Constructive geometry of plane curves |
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Side vi
... proof of the property made use of have been added , although such proofs may be found in numerous published works , and are indeed so completely common property that I have not thought it necessary to give direct references to the pages ...
... proof of the property made use of have been added , although such proofs may be found in numerous published works , and are indeed so completely common property that I have not thought it necessary to give direct references to the pages ...
Side 8
... proof may be shewn thus . Also but The sq . on BD - sq . on AB + sq . on AD ( Euclid 1. 47 ) . 99 = = sq . on EB + sq . on ED + 2 rect . EB . ED , ED AD and EB = FB , = ( Euclid II . 4 ) , .. sq . on AB = sq . on FB + 2 rect . FB . AD ...
... proof may be shewn thus . Also but The sq . on BD - sq . on AB + sq . on AD ( Euclid 1. 47 ) . 99 = = sq . on EB + sq . on ED + 2 rect . EB . ED , ED AD and EB = FB , = ( Euclid II . 4 ) , .. sq . on AB = sq . on FB + 2 rect . FB . AD ...
Side 21
... the required locus of the vertex . * For definition of locus , see p . 29 post . Proof . Take any point Q on the circle , INTRODUCTORY . 21 To determine the locus of the vertex of a triangle on a given base and with sides in a given ratio.
... the required locus of the vertex . * For definition of locus , see p . 29 post . Proof . Take any point Q on the circle , INTRODUCTORY . 21 To determine the locus of the vertex of a triangle on a given base and with sides in a given ratio.
Side 22
Thomas Henry Eagles. Proof . Take any point Q on the circle , and draw QA , QD , QB , QE . Since PD bisects the angle APB .. BD AD :: a : b ( Euc . VI . 3 ) , A Fig.17 . P B and since DPC is a right angle and PD bisects the angle APB ...
Thomas Henry Eagles. Proof . Take any point Q on the circle , and draw QA , QD , QB , QE . Since PD bisects the angle APB .. BD AD :: a : b ( Euc . VI . 3 ) , A Fig.17 . P B and since DPC is a right angle and PD bisects the angle APB ...
Side 23
... Proof . CD CE since CF is perpendicular to DE . = The angle DFP is double the angle DEP . ( Euc . III . 20. ) Half the angle DFP together with the angle FPD = a_right angle . and The angle DEP together with the angle EPN = a right angle ...
... Proof . CD CE since CF is perpendicular to DE . = The angle DFP is double the angle DEP . ( Euc . III . 20. ) Half the angle DFP together with the angle FPD = a_right angle . and The angle DEP together with the angle EPN = a right angle ...
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Constructive Geometry of Plane Curves: With Numerous Examples Thomas Henry Eagles Uten tilgangsbegrensning - 1885 |
Constructive Geometry of Plane Curves: With Numerous Examples Thomas Henry Eagles Uten tilgangsbegrensning - 1885 |
Constructive Geometry of Plane Curves: With Numerous Examples Thomas Henry Eagles Uten tilgangsbegrensning - 1885 |
Vanlige uttrykk og setninger
AC² anharmonic ratio asymptotes auxiliary circle bisects the angle centre point chord of contact circle centre circles touching cone conic conic section conjugate diameters conjugate points construction corresponding curve being given cutting cutting CB describe a circle describe an ellipse describe an hyperbola determined draw a parabola ellipse equal fixed point foci focus F given circle given Fig given lines given point given tangent harmonic mean homographic involution latus rectum length line joining locus major axis mean proportional meet the directrix opposite sides ordinate pass pencil perpendicular point of contact point of intersection polar pole PROBLEM Prop radical axis radius reduces to Prob right angle second focus segment shew shewn similar triangles Similarly tangent PT three given vertex vertices
Populære avsnitt
Side 11 - ... the first is to the third as the difference between the first and second is to the difference between the second and third, the quantities a, b, c, are said to be in harmonical proportion.
Side 26 - A circle is a plane figure contained by one line, which is called the circumference, and is such that all straight lines drawn from a certain point within the figure to the circumference, are equal to one another.
Side 358 - TRIGONOMETRY. By Rev. JB LOCK, MA, Senior Fellow, Assistant Tutor and Lecturer in Mathematics, of Gonville -and Caius College, Cambridge ; late Assistant-Master at Eton. Globe 8vo.
Side 358 - AND BESSEL'S FUNCTIONS. Crown 8vo. WILSON (JM)— ELEMENTARY GEOMETRY. Books I. to V. Containing the Subjects of Euclid's first Six Books. Following the Syllabus of the Geometrical Association. By JM WILSON, MA, Head Master of Clifton College. New Edition. Extra fcap. 8vo. 4?.
Side 287 - AB describe a segment of a circle containing an angle equal to the given angle, (in.
Side 125 - The problem therefore is reduced to finding the centre of a circle to touch externally two given circles (DG, EG) and pass through a given point (Q), which is always possible since the circles must cut each other and Q lie outside both, ie the problem reduces to Prob. 32. [Draw a common tangent EDM to the two circles meeting fP in M.
Side 358 - SOLID GEOMETRY AND CONIC SECTIONS. With Appendices on Transversals and Harmonic Division. For the Use of Schools. By JM WILSON, MA New Edition. Extra fcap. 8vo. 3-r. 6d. WILSON— GRADUATED EXERCISES IN PLANE TRIGONOMETRY.
Side xi - Upon a given straight line to describe a segment of a circle, which shall contain an angle equal to a given rectilineal angle.
Side 30 - IF from any point without a circle two straight lines be drawn, one of which cuts the circle, and the other touches it ; the rectangle contained by the whole line which cuts the circle, and the part of it without the circle, shall be equal to the square of the line which touches it.
Side 97 - A conic section is the locus of a point which moves so that its distance from a fixed point, called the focus, is in a constant ratio to its distance from a fixed straight line, called the directrix.