## The geometry, by T. S. Davies. Conic sections, by Stephen Fenwick |

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Resultat 1-5 av 25

Side 139

...

imperatively tied down to this arrangement ; but whatever method we employ ,

the description must be adequate , complete , and devoid of superfluous

conditions .

...

**curves**and**curve**surfaces by means of their genesis . We are not , however ,imperatively tied down to this arrangement ; but whatever method we employ ,

the description must be adequate , complete , and devoid of superfluous

conditions .

Side 208

... to that plane , and hence to the lines AB , A'B ' themselves . But by hypothesis

and construction , AEB is a semicircle ; and B A B hence DE AD.DB = A'D.DB ' ;

whence DE being perpendicular to A'B ' , and having DES = A'D.DB ' , the

... to that plane , and hence to the lines AB , A'B ' themselves . But by hypothesis

and construction , AEB is a semicircle ; and B A B hence DE AD.DB = A'D.DB ' ;

whence DE being perpendicular to A'B ' , and having DES = A'D.DB ' , the

**curve**... Side 221

The elements of the subject are then limited to the equations of the

the equations of their tangents , normals , and diameters . ... In this case there are

two parts of the

The elements of the subject are then limited to the equations of the

**curves**, andthe equations of their tangents , normals , and diameters . ... In this case there are

two parts of the

**curve**, which are often called opposite hyperbolas . Side 222

only ( as in the parabola ) , the portion of it within the

diameter or axis of the parabola . 6. The middle of the transverse diameter of the

ellipse or hyperbola is called the centre of the

only ( as in the parabola ) , the portion of it within the

**curve**is called the principaldiameter or axis of the parabola . 6. The middle of the transverse diameter of the

ellipse or hyperbola is called the centre of the

**curve**, and a line drawn through ... Side 223

And as AF , AH are obviously the abscissas , and FG , IH the ordinates of the

poiuts G and I in the

B and P be any two points in the parabola PAP ' , and BF , PM their semi -

ordinates ...

And as AF , AH are obviously the abscissas , and FG , IH the ordinates of the

poiuts G and I in the

**curve**, the property is consequently established . Cor . 1. LetB and P be any two points in the parabola PAP ' , and BF , PM their semi -

ordinates ...

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The geometry, by T. S. Davies. Conic sections, by Stephen Fenwick Royal Military Academy, Woolwich Uten tilgangsbegrensning - 1853 |

### Vanlige uttrykk og setninger

ABCD axis base bisected called centre circle circumference coincide common cone construction contained curve described diameter difference dihedral angles direction distance divided double draw drawn edges ellipse equal equal angles equimultiples extremities faces figure formed four fourth given line given point greater hence horizontal inclination intersection join less likewise magnitudes manner meet method multiple opposite parallel parallel planes parallelogram pass perpendicular perspective picture plane MN plane of projection plane PQ position preceding prism problem produced profile angles Prop proportional PROPOSITION proved ratio reason rectangle remaining respectively right angles SCHOLIUM segment shown sides similar sphere square straight line surface taken tangent Theor third touch trace transverse triangle triangle ABC trihedral vertex vertical Whence Wherefore whole

### Populære avsnitt

Side 19 - That, if a straight line falling on two straight lines make the interior angles on the same side less than two right angles, the two straight lines, if produced indefinitely, meet on that side on which are the angles less than the two right angles.

Side 35 - If a straight line be divided into two equal parts, and also into two unequal parts ; the rectangle contained by the unequal parts, together with the square on the line between the points of section, is equal to the square on half the line.

Side 4 - AB; but things which are equal to the same are equal to one another...

Side 128 - EQUIANGULAR parallelograms have to one another the ratio which is compounded of the ratios of their sides.* Let AC, CF be equiangular parallelograms, having the angle BCD equal to the angle ECG : the ratio of the parallelogram AC to the parallelogram CF, is the same with the ratio which is compounded of the ratios of their sides. Let BG, CG, be placed in a straight line ; therefore DC and CE are also in a straight line (14.

Side 8 - If two triangles have two sides of the one equal to two sides of the...

Side 36 - 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...

Side 21 - BCD, and the other angles to the other angles, (4. 1.) each to each, to which the equal sides are opposite : therefore the angle ACB is equal to the angle CBD ; and because the straight line BC meets the two straight lines AC, BD, and makes the alternate angles ACB, CBD equal to one another, AC is parallel (27. 1 .) to DB ; and it was shown to be equal to it. Therefore straight lines, &c.

Side 65 - If a straight line touch a circle, and from the point of contact a straight line be drawn cutting the circle, the angles which this line makes with the line touching the circle shall be equal to the angles which are in the alternate segments of the circle.

Side 4 - Magnitudes which coincide with one another, that is, which exactly fill the same space, are equal to one another.

Side 116 - 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.