Elements of Geometry and Plane Trigonometry: With an Appendix, and Copious Notes and IllustrationsA. Constable & Company, 1817 - 432 Seiten |
Im Buch
Ergebnisse 1-5 von 28
Seite 126
... quantities of the same kind , the one may contain the other , or be contained by it ; that is , the one may result ... quantities are not all suscep- tible of such perfect mensuration . Two quantities may be 126 ELEMENTS OF GEOMETRY .
... quantities of the same kind , the one may contain the other , or be contained by it ; that is , the one may result ... quantities are not all suscep- tible of such perfect mensuration . Two quantities may be 126 ELEMENTS OF GEOMETRY .
Seite 127
... quantities may be conceived to be so constituted , as not to ad- mit of any other quantity that will measure them completely , or be contained in both without leaving a remainder . Yet this apparent imperfection , which proceeds ...
... quantities may be conceived to be so constituted , as not to ad- mit of any other quantity that will measure them completely , or be contained in both without leaving a remainder . Yet this apparent imperfection , which proceeds ...
Seite 128
... Quantities are homogeneous , which can be added tó- gether . 2. One quantity is said to contain another , when the subtraction of the smaller - continued if necessary - leaves no remainder . 3. A quantity which is contained in another ...
... Quantities are homogeneous , which can be added tó- gether . 2. One quantity is said to contain another , when the subtraction of the smaller - continued if necessary - leaves no remainder . 3. A quantity which is contained in another ...
Seite 129
... quantities are said to be proportional , when a submultiple of the first is contained in the second as often as a like submultiple of the third is contained in the fourth . 11. Of proportional quantities , the first of each pair is ...
... quantities are said to be proportional , when a submultiple of the first is contained in the second as often as a like submultiple of the third is contained in the fourth . 11. Of proportional quantities , the first of each pair is ...
Seite 130
... quantities . Thus , the ratio of A to D is viewed as compounded of that of A to B , that of B to C , and that of C to D. 19. Of quantities in a continued proportion , the first is said to have to the third , the duplicate ratio of what ...
... quantities . Thus , the ratio of A to D is viewed as compounded of that of A to B , that of B to C , and that of C to D. 19. Of quantities in a continued proportion , the first is said to have to the third , the duplicate ratio of what ...
Inhalt
219 | |
225 | |
226 | |
231 | |
234 | |
237 | |
251 | |
256 | |
101 | |
110 | |
128 | |
142 | |
155 | |
181 | |
199 | |
200 | |
204 | |
257 | |
260 | |
262 | |
264 | |
283 | |
318 | |
338 | |
360 | |
365 | |
Andere Ausgaben - Alle anzeigen
Elements of Geometry, and Plane Trigonometry: With an Appendix, and Very ... University Professor Emeritus John Leslie, Sir Keine Leseprobe verfügbar - 2016 |
Häufige Begriffe und Wortgruppen
ABCD adjacent angle altitude angle ABC angle ADB angle BAC base AC bisect centre chord circle circumference consequently construction contained angle cosine decagon denote describe diameter difference distance diverging lines divided draw equal to BC equilateral triangle equivalent to twice evidently exterior angle given greater half Hence hypotenuse inscribed isosceles triangle join let fall likewise measure parallel perpendicular point G polygon PROB PROP Proposition quadrilateral figure quantities radius ratio rectangle rectangle contained rectilineal figure rhomboid right angles right-angled triangle Scholium segments semicircle semiperimeter sequently side AC sinB sine square of AB square of AC straight line tangent THEOR tion triangle ABC twice the rectangle twice the square vertex vertical angle whence Wherefore