Inventional Geometry: A Series of Problems, Intended to Familiarize the Pupil with Geometrical Conceptions, and to Exercise His Inventive FacultyD. Appleton, 1877 - 97 páginas |
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Página 30
... isosceles triangle . 64. Make an isosceles triangle . When a triangle has all its sides of different lengths it takes the name of scalene . 65. Make a scalene triangle . When a triangle has one of its angles a right angle , it is called ...
... isosceles triangle . 64. Make an isosceles triangle . When a triangle has all its sides of different lengths it takes the name of scalene . 65. Make a scalene triangle . When a triangle has one of its angles a right angle , it is called ...
Página 31
... isosceles triangle with- out using more than one circle ? When two lines do not meet either way , though produced ever so far , they are said to be parallel . 1 70. Draw two parallel lines . 71. Can you draw one line parallel to another ...
... isosceles triangle with- out using more than one circle ? When two lines do not meet either way , though produced ever so far , they are said to be parallel . 1 70. Draw two parallel lines . 71. Can you draw one line parallel to another ...
Página 44
... triangle , whose base shall be 4 and perpendicular 6 ? In a right - angled triangle , the side which faces the right ... isosceles tri- angle which is contained by the equal sides is called the vertical angle , however such triangle may ...
... triangle , whose base shall be 4 and perpendicular 6 ? In a right - angled triangle , the side which faces the right ... isosceles tri- angle which is contained by the equal sides is called the vertical angle , however such triangle may ...
Página 45
... triangles , and point out the vertex of each . 149. Construct an isosceles triangle , whose base shall be 1 inch , and each of the equal sides 2 inches , and place on the opposite side of the base another of the same dimensions . 150 ...
... triangles , and point out the vertex of each . 149. Construct an isosceles triangle , whose base shall be 1 inch , and each of the equal sides 2 inches , and place on the opposite side of the base another of the same dimensions . 150 ...
Página 48
... triangle , so that every other angle of the hexagon may touch the middle of a side of the equilateral triangle ? 170 ... isosceles triangle into two triangles that shall be equal to each other , but that shall not be similar to each oth ...
... triangle , so that every other angle of the hexagon may touch the middle of a side of the equilateral triangle ? 170 ... isosceles triangle into two triangles that shall be equal to each other , but that shall not be similar to each oth ...
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Términos y frases comunes
adjacent angles angular points arc is called arithmetic mean arrange the surfaces axis base breadth card a hollow circumference cone construct cube curve determine diagonal scale diameter dimensions distance divide a circle divide a line divide an equilateral dodecagon duodecimals ellipse equal and similar equal sectors equilateral triangle find the area four equal frustum geometry Give a plan give a sketch Give an example gles HERBERT SPENCER hexahedron icosahedron isosceles triangle line drawn line of chords line of sines line of tangents line parallel measure nonagon number of degrees oblate spheroid obtuse angle octagon octahedron pentagon piece of card place a circle place a hexagon place a square polygon protractor pupil pyramid quadrant quadrilaterals radii radius reëntrant angle rhomboid rhombus right angle right-angled triangle secant sides is called solid square inches square whose side square yard takes the name tetrahedron trapezium versed sine write its name zoid
Pasajes populares
Página 43 - TRIANGLES upon the same base, and between the same parallels, are equal to one another.
Página 13 - I keep the subject constantly before me, and wait till the first dawnings open slowly by little and little into a full and clear light.
Página 23 - ... their centres. \\ Division of Circles. Circles, or arcs, may, like straight lines, have given distances marked off upon them, and may be divided into equal parts. The line which joins the extremities of an arc, is called the chord of that arc. When the arc is very short, its length cannot be ordinarily distinguished from that of its chord. It is ou this principle that any given straight distance may be transferred to a circle or to any curve.
Página 3 - ... TAPPAN, MA ROBINSON'S NEW GEOMETRY AND TRIGONOMETRY. 8vo, calf. 453 pages $1.60 Embracing plane and solid geometry, and plane and spherical trigonometry, with numerous practical problems. SPENCER'S INVENTIONAL GEOMETRY. (Science Primer Series.) By WM. GEO. SPENCER.
Página 4 - To its great efficiency, both as a means of providing interest in geometry, and as a mental discipline, I can give personal testimony. I have seen it create in a class of boys so much enthusiasm that they looked forward to their geometry lesson as a chief event in the week. And girls, initiated in the system by my father, have frequently begged of him for problems to solve during the holidays.
Página 5 - ... or of a kingdom; that a geometry still higher is the foundation of the noble science of the astronomer, who by it not only determines the diameter of the globe he lives upon, but as well the sizes of the sun, moon, and planets, and their distances from us and from each other; when it is considered also, that by this higher kind of geometry, with the assistance of a chart and a mariner's compass, the sailor navigates the ocean with success, and thus brings all nations into amicable intercourse...
Página 22 - ... the outside of the second, write the name of the boundary. In the third, write against the centre its name. And between the centre and the circumference of the fourth circle, draw a few radii and write on each its name. 23. Can you place two circles to touch each other at a particular point ? 24.
Página 47 - PROPOSITION 25. To find the centre of the circle, of which a given arc is a part. Let ABC be a given arc : it is required to find the centre of the circle, of which the arc ABC is a part. CONSTRUCTION. Draw AC, and bisect it at D. (I. Prop. 10.) At D draw DB at right angles to AC cutting the arc at B. (I. Prop. 11.) Draw AB, bisect it at E, and at E draw EF at right angles to AB meeting BD or BD produced at F*; then F is the centre required. PROOF.
Página 34 - When a polygon has all its sides equal and all its angles equal it is called a regular polygon.
Página 2 - In the Office of the Librarian of Congress, at Washington. PREFACE TO THE AMERICAN EDITION.