A Course of Mathematics for the Use of Academies: As Well as Private Tuition, Volume 2S. Campbell, 1826 - Geometry |
From inside the book
Results 1-5 of 100
Page
... radius of curvature of Curves Of Involute and Erolute Curves To find the Centre of Gravity Practical Questions Practical Exercises concerning Forces On the Motion of Bodies in Fluids On the Motion of Machines , and their Maximum effects ...
... radius of curvature of Curves Of Involute and Erolute Curves To find the Centre of Gravity Practical Questions Practical Exercises concerning Forces On the Motion of Bodies in Fluids On the Motion of Machines , and their Maximum effects ...
Page
... radius of curvature of Curves 369 Of Involute and Evolute Curves 371 To find the Centre of Gravity 373 Practical Questions 376 Practical Exercises concerning Forces 378 On the Motion of Bodies in Fluids 402 On the Motion of Machines ...
... radius of curvature of Curves 369 Of Involute and Evolute Curves 371 To find the Centre of Gravity 373 Practical Questions 376 Practical Exercises concerning Forces 378 On the Motion of Bodies in Fluids 402 On the Motion of Machines ...
Page 2
... radius comprised between the centre of the circle and the foot of the sine . The TANGENT of an arc . is a line which touches the circle in one extremity of that arc , and is continued from thence till it meets a line drawn from or ...
... radius comprised between the centre of the circle and the foot of the sine . The TANGENT of an arc . is a line which touches the circle in one extremity of that arc , and is continued from thence till it meets a line drawn from or ...
Page 3
... radius of the circle employed being known . 4. It has been shown in the 1st vol ( pa . 382 ) , that the tan- gent is a fourth proportional to the cosine , sine , and radius ; the secant , a third proportional to the cosine and radius ...
... radius of the circle employed being known . 4. It has been shown in the 1st vol ( pa . 382 ) , that the tan- gent is a fourth proportional to the cosine , sine , and radius ; the secant , a third proportional to the cosine and radius ...
Page 6
... radius in the same direction . Hence the preceding equation would become sin . ( B - C ) = sin . B. cos . c - sin . c . cos . B. 11. Let c ' be the complement of c ... radius . As the radius мc recedes from ANALYTICAL PLANE TRIGONOMETRY .
... radius in the same direction . Hence the preceding equation would become sin . ( B - C ) = sin . B. cos . c - sin . c . cos . B. 11. Let c ' be the complement of c ... radius . As the radius мc recedes from ANALYTICAL PLANE TRIGONOMETRY .
Other editions - View all
A Course of Mathematics, Vol. 2 of 2: For the Use of Academies, as Well as ... Charles Hutton No preview available - 2018 |
A Course of Mathematics, Vol. 2 Of 2: For the Use of Academies As Well As ... Charles Hutton No preview available - 2018 |
A Course of Mathematics, Vol. 2 of 2: For the Use of Academies, as Well as ... Charles Hutton No preview available - 2018 |
Common terms and phrases
abscissas altitude axis ball base beam body centre of gravity circle co-efficient conic surface consequently Corol cosine curve denote density descending determine diameter direction distance draw elevation equa equal equation equilibrio EXAM expression feet find the fluent fluid force given plane greatest ground line Hence horizontal plane hyperbola inches inclined plane length lever logarithm measure motion moving nearly ordinate parabola parallel pendulum perpendicular position pressure prob PROBLEM produced prop proportion PROPOSITION quantity radius ratio rectangle resistance right angles right line roots Scholium sides sine solid angle space specific gravity spherical excess spherical triangle square straight line supposed surface tangent theorem theref tion velocity vertical plane vertical projections vibrations weight whole
Popular passages
Page 139 - ... powder, and that but a small one too ; so that all those nearly agree with the parabolic theory. Other experiments have also been carried on with the ballistic pendulum, at different times ; from which have been obtained some of the, laws for the quantity of powder, the weight and velocity of the ball, the length of the gun, &c. Namely, that the velocity of the ball varies as the square root of the charge directly, and as the square root of the weight of ball reciprocally ; and 'that, some rounds...
Page 92 - D'Alembert, was the Precession of the equinoxes and the Nutation of the earth's axis, according to the theory of gravitation.
Page 70 - To prove that the exterior angle of a triangle is equal to the sum of the two interior opposite angles (see fig.
Page 621 - In the following table, in the last nine columns of each page, where the first or leading figures change from 9's to O's, points or dots are introduced instead of the O's...
Page 238 - Then say. As the weight lost in water, Is to the whole weight, So is the specific gravity of water, To the specific gravity of the body.
Page 11 - 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 32 - Two planes are said to have the same or a like inclination to one another which two other planes have, when the said angles of inclination are equal to one another.
Page 205 - Hence the magnitude of the whole body, is to the magnitude of the part immersed, as the specific gravity of the fluid, is to that of the body.
Page 302 - ... 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 378 - ... it follows that, by means of it, any one of the three may be expelled out of the calculation, or else brought into it. Also, the momentum, or quantity of motion in a moving body, is qv^ the product of the velocity and matter. It is also to be observed, that the theorems equally hold good for the destruction of motion and velocity, by means of retarding forces, as for the generation of the same, by means of Accelerating forces . And to the following problems, which are all resolved by the application...