... prove that the time of descent from any point of the former to a point in the latter, along a straight line joining these points and passing through the point of contact, is constant. Elementary Dynamics... - Сторінка 257автори: W. G. Willson - 1874 - 278 стор.Повний перегляд - Докладніше про цю книгу
| Sir John Budd Phear - 1850 - 276 стор.
...the same plane, the lowest point of one being in contact with the highest point of the other ; shew that the time of descent from any point of the former to a point in the latter, down the chord passing through the point of contact, is constant. (14). In a vertical parabola a tangent... | |
| Sir John Budd Phear - 1850 - 304 стор.
...1° when a second, 2° when a minute is taken as the unit of time. (13). Two circles lie in the same plane, the lowest point of one being in contact with the highest point of the other; shew that the time of descent from any point of the former to a point in the latter, down the chord... | |
| William Walton - 1858 - 294 стор.
...in the same plane, the lowest point of one being in contact with the highest point of the other: to prove that the time of descent from any point of the...passing through the point of contact, is constant. Let x, y, be the two chords successively described by the descending body, a being the inclination... | |
| William Walton - 1858 - 294 стор.
...distance of P from AB, is the least distance between the particles. (3) Two circles lie in the same plane, the lowest point of one being in contact with the highest point of the other: to prove that the time of descent from any point of the former to a point in the latter, along a straight... | |
| Stephen Parkinson - 1863 - 396 стор.
...the same plane, the lowest point of one being in contact with the highest point of the other; shew that the time of descent from any point of the former to a point in the latter, down the chord passing through the point of contact, is constant. 37." Two equal bodies connected by... | |
| Stephen Parkinson - 1863 - 408 стор.
...given circle to another given circle either within it or without it. 36. Two circles lie in the same plane, the lowest point of one being in contact with the highest point of the other ; shew that the time of descent from any point of the former to a point in the latter, down the chord... | |
| William Walton - 1880 - 296 стор.
...being in contact with the highest point of the other : to prove that the time <of descent of a particle from any point of the former to a point in the latter,...passing through the point of contact, is constant. Let x, y, be the two chords successively described by the descending particle, a being the inclination... | |
| William Walton - 1880 - 300 стор.
...being in contact with the highest point of the other : to prove that the time of descent of a particle from any point of the former to a point in the latter, along a straight line joining these points and parsing through the point of contact, is constant. Let x, y, be the two chords successively described... | |
| James Gordon MacGregor - 1887 - 540 стор.
...same plane, the lowest point of the one being in contact with the highest point of the other. Show that the time of descent from any point of the former to a point in the latter down the chord passing through the point of contact, is constant. (34) Four pegs are fixed in a wall... | |
| James Gordon MacGregor - 1887 - 540 стор.
...same plane, the lowest point of the one being in contact with the highest point of the other. Show that the time of descent from any point of the former to a point in the latter down the chord passing through the point of contact, is constant. (34) Four pegs are fixed in a wall... | |
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