| Denison Olmsted - 1870 - 437 Seiten
...of gravity of the body. Hence, the moment of inertia of a body with respect to any axis is equal to **the moment of inertia with respect to a parallel axis through the centre of gravity,** plus the mass of the body multiplied by the square of the distance between the two axes. , Put €... | |
| Denison Olmsted - 1871 - 437 Seiten
...of gravity of the body. Hence, the moment of inertia of a body with respect to any axis is equal to **the moment of inertia with respect to a parallel axis through the centre of gravity,** plus the mass of the body multiplied by the square of the distance between the two axes. Put C = the... | |
| 1888
...ellipsoid. 2. That if H' be the moment of inertia of a body with respect to any axis in space, H its **moment of inertia with respect to a parallel axis through the centre of** mass of the body, / the perpendicular distance between these two axes, M the mass of the body; then... | |
| Joseph Bayma - 1889 - 283 Seiten
...mr0' + «»/''. (2) Therefore, the moment of inertia of a body with respect to any axis is equal to **the moment of inertia with respect to a parallel axis through the centre of gravity** of tJte body, plus tJte mass of the bod// into the square of the distance between the two axes. 121.... | |
| William Kent - 1907 - 1129 Seiten
...length of the cylinder. By making d = 0 in any of the above formulae we find the moment of inertia for **a parallel axis through the centre of gravity. The moment of inertia,** 2wn'2, numerically equals the weight of a body which, if concentrated at the distance unity from the... | |
| 1909
...•§£ s •« CD ii n I" / 1f -4"77<e moment of 'inertia of ait, area with respect to any axis equals **the moment of inertia with respect to a parallel axis through the** center of gravity, plus the. product of the are<i and the square of the distance between the axes.... | |
| George A. Hool - 1912 - 188 Seiten
...The rule may be stated as follows : The moment of inertia of an area with respect to any axis equals **the moment of inertia with respect to a parallel axis through the** center of gravity, plus the product of the area and the square of the distance between the axes. Expressed... | |
| 1912
...tables by the following rule: • The moment of inertia of an area with respect to any axis equals **the moment of inertia with respect to a parallel axis through the** center of gravity, plus the product of tho area and the square of the distance between the axes. Or,... | |
| Edward Rose Maurer - 1917
...the tables by the following rule: 49 The moment of inertia of an area with respect to any axis equals **the moment of inertia with respect to a parallel axis through the** center of gravity, plus the product of the area and the square of the distance between the axes. Or,... | |
| Edward Rose Maurer - 1919 - 126 Seiten
...the distance between the axes. Or, if I denotes the moment of inertia with respect to any axis ; I0 **the moment of inertia with respect to a parallel axis through the** center of gravity; A the area; and d the ^-stance between the axes, then I=Io+A<Z*.... (5) Example.... | |
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