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The oxygen molecule has a mass of 5.30 x...

The oxygen molecule has a mass of `5.30 xx 10^(-26) kg` and a moment of inertia of `1.94 xx 10^(-46) kg m^(2)` about an axis through its centre perpendicular to the line joining the two atoms. Suppose the mean speed of such a molecule in a gas is `500 m//s` and that its kinetic energy of rotation is two thirds of its kinetic energy of translation. Find the average angular velocity of the molecule.

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The oxygen molecule has a mass of 5.30 × 10^(-26) kg and a moment of inertia of 1.94×10^(-46) kg m^(2) about an axis through its centre perpendicular to the lines joining the two atoms. Suppose the mean speed of such a molecule in a gas is 500 m/s and that its kinetic energy of rotation is two thirds of its kinetic energy of translation. Find the average angular velocity of the molecule.

The oxygen molecule has a mass of 5.30 × 10^(-26) kg and a moment of inertia of 1.94×10^(-46) kg m^(2) about an axis through its centre perpendicular to the lines joining the two atoms. Suppose the mean speed of such a molecule in a gas is 500 m/s and that its kinetic energy of rotation is two thirds of its kinetic energy of translation. Find the average angular velocity of the molecule.

The oxygen molecule has a mass of 5.30 xx 10^-26 kg and a moment of inertia of 1.94xx10^-46 kg m^2 about an axis through its centre perpendicular to the lines joining the two atoms. Suppose the mean speed of such a molecule in a gas is 500 m//s and that its kinetic energy of rotation is two thirds of its kinetic energy of translation. Find the average angular velocity of the molecule.

The oxygen molecule has a mass of 5.30xx10^(-26)kg and a moment of inertia of 1.94xx10^(-46 )kgm^(2) about an axis through its centre perpendicular to the lines joining the two atoms. Suppose the mean speed of such a molecule in a gas is 500 m/s and that its kinetic energy of rotation is (2)/(3) of its kinetic energy of translation. Find the average angular velocity of the molecules.

An oxygen molecule has a mass of 5.3 xx 10^(-26) kg anda moment of inertia of 1.94 xx 10^(-46) kg m^2 about an axis passing through the centre and perpendicular to the line joining the two oxygen atoms. The molecule is moving at a speed of 500 m/s and its rotational kinetic energy is two-thirds its translational K.E. Calculate its angular velocity.