| Bartholomew Price - 1868 - 736 Seiten
...Pcos0, Y = psintf; (22) Pa = x2 + Y2. (23) Hence the resolved part of a force along any line is equal to the product of the force and the cosine of the angle between the given line and the action-line of the given force. This theorem is most important, and is very frequently... | |
| John Christie Douglas - 1875 - 460 Seiten
...force into two rectangular components — ie, the effective component of a force in any direction is the product of the force, and the cosine of the angle between its direction and the direction of the required component. A force is resolved into three rectangular... | |
| American School (Lansing, Ill.) - 1909 - 476 Seiten
...rectangular component of F ^^\ that force. Thus F' and F" j are rectangular components -i ofF. PJ jj The foregoing equations show that the rectangular...makes an angle of 22 degrees with the horizontal. What i& the value of its component along the horizontal ? * Since cos 22° = 0.927, the value of the component... | |
| 1912 - 514 Seiten
...rectangular component of that force. Thus F and F" are rectangular components UTC" A*^ » £ ofF. PJ tl The foregoing equations show that the rectangular...makes an angle of 22 degrees with the horizontal. AVhat is the value of its component along the horizontal ? * Since cos 22° = 0.927, the value of the... | |
| J. E. Akin - 1994 - 566 Seiten
...the work done by a force is the product of the force, the displacement at the point of application of the force, and the cosine of the angle between the force and the displacement. Here the forces are all parallel so the cosine is either plus or minus one. Evaluating... | |
| Jean Littlewood, John Hebborn, Fred Norton - 2000 - 190 Seiten
...resolutes of a force: • The component of a force in any direction is the product of the magnitude of the force and the cosine of the angle between the force and the required direction. Notice in particular that the component of a force in a direction perpendicular... | |
| J. E. Akin - 2005 - 512 Seiten
...The work done by a force is the product of the force, the displacement at the point of application of the force, and the cosine of the angle between the force and the displacement. Here the forces are all parallel so the cosine is either plus or minus one. Evaluating... | |
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