## A Supplement to the Elements of Euclid |

### Inni boken

Resultat 1-5 av 92

Side 1

of equal parts , it is evident that the middle part is thereby bisected .

therefore , each of the remaining * In this and the following references , the letter

E is ...

**Bisect**( E. * 9. 1. ) the given angle : And , first , if it be divided into an odd numberof equal parts , it is evident that the middle part is thereby bisected .

**Bisect**,therefore , each of the remaining * In this and the following references , the letter

E is ...

Side 2

Again , if the given angle be divided into an even number of equal parts , it is

plain that the straight line which

equal parts , on each side of it .

either ...

Again , if the given angle be divided into an even number of equal parts , it is

plain that the straight line which

**bisects**it , will have the half of that number ofequal parts , on each side of it .

**Bisect**, therefore , each of the equal parts , oneither ...

Side 3

Daniel Cresswell. from the vertex A , to the base BC , a straight line which shall

exceed AC , as much as it is exceeded by AB . From AB cut off ( E. 3. 1. ) AD = AC

;

...

Daniel Cresswell. from the vertex A , to the base BC , a straight line which shall

exceed AC , as much as it is exceeded by AB . From AB cut off ( E. 3. 1. ) AD = AC

;

**bisect**( E. 10. 1. ) DB in E ; from the centre A , at the distance AE , describe ( E. 3...

Side 4

2 A C B XP D Join A , B ;

to AB , meeting XY in D. The point D is equidistant from A , B. For , join A , D and

B , D . Then , since ( constr . ) AC = BC , and CD is common to the two AACD ...

2 A C B XP D Join A , B ;

**bisect**( E. 10. 1. ) AB in C ; from C draw ( E. 11. 1. ) CD 1to AB , meeting XY in D. The point D is equidistant from A , B. For , join A , D and

B , D . Then , since ( constr . ) AC = BC , and CD is common to the two AACD ...

Side 5

It is evident from the demonstration , that any point in an indefinite straight line DZ

, which

the extremities A and B , of that given finite line : And , any point which is not in ...

It is evident from the demonstration , that any point in an indefinite straight line DZ

, which

**bisects**the given finite straight line AB , at right angles , is equidistant fromthe extremities A and B , of that given finite line : And , any point which is not in ...

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ABCD aggregate arch base bisect centre chord circle ABC circumference common constr construction describe a circle describe the circle diameter difference distance divided double draw E equal equiangular equilateral extremities fall figure finite straight line four fourth given circle given finite straight given point given ratio given rectilineal given square given straight line greater half inscribed isosceles join less Let ABC lines be drawn locus magnitudes manifest manner mean meet opposite sides parallel to BC parallelogram pass perimeter perpendicular polygon PROBLEM produced PROP proportional proposition rectangle contained rectilineal figure right angles right L scribed segment semi-diameter shewn sides similar square taken tangent THEOREM third touch the circle trapezium triangle vertex vertical whole

### Populære avsnitt

Side 310 - If two triangles have one angle of the one equal to one angle of the other and the sides about these equal angles proportional, the triangles are similar.

Side 198 - If a straight line be bisected, and produced to any point ; the rectangle contained by the whole line thus produced, and the part of it produced, together with the square...

Side 366 - If from the vertical angle of a triangle a straight line be drawn perpendicular to the base, the rectangle contained by the sides of the triangle is equal to the rectangle contained by the perpendicular and the diameter of the circle described about the...

Side 92 - If there be two straight lines, one of which is divided into any number of parts, the rectangle contained by the two straight lines is equal to the rectangles contained by the undivided line, and the several parts of the divided line.

Side 284 - And if the first have a greater ratio to the second, than the third has to the fourth, but the third the same ratio to the fourth, which the fifth has to the sixth...

Side 349 - Divide a straight line into two parts such that the rectangle contained by the whole line and one of the parts shall be equal to the square on the other part.

Side 288 - Convertendo, by conversion ; when there are four proportionals, and it is inferred, that the first is to its excess above the second, as the third to its excess above the fourth.

Side 296 - ... line and the extremities of the base have the same ratio which the other sides of the triangle have to one...

Side 367 - Wherefore, in equal circles &c. QED PROPOSITION B. THEOREM If the vertical angle of a triangle be bisected by a straight line which likewise cuts the base, the rectangle contained by the sides of the triangle is equal to the rectangle contained by the segments of the base, together with the square on the straight line which bisects the angle.

Side 104 - In every triangle, the square of the side subtending any of the acute angles is less than the squares of the sides containing that angle by twice the rectangle contained by either of these sides, and the straight line intercepted between the perpendicular let fall upon it from the opposite angle, and the acute angle. Let ABC be any triangle, and the angle at B one of its acute angles, and upon BC, one of the sides containing it, let fall the perpendicular...