... continues to vary uniformly with the rate denoted by dy at the given point, the value of-— will become constant. The generatrix will now continue to move uniformly in the direction of the curve at the( given point, and therefore the value which... Vibratory Motion and Sound - Stranica 107napisao/la Joseph David Everett - 1882 - Broj stranica: 135Potpun prikaz - O ovoj knjizi
| American Academy of Arts and Sciences - 1873 - Broj stranica: 696
...the given point, and therefore the value which ' '; has at this point is that of the trigonometrical tangent of the inclination of the curve to the axis of x at this point The line now described by the generatrix is called a tangent line to the curre, in accordance... | |
| H. Du Bois - 1896 - Broj stranica: 418
...self-induction — that (19) . . 0 = ^(1. -I) The time-ratio 6 for a point P is therefore equal to the tangent of the inclination of the curve to the axis of ordinates, multiplied into the portion Q,P of the ordinates, which represents the deficiency by which... | |
| 1916 - Broj stranica: 1036
...the water-line, which for the unit section is the point x = 1 y = 1. Second, that at the water-line the tangent of the inclination of the curve to the axis of x shall be /, the flare. Third, that the area of this section, or curve, from j; = 0 to x = 1, shall... | |
| William Hovgaard - 1920 - Broj stranica: 358
...origin water-line, the co-ordinates for which point are x = 1, y = I for the unit section. At that point the tangent of the inclination of the curve to the axis of abscissae is equal to the flare, f. The area of the section from x = o to x = I must be the required... | |
| 1873 - Broj stranica: 698
...the given point, and therefore the value which ^r has at this point is that of the trigonometrical tangent of the inclination of the curve to the axis of x at this point The line PROCEEDINGS OP THE AMERICAN ACADEM7 now described by the generatrix is called... | |
| 1875 - Broj stranica: 214
...the( given point, and therefore the value which -~ has at this point is that of the trigonometrical tangent of the inclination of the curve to the axis of x at this point. The line now described by the generatrix is called a tangent line to the curve, in accordance... | |
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