Yale Examination PapersGinn, Heath & Company, 1892 - 139 pages |
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Page 25
... plane ab his videri aut quid rei gereretur cognosci posset . Tum vero clamore ab ea parte audito nostri redintegratis viribus , quod plerumque in spe victoriae accidere consuevit , acrius impug- nare coeperunt . Hostes undique ...
... plane ab his videri aut quid rei gereretur cognosci posset . Tum vero clamore ab ea parte audito nostri redintegratis viribus , quod plerumque in spe victoriae accidere consuevit , acrius impug- nare coeperunt . Hostes undique ...
Page 125
... Plane Geometry . NOTE 2. State what text - book you have studied , and to what extent . I. PLANE GEOMETRY . 1. ( a ) Define the symmetry of a figure with respect to an axis and with respect to a point . ( b ) Prove that if a figure is ...
... Plane Geometry . NOTE 2. State what text - book you have studied , and to what extent . I. PLANE GEOMETRY . 1. ( a ) Define the symmetry of a figure with respect to an axis and with respect to a point . ( b ) Prove that if a figure is ...
Page 126
... plane are parallel , the intersec- tion of the plane with planes passed through the line are parallel to that line and to each other . 8. Define a prism . Two prisms are equal , if three faces including a triedral angle of the one are ...
... plane are parallel , the intersec- tion of the plane with planes passed through the line are parallel to that line and to each other . 8. Define a prism . Two prisms are equal , if three faces including a triedral angle of the one are ...
Page 127
... PLANE GEOMETRY . 1. Of two oblique lines drawn from the same point to the same straight line , that is the greater which cuts off upon the line the greater distance from the foot of the perpendicular . Corollaries . 2. In any triangle ...
... PLANE GEOMETRY . 1. Of two oblique lines drawn from the same point to the same straight line , that is the greater which cuts off upon the line the greater distance from the foot of the perpendicular . Corollaries . 2. In any triangle ...
Page 129
... line is perpendicular to each of two straight lines at their point of intersection , it is perpendicular to the plane of these lines . 8. Define symmetrical polyhedral angles . Illustrate the definition by GEOMETRY . 129.
... line is perpendicular to each of two straight lines at their point of intersection , it is perpendicular to the plane of these lines . 8. Define symmetrical polyhedral angles . Illustrate the definition by GEOMETRY . 129.
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Popular passages
Page 59 - Hanc olim veteres vitam coluere Sabini, hanc Remus et frater, sic fortis Etruria crevit scilicet et rerum facta est pulcherrima Roma, septemque una sibi muro circumdedit arces.
Page 12 - If two triangles have the three sides of the one equal to the three sides of the other, each to each, the triangles are congruent.
Page 15 - AB be the given straight line ; it is required to divide it into two parts, so that the rectangle contained by the whole, and one of the parts, shall be equal to the square of the other part.
Page 54 - Redit agricolis labor actus in orbem, atque in se sua per vestigia volvitur annus.
Page 47 - Hos ego digrediens lacrimis affabar obortis : Vivite felices, quibus est fortuna peracta Jam sua ; nos alia ex aliis in fata vocamur. Vobis parta quies ; nullum maris aequor arandum, 495 Arva neque Ausoniae semper cedentia retro Quaerenda.
Page 127 - Every section of a circular cone made by a plane parallel to the base is a circle.
Page 126 - If a straight line is perpendicular to each of two straight lines at their point of intersection, it is perpendicular to the plane of those lines.
Page 40 - Homines enim ad deos nulla re propius accedunt quam salutem hominibus dando. Nihil habet nee fortuna tua majus, quam ut possis, nee natura melius, quam 5 ut velis servare quam plurimos.
Page 50 - ... mellaque decussit foliis ignemque removit, et passim rivis currentia vina repressit, ut varias usus meditando extunderet artes paulatim et sulcis frumenti quaereret herbam. [ut silicis venis abstrusum excuderet ignem...
Page 11 - If a straight line be divided into any two parts, the squares of the whole line, and of one of the parts, are equal to twice the rectangle contained by the whole and that part, together with the square of the other part. Let the straight line AB be divided into any two parts in the point C; the squares of AB, BC are equal to twice the rectangle AB, BC, together with the square of AC.