.). DEFINITION . A chord of a circle which

Francis Cuthbertson (M.A.). DEFINITION . A chord of a circle which

**passes**through the centre is called a diameter . PROPOSITION V. The diameter is the greatest chord of a circle , and of all others that nearer to the centre is greater ... Page 105

... the point of contact shall

... the point of contact shall

**pass**through the centre . For from the point of contact only one straight line can be drawn to the tangent , and that through the centre is L to it . PROBLEM B. Draw a tangent to a circle from a TANGENTS . 105.### Other editions - View all

### Common terms and phrases

Algebra base Cambridge centre chord circumference cloth Conic Sections Crown 8vo Describe a circle diagonals diameter divided draw a straight ELEMENTARY TREATISE English equiangular equilateral Euclid Extra fcap fcap GEOMETRY given angle given circle given point given straight line Grammar greater H Let Hence inscribed intersecting isosceles triangle Latin Let ABC line bisecting locus Mathematical meet opposite angles Owens College parallel parallelogram perimeter perpendicular plane polygon PROBLEM produced Professor proportional PROPOSITION ratio rect rectangle rectangle contained rectilineal figure regular polygon respectively rhombus right angles Schools Second Edition segment similar Similarly squares on AC straight line drawn straight line joining tangent THEOREM TRIGONOMETRY twice rectangle twice the squares vertex