A Course of Mathematics: For the Use of Academies as Well as Private Tuition : in Two Volumes, Volume 2W. E. Dean, 1831 |
From inside the book
Results 1-5 of 100
Page 26
... determined when the three angles are known . Other remarkable dif- ferences between plane and spherical triangles are , Ist . That in the former , two angles always determine the third ; while in the latter they never do . 2dly . The ...
... determined when the three angles are known . Other remarkable dif- ferences between plane and spherical triangles are , Ist . That in the former , two angles always determine the third ; while in the latter they never do . 2dly . The ...
Page 27
... determine the containing sides ; that is to say , it is the same as the angle made by those planes . Or , it is equal to the plane angle formed by the tangents to those arcs at their point of inter- section . 7. Hence it follows , that ...
... determine the containing sides ; that is to say , it is the same as the angle made by those planes . Or , it is equal to the plane angle formed by the tangents to those arcs at their point of inter- section . 7. Hence it follows , that ...
Page 35
... determines the angle ; just so , in the former it is not the magnitude of the planes , but their mutual in . clinations which determine the angles . And hence all those geometers , from the time of Euclid down to the present pe- riod ...
... determines the angle ; just so , in the former it is not the magnitude of the planes , but their mutual in . clinations which determine the angles . And hence all those geometers , from the time of Euclid down to the present pe- riod ...
Page 36
... determine the angle , will be a correct measure of that angle . And the ratio which subsists between the areas of ... determined ; it signifies not at all whether the mag- nitudes which constitute one ratio , are like or unlike the ...
... determine the angle , will be a correct measure of that angle . And the ratio which subsists between the areas of ... determined ; it signifies not at all whether the mag- nitudes which constitute one ratio , are like or unlike the ...
Page 59
... Determine the solid angles of a regular pyramid with hexagonal base , the altitude of the pyramid being to each side of the base , as 2 to 1 . Ans . Plane angle between each two lateral faces 125 ° 22′35 ′′ . between the base and each ...
... Determine the solid angles of a regular pyramid with hexagonal base , the altitude of the pyramid being to each side of the base , as 2 to 1 . Ans . Plane angle between each two lateral faces 125 ° 22′35 ′′ . between the base and each ...
Other editions - View all
Common terms and phrases
absciss altitude axis ball base beam becomes body centre of gravity circle conic surface consequently Corol cosine curve cylinder denote density descending determine diameter direction distance draw earth equa equal equation equilibrio EXAM expression feet find the fluent fluid force given plane ground line Hence horizontal plane hyperbola inches inclined plane intersection length logarithm measure motion moving multiplied nearly ordinate parabola parallel pendulum perpendicular position pressure prob PROBLEM PROP proportional quantity radius ratio rectangle resistance right angles right line roots Scholium side sine solid angle space specific gravity spherical excess spherical triangle square straight line supposed surface tangent theorem theref tion variable velocity vertex vertical plane vertical projections vibrations weight whole
Popular passages
Page 13 - In any plane triangle, the sum of any two sides is to their difference, as the tangent of half the sum of the opposite angles is to the tangent of half their difference.
Page 469 - Or, by art. 249 of the same, the pressure is equal to the weight of a column of the fluid...
Page 74 - To prove that the exterior angle of a triangle is equal to the sum of the two interior opposite angles (see fig.
Page 299 - The workmen thought that substituting part silver was only a proper <perquisite; which taking air, Archimedes was appointed to examine it ; who, on putting...
Page 158 - MECHANICAL POWERS are certain simple instruments employed in raising greater weights, or overcoming greater resistance than could be effected by the direct application of natural strength. They are usually accounted six in number; viz. the Lever, the Wheel and Axle, the Pulley, the Inclined Plane, the Wedge, and the Screw.
Page 249 - BPC) ; or, the pressure of a fluid on any surface is equal to the weight of a column of the fluid...
Page 301 - In the doctrine of fluxions, magnitudes or quantities of all kinds are considered as not made up of a number of small parts, but as generated by continued motion, by means of which they increase or decrease ; as a line by the motion of a point ; a surface by the motion of a line ; and a solid by the motion of a surface.
Page 254 - Weigh the denser body and the compound mass, separately, both in water, and out of it ; then find how much each loses in water, by subtracting its weight in water from its weight in air; and subtract the less of these remainders from the greater. Then...
Page 494 - The reason is, all bodies lose some of their weight in a fluid, and the weight which a body loses in a fluid, is to its whole weight, as the specific gravity of the fluid is to that of the body.
Page 461 - ... horizontal *. 2. The theorems just given may serve to show, in what points of view machines ought to be considered by those who would labour beneficially for their improvement. The first object of the utility of machines consists in furnishing the means of giving to the moving force the most commodious direction ; and, when it can be done, of causing its action to be applied immediately to the body to be moved. These can rarely be united : but the former can be accomplished in most instances...