An elementary course of mathematics, Volum 2 |
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Side iv
... problems on the men- suration of the circle depend , and this has been made to precede the Geometry of Planes . Besides the propositions in the eleventh book of Euclid , there are several propositions on straight lines and planes which ...
... problems on the men- suration of the circle depend , and this has been made to precede the Geometry of Planes . Besides the propositions in the eleventh book of Euclid , there are several propositions on straight lines and planes which ...
Side v
... Problems I have nearly followed De Fourcy , but I have endeavoured to present the principles of the science , and the construction of the Problems , in a form that should obviate the difficulties which may present themselves to a ...
... Problems I have nearly followed De Fourcy , but I have endeavoured to present the principles of the science , and the construction of the Problems , in a form that should obviate the difficulties which may present themselves to a ...
Side vii
... Problems 71 Cases of the Trihedral angle HORIZONTAL PROJECTION Problems . Straight lines and Planes . Surfaces 77 82 88 101 ISOMETRIC PERSPECTIVE 103 GEOMETRY OF SOLIDS . Page Propositions . Equal solids .
... Problems 71 Cases of the Trihedral angle HORIZONTAL PROJECTION Problems . Straight lines and Planes . Surfaces 77 82 88 101 ISOMETRIC PERSPECTIVE 103 GEOMETRY OF SOLIDS . Page Propositions . Equal solids .
Side 31
... problem with regard to space , which the description of a circle about a triangle is with regard to a plane . In the latter problem , the perpendiculars to two of the sides of the triangle at their middle points , will intersect in a ...
... problem with regard to space , which the description of a circle about a triangle is with regard to a plane . In the latter problem , the perpendiculars to two of the sides of the triangle at their middle points , will intersect in a ...
Side 38
... problems in which the three dimensions of space are considered , may be repre- sented accurately by points and lines situate in two fixed planes which cut each other , and which are inclined to each other at a con- venient angle . In ...
... problems in which the three dimensions of space are considered , may be repre- sented accurately by points and lines situate in two fixed planes which cut each other , and which are inclined to each other at a con- venient angle . In ...
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Vanlige uttrykk og setninger
ABCD allel altitude angle formed angle of inclination auxiliary plane circle described circumference circumscribed coincide cone consequently construction Descriptive Geometry determined diameter dicular dihedral angle contained distance ellipse equal and similar equal bases equilateral polygon faces ASB figure given angle given plane given point given straight line greater hemisphere horizontal plane horizontal projection horizontal trace inscribed isometric line joining line of level line parallel meets the plane parallel planes parallel to xy parallelepiped parallelogram pendicular perimeter perpen perpendicular to xy plane angles plane MN plane passing plane Prop planes BM planes of projection point of intersection prism Prob PROBLEM projecting plane pyramid rectangle right angles right-angled triangle scale of slope series of cylinders sides solid angle space straight line drawn THEOR third face trihedral vertical plane vertical projection vertical trace Wherefore
Populære avsnitt
Side 5 - If two triangles have two angles of the one equal to two angles of the other, each to each, and one side equal to one side, viz.
Side 18 - FD. Join AC, BD, AD, and let AD meet the plane KL in the point X; and join EX, XF. Because the two parallel planes KL, MN are cut by the plane EBDX, the common sections EX, BD are parallel (Prop.
Side 13 - For the same reason, CD is likewise at right angles to the plane HGK. Therefore AB, CD are each of them at right angles to the plane HGK.
Side 4 - BC above it : and since the straight line AB is in the plane, it can be produced in that plane : let it be produced to D ; and let any plane pass through the straight line AD, and be turned about it until it pass through the point C; and because the points B, C, are in this plane, the straight line* BC is in it: »7Def.1.
Side 9 - Note. (3. 11.) line; let this be BF: therefore the three straight lines AB, BC, BF are all in one plane, viz. that which passes through AB, BC : and because AB stands at right angles to each of the straight lines BD, BE, it is also at right angles (4. 1 1.) to the plane passing through them; and therefore makes right angles (3.
Side 16 - BGH are together equal* to two right angles: and BGH is a right angle; therefore also GBA is a right angle, and GB perpendicular to BA. For the same reason GB is perpendicular to BC. Since therefore the straight line GB stands at right angles to the two straight lines BA, BC, that cut one another in B, GB is perpendicular...
Side 9 - If three straight lines meet all in one point, and a straight line stand at right angles to each of them in that point ; these three straight lines are in one and the same plane. Let the straight line AB stand at right angles to each of the straight lines BC, BD, BE, in B, the point where they meet ; BC, BD, BE are in one and the same plane. If not, let...
Side 1 - A plane is perpendicular to a plane, when the straight lines drawn in one of the planes perpendicular to the common section of the two planes, are perpendicular to the other plane. 5. The inclination of a straight line to a plane...
Side 28 - Cor. 1.) therefore all the angles of the triangles are equal to all the angles of the polygon together with four right angles : (i. ax. 1.) but all the angles at the bases of the triangles are greater than all the angles of the polygon, as has been proved ; wherefore the remaining angles of the triangles, viz. those of the vertex, which contain the solid angle at A, are less than four right angles.
Side 5 - If a straight line stand at right angles to each of two straight lines in the point of their intersection, it will also be at right angles to the plane in which these lines are.