Identity channel

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Template:Expert-subject The tennis racket theorem is a result in classical mechanics describing movement of a rigid body with three distinct angular momenta. It also dubbed Dzhanibekov effect named after Russian astronaut Vladimir Dzhanibekov who discovered the theorem's consequences while in space in 1985.[1]

Qualitative Proof

The tennis racket theorem can be qualitatively analysed with the help of Euler's equations.

Under torque free conditions, they take the following form:

I1ω˙1=(I2I3)ω2ω3(1)I2ω˙2=(I3I1)ω3ω1(2)I3ω˙3=(I1I2)ω1ω2(3)


Let I1>I2>I3

Consider the situation when the object is rotating about axis with moment of inertia I1. To determine the nature of equilibrium, assume small initial angular velocities along the other two axes. As a result, according to equation (1), ω˙1 is very small. Therefore the time dependence of ω1 may be neglected.

Now, differentiating equation (2) and substituting ω˙3 from equation (3),

I2I3ω¨2=(I3I1)(I1I2)ω1ω2i.e.ω¨2=(negative quantity)×ω2

Note that ω2 is being opposed and so rotation around this axis is stable for the object.

Similar reasoning also gives that rotation around axis with moment of inertia I3 is also stable.

Now apply the same thing to axis with moment of inertia I2. This time ω˙2 is very small. Therefore the time dependence of ω2 may be neglected.

Now, differentiating equation (1) and substituting ω˙3 from equation (3),

I1I3ω¨1=(I2I3)(I1I2)ω1ω2i.e.ω¨1=(positive quantity)×ω1

Note that ω1 is not opposed and so rotation around this axis is unstable. Therefore even a small disturbance along other axes causes the object to 'flip'.

See also

References

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